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Zustandsvektoren im Hilbertraum - Versionsgeschichte
2026-04-05T03:26:30Z
Versionsgeschichte dieser Seite in PhysikWiki
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Schubotz am 9. August 2011 um 12:23 Uhr
2011-08-09T12:23:53Z
<p></p>
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<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">Version vom 9. August 2011, 14:23 Uhr</td>
</tr><tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l247">Zeile 247:</td>
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<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>\end{align}</math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>\end{align}</math></div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Eigenschaften der Funktionen, die H aufspannen:</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Eigenschaften der Funktionen, die H aufspannen:</div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">No more s</del>***<del style="font-weight: bold; text-decoration: none;">. All posts of this qtualiy from now on</del></div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">=====Dual:=====</ins></div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div> </div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">:<math>\left\langle \Psi \right|=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left\langle \Psi | {\bar{p}} \right\rangle }\left\langle {\bar{p}} \right|=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle \Psi | {\bar{r}} \right\rangle }\left\langle {\bar{r}} \right|</math></ins></div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">8RAWub </del> <<del style="font-weight: bold; text-decoration: none;">a href</del>=<del style="font-weight: bold; text-decoration: none;">"http</del>:<del style="font-weight: bold; text-decoration: none;">//pdgsgjgkfmzn.com/"</del>><del style="font-weight: bold; text-decoration: none;">pdgsgjgkfmzn</del></<del style="font-weight: bold; text-decoration: none;">a</del>></div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">Man spricht auch vom " Einschieben einer 1!".</ins></div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div> </div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">:<math>\left\langle \Psi | {\bar{r}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left\langle \Psi | {\bar{p}} \right\rangle }\left\langle {\bar{p}} | {\bar{r}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p}\tilde{\Psi }(\bar{p})</ins>*<ins style="font-weight: bold; text-decoration: none;">{{\left( 2\pi \hbar \right)}^{-\tfrac{3}{2}}}{{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}=\left\langle {\bar{r}} | \Psi \right\rangle </ins>*<ins style="font-weight: bold; text-decoration: none;">=\Psi (\bar{r})</ins>*<ins style="font-weight: bold; text-decoration: none;"></math></ins></div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">TMOBJW , [url</del>=<del style="font-weight: bold; text-decoration: none;">http</del>:<del style="font-weight: bold; text-decoration: none;">//xtlmvvmqheyb</del>.<del style="font-weight: bold; text-decoration: none;">com/]xtlmvvmqheyb</del>[<del style="font-weight: bold; text-decoration: none;">/url</del>]<del style="font-weight: bold; text-decoration: none;">, [link=http:</del>/<del style="font-weight: bold; text-decoration: none;">/tacwszdexllu.com/]tacwszdexllu[/link], http</del>:<del style="font-weight: bold; text-decoration: none;">//qmtlkoxbkeys.com/</del></div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">=====Skalarprodukt:=====</ins></div></td></tr>
<tr><td colspan="2" class="diff-side-deleted"></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">:<math>\left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle {{\Psi }_{1}} | {\bar{r}} \right\rangle }\left\langle </ins> <ins style="font-weight: bold; text-decoration: none;">{\bar{r}} | {{\Psi }_{2}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r}{{\Psi }_{1}}(\bar{r})*{{\Psi }_{2}}(\bar{r})=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p}{{\tilde{\Psi }}_{1}}(\bar{p})*{{\tilde{\Psi }}_{2}}(\bar{p})</ins><<ins style="font-weight: bold; text-decoration: none;">/math></ins></div></td></tr>
<tr><td colspan="2" class="diff-side-deleted"></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">===</ins>=<ins style="font-weight: bold; text-decoration: none;">=Norm:=====</ins></div></td></tr>
<tr><td colspan="2" class="diff-side-deleted"></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>:<ins style="font-weight: bold; text-decoration: none;"><math</ins>><ins style="font-weight: bold; text-decoration: none;">\left\| \Psi \right\|={{\left[ \int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle \Psi | {\bar{r}} \right\rangle }\left\langle {\bar{r}} | \Psi \right\rangle \right]}^{\frac{1}{2}}}={{\left[ \int_{{{R}^{3}}}^{{}}{{{d}^{3}}r{{\left| \Psi (\bar{r}) \right|}^{2}}} \right]}^{\frac{1}{2}}}</ins></<ins style="font-weight: bold; text-decoration: none;">math</ins>></div></td></tr>
<tr><td colspan="2" class="diff-side-deleted"></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">Alle Funktionen im Hilbertraum müssen also insbesondere quadratintegrabel sein.</ins></div></td></tr>
<tr><td colspan="2" class="diff-side-deleted"></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">Somit folgt:</ins></div></td></tr>
<tr><td colspan="2" class="diff-side-deleted"></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">:<math>H=L{}^\text{2}({{R}^{3}})</ins>=<ins style="font-weight: bold; text-decoration: none;">\left\{ \Psi </ins>:<ins style="font-weight: bold; text-decoration: none;">{{R}^{3}}\to C\left| {} \right</ins>.<ins style="font-weight: bold; text-decoration: none;">\left</ins>[ <ins style="font-weight: bold; text-decoration: none;">\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r{{\left| \Psi (\bar{r}) \right|}^{2}}<\infty } \right</ins>] <ins style="font-weight: bold; text-decoration: none;">\right\}<</ins>/<ins style="font-weight: bold; text-decoration: none;">math></ins></div></td></tr>
<tr><td colspan="2" class="diff-side-deleted"></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">Nebenbemerkung</ins>:</div></td></tr>
<tr><td colspan="2" class="diff-side-deleted"></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">Die Linearität des Vektorraumes garantiert das Superpositionsprinzip für Wellenfunktionen!</ins></div></td></tr>
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Schubotz
https://wiki.physikerwelt.de/index.php?title=Zustandsvektoren_im_Hilbertraum&diff=1618&oldid=prev
189.76.238.253: /* Norm: */
2011-07-03T11:55:00Z
<p><span class="autocomment">Norm:</span></p>
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<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">Version vom 3. Juli 2011, 13:55 Uhr</td>
</tr><tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l251">Zeile 251:</td>
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<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>8RAWub <a href="http://pdgsgjgkfmzn.com/">pdgsgjgkfmzn</a></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>8RAWub <a href="http://pdgsgjgkfmzn.com/">pdgsgjgkfmzn</a></div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>=<del style="font-weight: bold; text-decoration: none;">====Norm</del>:<del style="font-weight: bold; text-decoration: none;">=====</del></div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">TMOBJW , [url</ins>=<ins style="font-weight: bold; text-decoration: none;">http</ins>:<ins style="font-weight: bold; text-decoration: none;">//xtlmvvmqheyb.com/]xtlmvvmqheyb</ins>[<ins style="font-weight: bold; text-decoration: none;">/url</ins>]<ins style="font-weight: bold; text-decoration: none;">, </ins>[<ins style="font-weight: bold; text-decoration: none;">link</ins>=<ins style="font-weight: bold; text-decoration: none;">http</ins>:<ins style="font-weight: bold; text-decoration: none;">//tacwszdexllu</ins>.<ins style="font-weight: bold; text-decoration: none;">com/]tacwszdexllu</ins>[<ins style="font-weight: bold; text-decoration: none;">/link</ins>]<ins style="font-weight: bold; text-decoration: none;">, http://qmtlkoxbkeys.com</ins>/</div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">:<math>\left\| \Psi \right\|={{\left</del>[ <del style="font-weight: bold; text-decoration: none;">\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle \Psi | {\bar{r}} \right\rangle }\left\langle {\bar{r}} | \Psi \right\rangle \right</del>]<del style="font-weight: bold; text-decoration: none;">}^{\frac{1}{2}}}={{\left</del>[ <del style="font-weight: bold; text-decoration: none;">\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r{{\left| \Psi (\bar{r}) \right|}^{2}}} \right]}^{\frac{1}{2}}}</math></del></div></td><td colspan="2" class="diff-side-added"></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">Alle Funktionen im Hilbertraum müssen also insbesondere quadratintegrabel sein.</del></div></td><td colspan="2" class="diff-side-added"></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">Somit folgt:</del></div></td><td colspan="2" class="diff-side-added"></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">:<math>H=L{}^\text{2}({{R}^{3}})</del>=<del style="font-weight: bold; text-decoration: none;">\left\{ \Psi </del>:<del style="font-weight: bold; text-decoration: none;">{{R}^{3}}\to C\left| {} \right</del>.<del style="font-weight: bold; text-decoration: none;">\left</del>[ <del style="font-weight: bold; text-decoration: none;">\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r{{\left| \Psi (\bar{r}) \right|}^{2}}<\infty } \right</del>] <del style="font-weight: bold; text-decoration: none;">\right\}<</del>/<del style="font-weight: bold; text-decoration: none;">math></del></div></td><td colspan="2" class="diff-side-added"></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">Nebenbemerkung:</del></div></td><td colspan="2" class="diff-side-added"></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">Die Linearität des Vektorraumes garantiert das Superpositionsprinzip für Wellenfunktionen!</del></div></td><td colspan="2" class="diff-side-added"></td></tr>
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189.76.238.253
https://wiki.physikerwelt.de/index.php?title=Zustandsvektoren_im_Hilbertraum&diff=1617&oldid=prev
62.4.73.228: /* Skalarprodukt: */
2011-07-03T07:15:27Z
<p><span class="autocomment">Skalarprodukt:</span></p>
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<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">Version vom 3. Juli 2011, 09:15 Uhr</td>
</tr><tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l249">Zeile 249:</td>
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<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>No more s***. All posts of this qtualiy from now on</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>No more s***. All posts of this qtualiy from now on</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>=<del style="font-weight: bold; text-decoration: none;">====Skalarprodukt</del>:<del style="font-weight: bold; text-decoration: none;">=====</del></div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">8RAWub <a href</ins>=<ins style="font-weight: bold; text-decoration: none;">"http</ins>:<ins style="font-weight: bold; text-decoration: none;">//pdgsgjgkfmzn.com/"</ins>><ins style="font-weight: bold; text-decoration: none;">pdgsgjgkfmzn</ins></<ins style="font-weight: bold; text-decoration: none;">a</ins>></div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">:<math</del>><del style="font-weight: bold; text-decoration: none;">\left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle {{\Psi }_{1}} | {\bar{r}} \right\rangle }\left\langle {\bar{r}} | {{\Psi }_{2}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r}{{\Psi }_{1}}(\bar{r})*{{\Psi }_{2}}(\bar{r})=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p}{{\tilde{\Psi }}_{1}}(\bar{p})*{{\tilde{\Psi }}_{2}}(\bar{p})</del></<del style="font-weight: bold; text-decoration: none;">math</del>></div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div> </div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>=====Norm:=====</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>=====Norm:=====</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left\| \Psi \right\|={{\left[ \int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle \Psi | {\bar{r}} \right\rangle }\left\langle {\bar{r}} | \Psi \right\rangle \right]}^{\frac{1}{2}}}={{\left[ \int_{{{R}^{3}}}^{{}}{{{d}^{3}}r{{\left| \Psi (\bar{r}) \right|}^{2}}} \right]}^{\frac{1}{2}}}</math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left\| \Psi \right\|={{\left[ \int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle \Psi | {\bar{r}} \right\rangle }\left\langle {\bar{r}} | \Psi \right\rangle \right]}^{\frac{1}{2}}}={{\left[ \int_{{{R}^{3}}}^{{}}{{{d}^{3}}r{{\left| \Psi (\bar{r}) \right|}^{2}}} \right]}^{\frac{1}{2}}}</math></div></td></tr>
</table>
62.4.73.228
https://wiki.physikerwelt.de/index.php?title=Zustandsvektoren_im_Hilbertraum&diff=1616&oldid=prev
201.204.81.42: /* Dual: */
2011-07-02T06:09:26Z
<p><span class="autocomment">Dual:</span></p>
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<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">← Nächstältere Version</td>
<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">Version vom 2. Juli 2011, 08:09 Uhr</td>
</tr><tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l247">Zeile 247:</td>
<td colspan="2" class="diff-lineno">Zeile 247:</td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>\end{align}</math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>\end{align}</math></div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Eigenschaften der Funktionen, die H aufspannen:</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Eigenschaften der Funktionen, die H aufspannen:</div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">=====Dual:=====</del></div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;">No more s</ins>***<ins style="font-weight: bold; text-decoration: none;">. All posts of this qtualiy from now on</ins></div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">:<math>\left\langle \Psi \right|=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left\langle \Psi | {\bar{p}} \right\rangle }\left\langle {\bar{p}} \right|=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle \Psi | {\bar{r}} \right\rangle }\left\langle {\bar{r}} \right|</math></del></div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div> </div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">Man spricht auch vom " Einschieben einer 1!".</del></div></td><td colspan="2" class="diff-side-added"></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><del style="font-weight: bold; text-decoration: none;">:<math>\left\langle \Psi | {\bar{r}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left\langle \Psi | {\bar{p}} \right\rangle }\left\langle {\bar{p}} | {\bar{r}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p}\tilde{\Psi }(\bar{p})</del>*<del style="font-weight: bold; text-decoration: none;">{{\left( 2\pi \hbar \right)}^{-\tfrac{3}{2}}}{{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}=\left\langle {\bar{r}} | \Psi \right\rangle </del>*<del style="font-weight: bold; text-decoration: none;">=\Psi (\bar{r})</del>*<del style="font-weight: bold; text-decoration: none;"></math></del></div></td><td colspan="2" class="diff-side-added"></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>=====Skalarprodukt:=====</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>=====Skalarprodukt:=====</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle {{\Psi }_{1}} | {\bar{r}} \right\rangle }\left\langle {\bar{r}} | {{\Psi }_{2}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r}{{\Psi }_{1}}(\bar{r})*{{\Psi }_{2}}(\bar{r})=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p}{{\tilde{\Psi }}_{1}}(\bar{p})*{{\tilde{\Psi }}_{2}}(\bar{p})</math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle {{\Psi }_{1}} | {\bar{r}} \right\rangle }\left\langle {\bar{r}} | {{\Psi }_{2}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r}{{\Psi }_{1}}(\bar{r})*{{\Psi }_{2}}(\bar{r})=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p}{{\tilde{\Psi }}_{1}}(\bar{p})*{{\tilde{\Psi }}_{2}}(\bar{p})</math></div></td></tr>
</table>
201.204.81.42
https://wiki.physikerwelt.de/index.php?title=Zustandsvektoren_im_Hilbertraum&diff=1615&oldid=prev
*>SchuBot: Interpunktion, replaced: ! → ! (6), ( → ( (14)
2010-09-12T22:47:20Z
<p>Interpunktion, replaced: ! → ! (6), ( → ( (14)</p>
<table style="background-color: #fff; color: #202122;" data-mw="interface">
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<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">← Nächstältere Version</td>
<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">Version vom 13. September 2010, 00:47 Uhr</td>
</tr><tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l3">Zeile 3:</td>
<td colspan="2" class="diff-lineno">Zeile 3:</td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\Psi (\bar{r})</math> sei ein Vektor im Hilbertraum als Wellenfunktion.</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\Psi (\bar{r})</math> sei ein Vektor im Hilbertraum als Wellenfunktion.</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>Dabei wird zunächst noch keine Aussage über stationäre oder zeitabhängige Vektoren gemacht. Noch ist t einfach als Argument unterdrückt. ( Zeitlosigkeit)</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>Dabei wird zunächst noch keine Aussage über stationäre oder zeitabhängige Vektoren gemacht. Noch ist t einfach als Argument unterdrückt. (Zeitlosigkeit)</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>'''Fourier- Trafo der Impulsdarstellung liefert '''<math>\Psi (\bar{r})</math>:</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>'''Fourier- Trafo der Impulsdarstellung liefert '''<math>\Psi (\bar{r})</math>:</div></td></tr>
<tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l57">Zeile 57:</td>
<td colspan="2" class="diff-lineno">Zeile 57:</td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Dies ist die umkehrbare und Eindeutige Darstellung der Wellenfunktion in Orts- und Impulsdarstellung (Eindeutigkeit nach dem Sampling- Theorem).</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Dies ist die umkehrbare und Eindeutige Darstellung der Wellenfunktion in Orts- und Impulsdarstellung (Eindeutigkeit nach dem Sampling- Theorem).</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>Da die Natur der Dinge diese Transformation beinhaltet sind keine Informationen unter einem gewissen Produkt aus Ort und Impuls in der Wellenfunktion enthalten. ( Sampling- Theorem) Da die Wellenfunktion aber per Definition das System vollständig beschreiben soll, kann in dem System keine Information enthalten sein, die eine größere Genauigkeit als diese der Unschärferelation aufweist.</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>Da die Natur der Dinge diese Transformation beinhaltet sind keine Informationen unter einem gewissen Produkt aus Ort und Impuls in der Wellenfunktion enthalten. (Sampling- Theorem) Da die Wellenfunktion aber per Definition das System vollständig beschreiben soll, kann in dem System keine Information enthalten sein, die eine größere Genauigkeit als diese der Unschärferelation aufweist.</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Also ist die Heisenbergsche Unschärferelation der Ausdruck einer inhärenten Unschärfe, die in der Natur der Dinge liegt, wenn denn der Formalismus der Quantenmechanik und ihre Axiome richtig sind.</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Also ist die Heisenbergsche Unschärferelation der Ausdruck einer inhärenten Unschärfe, die in der Natur der Dinge liegt, wenn denn der Formalismus der Quantenmechanik und ihre Axiome richtig sind.</div></td></tr>
<tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l75">Zeile 75:</td>
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<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>\end{align}</math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>\end{align}</math></div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>Als minimale Einheit der Wirkung ( gemäß Hamiltonschem Prinzip) gewinnen wir:</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>Als minimale Einheit der Wirkung (gemäß Hamiltonschem Prinzip) gewinnen wir:</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>:<math>\Delta x\Delta p=\frac{1}{2}\hbar </math> ( im eindimensionalen Fall)</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>:<math>\Delta x\Delta p=\frac{1}{2}\hbar </math> (im eindimensionalen Fall)</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>also für unser Informationsminimum:</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>also für unser Informationsminimum:</div></td></tr>
<tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l83">Zeile 83:</td>
<td colspan="2" class="diff-lineno">Zeile 83:</td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\Delta x\Delta k=\frac{1}{2}</math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\Delta x\Delta k=\frac{1}{2}</math></div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>Dies folgt unmittelbar aus der Fouriertransformation als Trafo- Vorschrift ! ( Sampling- Theorem)</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>Dies folgt unmittelbar aus der Fouriertransformation als Trafo- Vorschrift! (Sampling- Theorem)</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>Die Wellenfunktion kann unter dieser Quantisierung keine Information beinhalten !</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>Die Wellenfunktion kann unter dieser Quantisierung keine Information beinhalten!</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>Aber: Die Wellenfunktion beschriebt das System vollständig ( Axiom der Quantenmechanik !)</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>Aber: Die Wellenfunktion beschriebt das System vollständig (Axiom der Quantenmechanik!)</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Somit existiert in der Natur keine Information unter</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Somit existiert in der Natur keine Information unter</div></td></tr>
<tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l137">Zeile 137:</td>
<td colspan="2" class="diff-lineno">Zeile 137:</td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Übertragung auf Orts- und Impulsdarstellung''' quantentheoretischer Zustände:'''</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Übertragung auf Orts- und Impulsdarstellung''' quantentheoretischer Zustände:'''</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Der Zustandsvektor im Hilbertraum benötigt zur vollständigen Beschreibung einen 2n- dimensionalen Hilbertraum bei n Freiheitsgraden. In Orts- und Impulsdarstellung wird jedoch nur die jeweilige Komponente, ergo die Projektion der gesamten Wellenfunktion auf den Ortsanteil oder die Projektion der gesamten Wellenfunktion auf den Impulsanteil dargestellt.</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Der Zustandsvektor im Hilbertraum benötigt zur vollständigen Beschreibung einen 2n- dimensionalen Hilbertraum bei n Freiheitsgraden. In Orts- und Impulsdarstellung wird jedoch nur die jeweilige Komponente, ergo die Projektion der gesamten Wellenfunktion auf den Ortsanteil oder die Projektion der gesamten Wellenfunktion auf den Impulsanteil dargestellt.</div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>Dies ist vergleichbar mit einem System aus orthogonalen Achsen, wobei man die Projektion einer Funktion in diesem Raum auf eine bestimmte Anzahl von Achsen, beispielsweise auf die Anzahl Achsen, die die Bezeichnung <math>{{r}_{i}}</math> tragen, betrachtet ( Ortsdarstellung).</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>Dies ist vergleichbar mit einem System aus orthogonalen Achsen, wobei man die Projektion einer Funktion in diesem Raum auf eine bestimmte Anzahl von Achsen, beispielsweise auf die Anzahl Achsen, die die Bezeichnung <math>{{r}_{i}}</math> tragen, betrachtet (Ortsdarstellung).</div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>Die Anteile sind jedoch natürlich nicht voneinander unabhängig, sondern sie gehen durch die Fouriertrafo ineinander über !</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>Die Anteile sind jedoch natürlich nicht voneinander unabhängig, sondern sie gehen durch die Fouriertrafo ineinander über!</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Es macht ebenso Sinn, <math>\Psi (\bar{r})</math>und <math>\tilde{\Psi }(\bar{p})</math>als Projektionen eines abstrakten Zustandsvektors im Hilbertraum H auf die <math>\bar{r}</math>bzw. <math>\bar{p}</math>- Basis = Darstellung zu betrachten:</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Es macht ebenso Sinn, <math>\Psi (\bar{r})</math>und <math>\tilde{\Psi }(\bar{p})</math>als Projektionen eines abstrakten Zustandsvektors im Hilbertraum H auf die <math>\bar{r}</math>bzw. <math>\bar{p}</math>- Basis = Darstellung zu betrachten:</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\begin{align}</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\begin{align}</div></td></tr>
<tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l190">Zeile 190:</td>
<td colspan="2" class="diff-lineno">Zeile 190:</td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle ,\left\| {{\Psi }_{1}} \right\|>0\left\| {{\Psi }_{2}} \right\|>0\quad \Rightarrow </math>Die beiden Zustände <math>\left| {{\Psi }_{2}} \right\rangle und\left\langle {{\Psi }_{1}} \right|</math>sind orthogonal.</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle ,\left\| {{\Psi }_{1}} \right\|>0\left\| {{\Psi }_{2}} \right\|>0\quad \Rightarrow </math>Die beiden Zustände <math>\left| {{\Psi }_{2}} \right\rangle und\left\langle {{\Psi }_{1}} \right|</math>sind orthogonal.</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>2) Für <math>\left| {{\Psi }_{1}} \right\rangle ,\left| {{\Psi }_{2}} \right\rangle \in H</math>gilt: <math>\left| \left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle \right|\le \left\| {{\Psi }_{1}} \right\|\cdot \left\| {{\Psi }_{2}} \right\|</math> ( Schwarzsche Ungleichung)</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>2) Für <math>\left| {{\Psi }_{1}} \right\rangle ,\left| {{\Psi }_{2}} \right\rangle \in H</math>gilt: <math>\left| \left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle \right|\le \left\| {{\Psi }_{1}} \right\|\cdot \left\| {{\Psi }_{2}} \right\|</math> (Schwarzsche Ungleichung)</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>3) Äquivalent sind <math>\left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle </math>und <math>\left( {{\Psi }_{1}},{{\Psi }_{2}} \right)</math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>3) Äquivalent sind <math>\left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle </math>und <math>\left( {{\Psi }_{1}},{{\Psi }_{2}} \right)</math></div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>4) Zu unterscheiden sind:</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>4) Zu unterscheiden sind:</div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left| \Psi \right\rangle </math>= Ket- Vektor ( nach Dirac →Dirac- Schreibweise)</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left| \Psi \right\rangle </math>= Ket- Vektor (nach Dirac →Dirac- Schreibweise)</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left\langle \Psi \right|</math>=Bra- Vektor</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left\langle \Psi \right|</math>=Bra- Vektor</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>Zusammen ( Skalarprodukt): Bra-c-ket</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>Zusammen (Skalarprodukt): Bra-c-ket</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Dabei bilden die <math>\left\{ \left\langle \Psi \right| \right\}</math>den zu <math>\left\{ \left| \Psi \right\rangle \right\}</math>dualen Hilbertraum <math>H*:</math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Dabei bilden die <math>\left\{ \left\langle \Psi \right| \right\}</math>den zu <math>\left\{ \left| \Psi \right\rangle \right\}</math>dualen Hilbertraum <math>H*:</math></div></td></tr>
<tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l217">Zeile 217:</td>
<td colspan="2" class="diff-lineno">Zeile 217:</td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>& \tilde{\Psi }(\bar{p})=\left\langle {\bar{p}} | \Psi \right\rangle =\frac{1}{{{\left( 2\pi \hbar \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\Psi (\bar{r}){{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}}=\frac{1}{{{\left( 2\pi \hbar \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r{{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}}\left\langle {\bar{r}} | \Psi \right\rangle \\</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>& \tilde{\Psi }(\bar{p})=\left\langle {\bar{p}} | \Psi \right\rangle =\frac{1}{{{\left( 2\pi \hbar \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\Psi (\bar{r}){{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}}=\frac{1}{{{\left( 2\pi \hbar \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r{{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}}\left\langle {\bar{r}} | \Psi \right\rangle \\</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>\end{align}</math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>\end{align}</math></div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div> ist in der Ortsdarstellung eine Eigenfunktion ( Wohlgemerkt, eine Funktion!) zum Impuls, also die Ortsdarstellung des Impulszustandes Impuls- Eigenzustandes<math>\left| {\bar{p}} \right\rangle </math>). Der Zustand, der den Impuls repräsentiert und durch Anwendung des Impulsoperators den Impuls liefert.</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div> ist in der Ortsdarstellung eine Eigenfunktion (Wohlgemerkt, eine Funktion!) zum Impuls, also die Ortsdarstellung des Impulszustandes Impuls- Eigenzustandes<math>\left| {\bar{p}} \right\rangle </math>). Der Zustand, der den Impuls repräsentiert und durch Anwendung des Impulsoperators den Impuls liefert.</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Denn:</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Denn:</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\frac{\hbar }{i}\nabla {{e}^{\frac{i}{\hbar }\bar{p}\bar{r}}}=\bar{p}{{e}^{\frac{i}{\hbar }\bar{p}\bar{r}}}</math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\frac{\hbar }{i}\nabla {{e}^{\frac{i}{\hbar }\bar{p}\bar{r}}}=\bar{p}{{e}^{\frac{i}{\hbar }\bar{p}\bar{r}}}</math></div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>In Algebraischer Schreibweise bedeutet dies ( inklusive Normierung):</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>In Algebraischer Schreibweise bedeutet dies (inklusive Normierung):</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div> </div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div> </div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Impulseigenfunktion in Ortsdarstellung</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Impulseigenfunktion in Ortsdarstellung</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left\langle {\bar{p}} | {\bar{r}} \right\rangle \tilde{\ }{{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}</math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left\langle {\bar{p}} | {\bar{r}} \right\rangle \tilde{\ }{{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}</math></div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Ortseigenfunktion in Impulsdarstellung</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Ortseigenfunktion in Impulsdarstellung</div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>( Diese beiden gehen durch komplexe Konjugation ineinander über !)</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>(Diese beiden gehen durch komplexe Konjugation ineinander über!)</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Damit folgt:</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Damit folgt:</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\begin{align}</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\begin{align}</div></td></tr>
<tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l234">Zeile 234:</td>
<td colspan="2" class="diff-lineno">Zeile 234:</td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Da <math>\bar{r}</math>und <math>\bar{p}</math>vollständige Darstellungen sind, folgt:</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Da <math>\bar{r}</math>und <math>\bar{p}</math>vollständige Darstellungen sind, folgt:</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left| \Psi \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left| {\bar{p}} \right\rangle }\left\langle {\bar{p}} | \Psi \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left| {\bar{r}} \right\rangle }\left\langle {\bar{r}} | \Psi \right\rangle </math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left| \Psi \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left| {\bar{p}} \right\rangle }\left\langle {\bar{p}} | \Psi \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left| {\bar{r}} \right\rangle }\left\langle {\bar{r}} | \Psi \right\rangle </math></div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>analog zur Entwicklung des Vektors <math>\left| {\bar{a}} \right\rangle \in {{R}^{n}}</math>nach Basisvektoren ( in seinen Koordinaten, mit seinen Koordinaten als Entwicklungskoeffizienten).</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>analog zur Entwicklung des Vektors <math>\left| {\bar{a}} \right\rangle \in {{R}^{n}}</math>nach Basisvektoren (in seinen Koordinaten, mit seinen Koordinaten als Entwicklungskoeffizienten).</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\bar{a}=\sum\limits_{j}{{}}{{a}_{j}}\left| {{{\bar{e}}}_{j}} \right\rangle =\sum\limits_{j}{\left| {{{\bar{e}}}_{j}} \right\rangle \left\langle {{{\bar{e}}}_{j}} | {\bar{a}} \right\rangle =\sum\limits_{j}{{}}{{a}_{j}}\acute{\ }\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle }=\sum\limits_{j}{\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle \left\langle {{{\bar{e}}}_{j}}\acute{\ } | {\bar{a}} \right\rangle }</math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\bar{a}=\sum\limits_{j}{{}}{{a}_{j}}\left| {{{\bar{e}}}_{j}} \right\rangle =\sum\limits_{j}{\left| {{{\bar{e}}}_{j}} \right\rangle \left\langle {{{\bar{e}}}_{j}} | {\bar{a}} \right\rangle =\sum\limits_{j}{{}}{{a}_{j}}\acute{\ }\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle }=\sum\limits_{j}{\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle \left\langle {{{\bar{e}}}_{j}}\acute{\ } | {\bar{a}} \right\rangle }</math></div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Somit folgt jedoch:</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Somit folgt jedoch:</div></td></tr>
<tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l249">Zeile 249:</td>
<td colspan="2" class="diff-lineno">Zeile 249:</td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>=====Dual:=====</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>=====Dual:=====</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left\langle \Psi \right|=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left\langle \Psi | {\bar{p}} \right\rangle }\left\langle {\bar{p}} \right|=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle \Psi | {\bar{r}} \right\rangle }\left\langle {\bar{r}} \right|</math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left\langle \Psi \right|=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left\langle \Psi | {\bar{p}} \right\rangle }\left\langle {\bar{p}} \right|=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle \Psi | {\bar{r}} \right\rangle }\left\langle {\bar{r}} \right|</math></div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>Man spricht auch vom " Einschieben einer 1 !".</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>Man spricht auch vom " Einschieben einer 1!".</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left\langle \Psi | {\bar{r}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left\langle \Psi | {\bar{p}} \right\rangle }\left\langle {\bar{p}} | {\bar{r}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p}\tilde{\Psi }(\bar{p})*{{\left( 2\pi \hbar \right)}^{-\tfrac{3}{2}}}{{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}=\left\langle {\bar{r}} | \Psi \right\rangle *=\Psi (\bar{r})*</math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left\langle \Psi | {\bar{r}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left\langle \Psi | {\bar{p}} \right\rangle }\left\langle {\bar{p}} | {\bar{r}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p}\tilde{\Psi }(\bar{p})*{{\left( 2\pi \hbar \right)}^{-\tfrac{3}{2}}}{{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}=\left\langle {\bar{r}} | \Psi \right\rangle *=\Psi (\bar{r})*</math></div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>=====Skalarprodukt:=====</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>=====Skalarprodukt:=====</div></td></tr>
</table>
*>SchuBot
https://wiki.physikerwelt.de/index.php?title=Zustandsvektoren_im_Hilbertraum&diff=1614&oldid=prev
*>SchuBot: /* Axiome des Hilbertraums H: */Pfeile einfügen, replaced: -> → →
2010-09-12T20:09:48Z
<p><span class="autocomment">Axiome des Hilbertraums H:: </span>Pfeile einfügen, replaced: -> → →</p>
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<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">← Nächstältere Version</td>
<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">Version vom 12. September 2010, 22:09 Uhr</td>
</tr><tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l193">Zeile 193:</td>
<td colspan="2" class="diff-lineno">Zeile 193:</td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>3) Äquivalent sind <math>\left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle </math>und <math>\left( {{\Psi }_{1}},{{\Psi }_{2}} \right)</math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>3) Äquivalent sind <math>\left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle </math>und <math>\left( {{\Psi }_{1}},{{\Psi }_{2}} \right)</math></div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>4) Zu unterscheiden sind:</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>4) Zu unterscheiden sind:</div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left| \Psi \right\rangle </math>= Ket- Vektor ( nach Dirac <del style="font-weight: bold; text-decoration: none;">->Dirac</del>- Schreibweise)</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left| \Psi \right\rangle </math>= Ket- Vektor ( nach Dirac <ins style="font-weight: bold; text-decoration: none;">→Dirac</ins>- Schreibweise)</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left\langle \Psi \right|</math>=Bra- Vektor</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>:<math>\left\langle \Psi \right|</math>=Bra- Vektor</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
</table>
*>SchuBot
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*>SchuBot: Einrückungen Mathematik
2010-09-12T14:49:20Z
<p>Einrückungen Mathematik</p>
<a href="https://wiki.physikerwelt.de/index.php?title=Zustandsvektoren_im_Hilbertraum&diff=1613&oldid=1612">Änderungen zeigen</a>
*>SchuBot
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*>SchuBot am 11. September 2010 um 17:18 Uhr
2010-09-11T17:18:23Z
<p></p>
<table style="background-color: #fff; color: #202122;" data-mw="interface">
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<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">Version vom 11. September 2010, 19:18 Uhr</td>
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<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div><math>\begin{align}</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div><math>\begin{align}</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>& \bar{a}=\sum\limits_{j}{{}}{{a}_{j}}\left| {{{\bar{e}}}_{j}} \right\rangle =\sum\limits_{j}{\left\langle {{{\bar{e}}}_{j}} | {\bar{a}} \right\rangle }\left| {{{\bar{e}}}_{j}} \right\rangle =\sum\limits_{j}{\left| {{{\bar{e}}}_{j}} \right\rangle \left\langle {{{\bar{e}}}_{j}} <del style="font-weight: bold; text-decoration: none;">\right|\left</del>| {\bar{a}} \right\rangle } \\</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>& \bar{a}=\sum\limits_{j}{{}}{{a}_{j}}\left| {{{\bar{e}}}_{j}} \right\rangle =\sum\limits_{j}{\left\langle {{{\bar{e}}}_{j}} | {\bar{a}} \right\rangle }\left| {{{\bar{e}}}_{j}} \right\rangle =\sum\limits_{j}{\left| {{{\bar{e}}}_{j}} \right\rangle \left\langle {{{\bar{e}}}_{j}} <ins style="font-weight: bold; text-decoration: none;"> </ins>| <ins style="font-weight: bold; text-decoration: none;"> </ins>{\bar{a}} \right\rangle } \\</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>& \bar{a}=\sum\limits_{j}{{}}{{a}_{j}}\acute{\ }\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle =\sum\limits_{j}{\left\langle {{{\bar{e}}}_{j}}\acute{\ } | {\bar{a}} \right\rangle }\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle =\sum\limits_{j}{\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle \left\langle {{{\bar{e}}}_{j}}\acute{\ } <del style="font-weight: bold; text-decoration: none;">\right|\left</del>| {\bar{a}} \right\rangle } \\</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>& \bar{a}=\sum\limits_{j}{{}}{{a}_{j}}\acute{\ }\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle =\sum\limits_{j}{\left\langle {{{\bar{e}}}_{j}}\acute{\ } | {\bar{a}} \right\rangle }\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle =\sum\limits_{j}{\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle \left\langle {{{\bar{e}}}_{j}}\acute{\ } <ins style="font-weight: bold; text-decoration: none;"> </ins>| <ins style="font-weight: bold; text-decoration: none;"> </ins>{\bar{a}} \right\rangle } \\</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>\end{align}</math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>\end{align}</math></div></td></tr>
<tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l235">Zeile 235:</td>
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<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div><math>\left| \Psi \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left| {\bar{p}} \right\rangle }\left\langle {\bar{p}} | \Psi \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left| {\bar{r}} \right\rangle }\left\langle {\bar{r}} | \Psi \right\rangle </math></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div><math>\left| \Psi \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left| {\bar{p}} \right\rangle }\left\langle {\bar{p}} | \Psi \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left| {\bar{r}} \right\rangle }\left\langle {\bar{r}} | \Psi \right\rangle </math></div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>analog zur Entwicklung des Vektors <math>\left| {\bar{a}} \right\rangle \in {{R}^{n}}</math>nach Basisvektoren ( in seinen Koordinaten, mit seinen Koordinaten als Entwicklungskoeffizienten).</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>analog zur Entwicklung des Vektors <math>\left| {\bar{a}} \right\rangle \in {{R}^{n}}</math>nach Basisvektoren ( in seinen Koordinaten, mit seinen Koordinaten als Entwicklungskoeffizienten).</div></td></tr>
<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div><math>\bar{a}=\sum\limits_{j}{{}}{{a}_{j}}\left| {{{\bar{e}}}_{j}} \right\rangle =\sum\limits_{j}{\left| {{{\bar{e}}}_{j}} \right\rangle \left\langle {{{\bar{e}}}_{j}} <del style="font-weight: bold; text-decoration: none;">\right|\left</del>| {\bar{a}} \right\rangle =\sum\limits_{j}{{}}{{a}_{j}}\acute{\ }\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle }=\sum\limits_{j}{\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle \left\langle {{{\bar{e}}}_{j}}\acute{\ } <del style="font-weight: bold; text-decoration: none;">\right|\left</del>| {\bar{a}} \right\rangle }</math></div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><math>\bar{a}=\sum\limits_{j}{{}}{{a}_{j}}\left| {{{\bar{e}}}_{j}} \right\rangle =\sum\limits_{j}{\left| {{{\bar{e}}}_{j}} \right\rangle \left\langle {{{\bar{e}}}_{j}} <ins style="font-weight: bold; text-decoration: none;"> </ins>| <ins style="font-weight: bold; text-decoration: none;"> </ins>{\bar{a}} \right\rangle =\sum\limits_{j}{{}}{{a}_{j}}\acute{\ }\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle }=\sum\limits_{j}{\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle \left\langle {{{\bar{e}}}_{j}}\acute{\ } <ins style="font-weight: bold; text-decoration: none;"> </ins>| <ins style="font-weight: bold; text-decoration: none;"> </ins>{\bar{a}} \right\rangle }</math></div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Somit folgt jedoch:</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div>Somit folgt jedoch:</div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div><math>\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left| {\bar{p}} \right\rangle \left\langle {\bar{p}} \right|}=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left| {\bar{r}} \right\rangle }\left\langle {\bar{r}} \right|=1</math> als Vollständigkeits- Relation. Nebenbemerkung: Der Hilbertraum der Zustände hat unendliche Dimension.</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div><math>\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left| {\bar{p}} \right\rangle \left\langle {\bar{p}} \right|}=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left| {\bar{r}} \right\rangle }\left\langle {\bar{r}} \right|=1</math> als Vollständigkeits- Relation. Nebenbemerkung: Der Hilbertraum der Zustände hat unendliche Dimension.</div></td></tr>
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*>SchuBot
https://wiki.physikerwelt.de/index.php?title=Zustandsvektoren_im_Hilbertraum&diff=1611&oldid=prev
Schubotz am 9. September 2010 um 14:33 Uhr
2010-09-09T14:33:05Z
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<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">Version vom 9. September 2010, 16:33 Uhr</td>
</tr><tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l1">Zeile 1:</td>
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<tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>{{Scripthinweis|Quantenmechanik|2|1}}</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div><ins style="font-weight: bold; text-decoration: none;"><noinclude></ins>{{Scripthinweis|Quantenmechanik|2|1}}<ins style="font-weight: bold; text-decoration: none;"></noinclude></ins></div></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr>
<tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div><math>\Psi (\bar{r})</math> sei ein Vektor im Hilbertraum als Wellenfunktion.</div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div><math>\Psi (\bar{r})</math> sei ein Vektor im Hilbertraum als Wellenfunktion.</div></td></tr>
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Schubotz: Die Seite wurde neu angelegt: „{{Scripthinweis|Quantenmechanik|2|1}} <math>\Psi (\bar{r})</math> sei ein Vektor im Hilbertraum als Wellenfunktion. Dabei wird zunächst noch keine Aussage übe…“
2010-08-24T15:00:46Z
<p>Die Seite wurde neu angelegt: „{{Scripthinweis|Quantenmechanik|2|1}} <math>\Psi (\bar{r})</math> sei ein Vektor im Hilbertraum als Wellenfunktion. Dabei wird zunächst noch keine Aussage übe…“</p>
<p><b>Neue Seite</b></p><div>{{Scripthinweis|Quantenmechanik|2|1}}<br />
<br />
<math>\Psi (\bar{r})</math> sei ein Vektor im Hilbertraum als Wellenfunktion.<br />
<br />
Dabei wird zunächst noch keine Aussage über stationäre oder zeitabhängige Vektoren gemacht. Noch ist t einfach als Argument unterdrückt. ( Zeitlosigkeit)<br />
<br />
'''Fourier- Trafo der Impulsdarstellung liefert '''<math>\Psi (\bar{r})</math>:<br />
<br />
<math>\Psi (\bar{r})=\frac{1}{{{\left( 2\pi \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}k\Phi (\bar{k}){{e}^{i\bar{k}\bar{r}}}}</math> in Ortsdarstellung<br />
<br />
Laßt Euch hier nicht verwirren. Die Verwendung von x und k als kanonisch konjugierte Variablen ist völlig analog zu x- p als Variablen, denn wegen<br />
<br />
<math>\bar{p}=\bar{k}\hbar </math><br />
<br />
entspricht die Verwendung von <math>\bar{p}</math>als kanonisch konjugierte Variable alleine der Mitnahme des Vorfaktors<br />
<br />
<math>\begin{align}<br />
<br />
& \frac{1}{{{\hbar }^{\frac{f}{2}}}} \\<br />
<br />
& \Psi (\bar{r})=\frac{1}{{{\left( 2\pi \hbar \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\Phi \left( \frac{{\bar{p}}}{\hbar } \right){{e}^{\frac{i}{\hbar }\bar{p}\bar{r}}}} \\<br />
<br />
\end{align}</math><br />
<br />
Die Umkehrung ist nach dem Fourier- Theorem möglich:<br />
<br />
<math>\begin{align}<br />
<br />
& \int_{{{R}^{3}}}^{{}}{{{d}^{3}}x}\Psi (\bar{r}){{e}^{-i\bar{k}\acute{\ }\bar{r}}}=\frac{1}{{{\left( 2\pi \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}k\Phi (\bar{k})\int_{{}}^{{}}{{{d}^{3}}r}{{e}^{i\left( \bar{k}-\bar{k}\acute{\ } \right)\bar{r}}}} \\<br />
<br />
& \int_{{{R}^{3}}}^{{}}{{{d}^{3}}r}{{e}^{i\left( \bar{k}-\bar{k}\acute{\ } \right)\bar{r}}}={{\left( 2\pi \right)}^{3}}\delta (\bar{k}-\bar{k}\acute{\ }) \\<br />
<br />
& \Rightarrow \frac{1}{{{\left( 2\pi \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}k\Phi (\bar{k})\int_{{}}^{{}}{{{d}^{3}}r}{{e}^{i\left( \bar{k}-\bar{k}\acute{\ } \right)\bar{r}}}}=\frac{1}{{{\left( 2\pi \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}k\Phi (\bar{k})}{{\left( 2\pi \right)}^{3}}\delta (\bar{k}-\bar{k}\acute{\ })={{\left( 2\pi \right)}^{\tfrac{3}{2}}}\Phi (\bar{k}\acute{\ }) \\<br />
<br />
& \Rightarrow \Phi (\bar{k})=\frac{1}{{{\left( 2\pi \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}x}\Psi (\bar{r}){{e}^{-i\bar{k}\bar{r}}} \\<br />
<br />
\end{align}</math><br />
<br />
Mit Hilfe: <math>\begin{align}<br />
<br />
& p=\hbar k \\<br />
<br />
& \tilde{\Psi }(\bar{p})={{\hbar }^{-\tfrac{3}{2}}}\Phi (\bar{k}) \\<br />
<br />
\end{align}</math><br />
<br />
Ergibt sich die gängige Darstellung<br />
<br />
<math>\begin{align}<br />
<br />
& \Psi (\bar{r})=\frac{1}{{{\left( 2\pi \hbar \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\tilde{\Psi }(\bar{p}){{e}^{\frac{i}{\hbar }\bar{p}\bar{r}}}} \\<br />
<br />
& \tilde{\Psi }(\bar{p})=\frac{1}{{{\left( 2\pi \hbar \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\Psi (\bar{r}){{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}} \\<br />
<br />
\end{align}</math><br />
<br />
Dies ist die umkehrbare und Eindeutige Darstellung der Wellenfunktion in Orts- und Impulsdarstellung (Eindeutigkeit nach dem Sampling- Theorem).<br />
<br />
Da die Natur der Dinge diese Transformation beinhaltet sind keine Informationen unter einem gewissen Produkt aus Ort und Impuls in der Wellenfunktion enthalten. ( Sampling- Theorem) Da die Wellenfunktion aber per Definition das System vollständig beschreiben soll, kann in dem System keine Information enthalten sein, die eine größere Genauigkeit als diese der Unschärferelation aufweist.<br />
<br />
Also ist die Heisenbergsche Unschärferelation der Ausdruck einer inhärenten Unschärfe, die in der Natur der Dinge liegt, wenn denn der Formalismus der Quantenmechanik und ihre Axiome richtig sind.<br />
<br />
<u>'''Wiederholung'''</u><br />
<br />
Angesichts eines informationstheoretischen Zugangs zur Quantenmechanik ist dies eine wichtige Aussage:<br />
<br />
Wir haben also als Transformationsvorschrift zwischen kanonisch konjugierten Variablen die Fouriertransformation:<br />
<br />
<math>\begin{align}<br />
<br />
& \Psi (\bar{r})=\frac{1}{{{\left( 2\pi \hbar \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\tilde{\Psi }(\bar{p}){{e}^{\frac{i}{\hbar }\bar{p}\bar{r}}}} \\<br />
<br />
& \tilde{\Psi }(\bar{p})=\frac{1}{{{\left( 2\pi \hbar \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\Psi (\bar{r}){{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}} \\<br />
<br />
\end{align}</math><br />
<br />
Als minimale Einheit der Wirkung ( gemäß Hamiltonschem Prinzip) gewinnen wir:<br />
<br />
<math>\Delta x\Delta p=\frac{1}{2}\hbar </math> ( im eindimensionalen Fall)<br />
<br />
also für unser Informationsminimum:<br />
<br />
<math>\Delta x\Delta k=\frac{1}{2}</math><br />
<br />
Dies folgt unmittelbar aus der Fouriertransformation als Trafo- Vorschrift ! ( Sampling- Theorem)<br />
<br />
Die Wellenfunktion kann unter dieser Quantisierung keine Information beinhalten !<br />
<br />
Aber: Die Wellenfunktion beschriebt das System vollständig ( Axiom der Quantenmechanik !)<br />
<br />
Somit existiert in der Natur keine Information unter<br />
<br />
<math>\Delta x\Delta p<\frac{1}{2}\hbar </math><br />
<br />
'''Geometrische Analogie '''der Transformation zwischen Orts- und Impulsdarstellung:<br />
<br />
Sei <math>V={{R}^{n}}</math>ein n- dimensionaler Vektorraum, das heißt, die Metrik sei durch ein euklidisches Skalarprodukt <math>\left\langle {\bar{a}} | {\bar{b}} \right\rangle =\sum\limits_{i=1}^{n}{{}}{{a}_{i}}{{b}_{i}}</math>erklärt.<br />
<br />
Seien <math>\left\{ {{{\bar{e}}}_{1}},{{{\bar{e}}}_{2}},...,{{{\bar{e}}}_{n}} \right\}</math>, <math>\left\{ {{{\bar{e}}}_{1}}\acute{\ },{{{\bar{e}}}_{2}}\acute{\ },...,{{{\bar{e}}}_{n}}\acute{\ } \right\}</math>und <math>\left\{ {{{\tilde{\bar{e}}}}_{1}},{{{\tilde{\bar{e}}}}_{2}},...,{{{\tilde{\bar{e}}}}_{n}} \right\}</math>drei beliebige Basen des <math>{{R}^{n}}</math>.<br />
<br />
Ein Vektor kann natürlich bezüglich der einen oder der anderen Basis dargestellt werden:<br />
<br />
<math>\bar{a}=\sum\limits_{j=1}^{n}{{}}{{a}_{j}}{{\bar{e}}_{j}}=\sum\limits_{j=1}^{n}{{}}{{a}_{j}}\acute{\ }{{\bar{e}}_{j}}\acute{\ }=\sum\limits_{j=1}^{n}{{}}{{\tilde{a}}_{j}}{{\tilde{\bar{e}}}_{j}}</math><br />
<br />
Die Basen sollen die folgenden Eigenschaften haben:<br />
<br />
Orthonormalität: <math>\left\langle {{{\bar{e}}}_{i}} | {{{\bar{e}}}_{j}} \right\rangle =\left\langle {{{\bar{e}}}_{i}}\acute{\ } | {{{\bar{e}}}_{j}}\acute{\ } \right\rangle ={{\delta }_{ij}}</math><br />
<br />
Die Projektion auf die Basisvektoren erfolgt durch die Bildung des Skalarproduktes:<br />
<br />
<math>\begin{align}<br />
<br />
& \left\langle {{{\bar{e}}}_{i}} | {\bar{a}} \right\rangle ={{a}_{i}}=\sum\limits_{j}{{}}{{a}_{j}}\left\langle {{{\bar{e}}}_{i}} | {{{\bar{e}}}_{j}} \right\rangle =\sum\limits_{j}{{{a}_{j}}}{{\delta }_{ij}} \\<br />
<br />
& \left\langle {{{\bar{e}}}_{i}}\acute{\ } | {\bar{a}} \right\rangle ={{a}_{i}}\acute{\ }=\sum\limits_{j}{{}}{{a}_{j}}\acute{\ }\left\langle {{{\bar{e}}}_{i}}\acute{\ } | {{{\bar{e}}}_{j}}\acute{\ } \right\rangle =\sum\limits_{j}{{{a}_{j}}\acute{\ }}{{\delta }_{ij}} \\<br />
<br />
\end{align}</math><br />
<br />
Natürlich kann jeder Vektor in einer beliebigen Basis formal entwickelt werden. Die Entwicklungskoeffizienten sind die Projektionen auf die jeweiligen Basisvektoren und natürlich von der Wahl der Basis abhängig :<br />
<br />
<math>\begin{align}<br />
<br />
& \bar{a}=\sum\limits_{j}{{}}{{a}_{j}}\left| {{{\bar{e}}}_{j}} \right\rangle =\sum\limits_{j}{\left\langle {{{\bar{e}}}_{j}} | {\bar{a}} \right\rangle }\left| {{{\bar{e}}}_{j}} \right\rangle =\sum\limits_{j}{\left| {{{\bar{e}}}_{j}} \right\rangle \left\langle {{{\bar{e}}}_{j}} \right|\left| {\bar{a}} \right\rangle } \\<br />
<br />
& \bar{a}=\sum\limits_{j}{{}}{{a}_{j}}\acute{\ }\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle =\sum\limits_{j}{\left\langle {{{\bar{e}}}_{j}}\acute{\ } | {\bar{a}} \right\rangle }\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle =\sum\limits_{j}{\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle \left\langle {{{\bar{e}}}_{j}}\acute{\ } \right|\left| {\bar{a}} \right\rangle } \\<br />
<br />
\end{align}</math><br />
<br />
Im Sinne von:<br />
<br />
<math>\left\langle {\bar{b}} | {\bar{a}} \right\rangle =\sum\limits_{j}{{{b}_{j}}}{{a}_{j}}=\sum\limits_{j}{{}}\left\langle b | {{{\bar{e}}}_{j}} \right\rangle \left\langle {{{\bar{e}}}_{j}} | a \right\rangle =\sum\limits_{j}{{}}\left\langle b | {{{\bar{e}}}_{j}}\acute{\ } \right\rangle \left\langle {{{\bar{e}}}_{j}}\acute{\ } | a \right\rangle </math><br />
<br />
Formal gilt damit:<br />
<br />
<math>\sum\limits_{j=1}^{n}{\left| {{{\bar{e}}}_{j}} \right\rangle \left\langle {{{\bar{e}}}_{j}} \right|=}\sum\limits_{j=1}^{n}{\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle \left\langle {{{\bar{e}}}_{j}}\acute{\ } \right|}</math><br />
Dies ist die VOLLSTÄNDIGKEITSRELATION: Die Basis- Vektoren spannen den n- dimensionalen <math>{{R}^{n}}</math>auf.<br />
Übertragung auf Orts- und Impulsdarstellung''' quantentheoretischer Zustände:'''<br />
Der Zustandsvektor im Hilbertraum benötigt zur vollständigen Beschreibung einen 2n- dimensionalen Hilbertraum bei n Freiheitsgraden. In Orts- und Impulsdarstellung wird jedoch nur die jeweilige Komponente, ergo die Projektion der gesamten Wellenfunktion auf den Ortsanteil oder die Projektion der gesamten Wellenfunktion auf den Impulsanteil dargestellt.<br />
Dies ist vergleichbar mit einem System aus orthogonalen Achsen, wobei man die Projektion einer Funktion in diesem Raum auf eine bestimmte Anzahl von Achsen, beispielsweise auf die Anzahl Achsen, die die Bezeichnung <math>{{r}_{i}}</math> tragen, betrachtet ( Ortsdarstellung).<br />
Die Anteile sind jedoch natürlich nicht voneinander unabhängig, sondern sie gehen durch die Fouriertrafo ineinander über !<br />
Es macht ebenso Sinn, <math>\Psi (\bar{r})</math>und <math>\tilde{\Psi }(\bar{p})</math>als Projektionen eines abstrakten Zustandsvektors im Hilbertraum H auf die <math>\bar{r}</math>bzw. <math>\bar{p}</math>- Basis = Darstellung zu betrachten:<br />
<math>\begin{align}<br />
& \Psi (\bar{r}):=\left\langle {\bar{r}} | \Psi \right\rangle \\<br />
& \Psi (\bar{p}):=\left\langle {\bar{p}} | \Psi \right\rangle \\<br />
\end{align}</math>mit <math>\Psi \in H</math>als Zustandsvektor.<br />
====Axiome des Hilbertraums H:====<br />
# <u>H ist ein komplexer Vektorraum:</u><br />
#* Assoziativität: <math>\left| {{\Psi }_{1}} \right\rangle +\left( \left| {{\Psi }_{2}} \right\rangle +\left| {{\Psi }_{3}} \right\rangle \right)=\left( \left| {{\Psi }_{1}} \right\rangle +\left| {{\Psi }_{2}} \right\rangle \right)+\left| {{\Psi }_{3}} \right\rangle </math><br />
#* Nullelement: <math>\exists \left| 0 \right\rangle \in H:\left| 0 \right\rangle +\left| \Psi \right\rangle =\left| \Psi \right\rangle =\left| \Psi \right\rangle +\left| 0 \right\rangle \forall \left| \Psi \right\rangle \in H</math><br />
#* Inverses: <math>\forall \left| \Psi \right\rangle \exists \left| -\Psi \right\rangle :\left| \Psi \right\rangle +\left| -\Psi \right\rangle =\left| 0 \right\rangle </math><br />
#* Kommutativität: <math>\left| {{\Psi }_{1}} \right\rangle +\left| {{\Psi }_{2}} \right\rangle =\left| {{\Psi }_{2}} \right\rangle +\left| {{\Psi }_{1}} \right\rangle </math><br />
Dadurch werden die Elemente aus H zu einer kommutativen Gruppe<br />
Weiter gilt: Distributivgesetz:<br />
<math>\alpha \left( \left| {{\Psi }_{1}} \right\rangle +\left| {{\Psi }_{2}} \right\rangle \right)=\alpha \left| {{\Psi }_{1}} \right\rangle +\alpha \left| {{\Psi }_{2}} \right\rangle \forall \alpha \in C</math><br />
<math>\left( \alpha +\beta \right)\left| \Psi \right\rangle =\alpha \left| \Psi \right\rangle +\beta \left| \Psi \right\rangle </math><br />
<br />
Das Assoziativgesetz und weitere Rechenregel bei Multiplikation mit 1 und Null aus den komplexen Zahlen:<br />
<math>\begin{align}<br />
& \left( \alpha \right)\left( \beta \left| \Psi \right\rangle \right)=\left( \alpha \beta \right)\left| \Psi \right\rangle \\<br />
& 1\cdot \left| \Psi \right\rangle =\left| \Psi \right\rangle \\<br />
& 0\cdot \left| \Psi \right\rangle =\left| 0 \right\rangle \\<br />
\end{align}</math><br />
<br />
2) H hat ein Skalarprodukt: <math>\left\langle {} | {} \right\rangle :H\times H\to C</math>mit:<br />
<math>\begin{align}<br />
& \left\langle \Psi | \Psi \right\rangle \ge 0:\left\langle \Psi | \Psi \right\rangle =0\to \left| \Psi \right\rangle =\left| 0 \right\rangle \\<br />
& \left\langle \Psi | {{\Psi }_{1}}+{{\Psi }_{2}} \right\rangle =\left\langle \Psi | {{\Psi }_{1}} \right\rangle +\left\langle \Psi | {{\Psi }_{2}} \right\rangle \\<br />
& \left\langle {{\Psi }_{1}} | \alpha {{\Psi }_{2}} \right\rangle =\alpha \left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle \\<br />
& \left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle =\left\langle {{\Psi }_{2}} | {{\Psi }_{1}} \right\rangle * \\<br />
\end{align}</math><br />
<br />
Damit bereits kann gezeigt werden: <math>\left\langle \alpha {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle =\alpha *\left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle </math><br />
Das Skalarprdukt induziert eine Norm: <math>\left\| {} \right\|:H\to R</math><br />
<math>\begin{align}<br />
& \left\| \Psi \right\|\ge 0:\left\| \Psi \right\|=0\to \left| \Psi \right\rangle =\left| 0 \right\rangle \\<br />
& \left\| \alpha \Psi \right\|=\left| \alpha \right|\left\| \Psi \right\| \\<br />
& \left\| {{\Psi }_{1}}+{{\Psi }_{2}} \right\|\le \left\| {{\Psi }_{1}} \right\|+\left\| {{\Psi }_{2}} \right\| \\<br />
\end{align}</math><br />
Dabei ist letzteres, die Dreiecksungleichung, bedingt durch die Definition:<br />
<math>\left\| \Psi \right\|=\sqrt{\left\langle \Psi | \Psi \right\rangle }</math><br />
3) <math>H</math>ist vollständig. Das heißt: Jede konvergente Folge <math>{{\left\{ {{\Psi }_{n}} \right\}}_{n\in N}}</math>konvergiert gegen ein <math>\left| \Psi \right\rangle \in H</math><br />
Also: konvergente Folge von Eigenzuständen: Cauchy- Kriterium: <math>\begin{matrix}<br />
\lim \\<br />
n\to \infty \\<br />
\end{matrix}\left\| {{\Psi }_{n+1}}-{{\Psi }_{n}} \right\|=0</math><br />
<br />
Bemerkungen<br />
<br />
1) Die Norm verallgemeinert den Abstandsbegriff auf abstrakte Räume. Das Skalarprodukt verallgemeinert den Winkelbegriff auf abstrakte Räume:<br />
<math>\left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle ,\left\| {{\Psi }_{1}} \right\|>0\left\| {{\Psi }_{2}} \right\|>0\quad \Rightarrow </math>Die beiden Zustände <math>\left| {{\Psi }_{2}} \right\rangle und\left\langle {{\Psi }_{1}} \right|</math>sind orthogonal.<br />
<br />
2) Für <math>\left| {{\Psi }_{1}} \right\rangle ,\left| {{\Psi }_{2}} \right\rangle \in H</math>gilt: <math>\left| \left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle \right|\le \left\| {{\Psi }_{1}} \right\|\cdot \left\| {{\Psi }_{2}} \right\|</math> ( Schwarzsche Ungleichung)<br />
3) Äquivalent sind <math>\left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle </math>und <math>\left( {{\Psi }_{1}},{{\Psi }_{2}} \right)</math><br />
4) Zu unterscheiden sind:<br />
<math>\left| \Psi \right\rangle </math>= Ket- Vektor ( nach Dirac ->Dirac- Schreibweise)<br />
<math>\left\langle \Psi \right|</math>=Bra- Vektor<br />
<br />
Zusammen ( Skalarprodukt): Bra-c-ket<br />
<br />
Dabei bilden die <math>\left\{ \left\langle \Psi \right| \right\}</math>den zu <math>\left\{ \left| \Psi \right\rangle \right\}</math>dualen Hilbertraum <math>H*:</math><br />
<math>\left| \Psi \right\rangle ={{\lambda }_{1}}\left| {{\Psi }_{1}} \right\rangle +{{\lambda }_{2}}\left| {{\Psi }_{2}} \right\rangle </math>, <math>\left| \Psi \right\rangle ={{\lambda }_{1}},{{\lambda }_{2}}\in C</math><br />
impliziert mit beliebigem <math>\left\langle \Phi \right|</math>:<br />
<math>\begin{align}<br />
& \left\langle \Phi | \Psi \right\rangle ={{\lambda }_{1}}\left\langle \Phi | {{\Psi }_{1}} \right\rangle +{{\lambda }_{2}}\left\langle \Phi | {{\Psi }_{2}} \right\rangle \\<br />
& \Rightarrow \left\langle \Phi | \Psi \right\rangle *={{\lambda }_{1}}*\left\langle \Phi | {{\Psi }_{1}} \right\rangle *+{{\lambda }_{2}}*\left\langle \Phi | {{\Psi }_{2}} \right\rangle * \\<br />
& \Rightarrow \left\langle \Psi | \Phi \right\rangle ={{\lambda }_{1}}*\left\langle {{\Psi }_{1}} | \Phi \right\rangle +{{\lambda }_{2}}*\left\langle {{\Psi }_{2}} | \Phi \right\rangle \\<br />
& \Rightarrow \left\langle \Psi \right|={{\lambda }_{1}}*\left\langle {{\Psi }_{1}} \right|+{{\lambda }_{2}}*\left\langle {{\Psi }_{2}} \right| \\<br />
\end{align}</math><br />
Aber: <math>H</math>ist der zu <math>H*</math>duale Vektorraum, <math>H*</math>ist isomorph zu <math>H</math><br />
<br />
5) <math>H</math>heißt separabel, falls er eine überall dichte, abzählbare Teilmenge <math>D</math>besitzt<br />
Das heißt: <math>\forall \left| \Psi \right\rangle \in H\quad \exists {{\left\{ {{\Psi }_{n}} \right\}}_{n}}\subset D</math><br />
Dies ist äquivalent dazu, dass ein Hilbertraum H separabel heißt, wenn er eine abzählbare Hilbert- Basis besitzt, es also ein abzählbares, vollständig orthonormiertes System in H gibt. Eine Isometrie <math>\Phi </math>zwischen Hilberträumen H und K ist eine stetige, bijektive, lineare Abbildung <math>\Phi :H\to K</math>so dass <math>{{\left\| \Phi (x) \right\|}_{K}}={{\left\| x \right\|}_{H}}</math>für alle <math>x\in H</math>.<br />
Anwendung auf die Ortsdarstellung<br />
<math>\begin{align}<br />
& \Psi (\bar{r})=\left\langle {\bar{r}} | \Psi \right\rangle =\frac{1}{{{\left( 2\pi \hbar \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\tilde{\Psi }(\bar{p}){{e}^{\frac{i}{\hbar }\bar{p}\bar{r}}}}=\frac{1}{{{\left( 2\pi \hbar \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p{{e}^{\frac{i}{\hbar }\bar{p}\bar{r}}}}\left\langle {\bar{p}} | \Psi \right\rangle \\<br />
& \tilde{\Psi }(\bar{p})=\left\langle {\bar{p}} | \Psi \right\rangle =\frac{1}{{{\left( 2\pi \hbar \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\Psi (\bar{r}){{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}}=\frac{1}{{{\left( 2\pi \hbar \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r{{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}}\left\langle {\bar{r}} | \Psi \right\rangle \\<br />
\end{align}</math><br />
ist in der Ortsdarstellung eine Eigenfunktion ( Wohlgemerkt, eine Funktion!) zum Impuls, also die Ortsdarstellung des Impulszustandes Impuls- Eigenzustandes<math>\left| {\bar{p}} \right\rangle </math>). Der Zustand, der den Impuls repräsentiert und durch Anwendung des Impulsoperators den Impuls liefert.<br />
Denn:<br />
<math>\frac{\hbar }{i}\nabla {{e}^{\frac{i}{\hbar }\bar{p}\bar{r}}}=\bar{p}{{e}^{\frac{i}{\hbar }\bar{p}\bar{r}}}</math><br />
In Algebraischer Schreibweise bedeutet dies ( inklusive Normierung):<br />
<br />
Impulseigenfunktion in Ortsdarstellung<br />
<math>\left\langle {\bar{p}} | {\bar{r}} \right\rangle \tilde{\ }{{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}</math><br />
Ortseigenfunktion in Impulsdarstellung<br />
( Diese beiden gehen durch komplexe Konjugation ineinander über !)<br />
Damit folgt:<br />
<math>\begin{align}<br />
& \Psi (\bar{r})=\left\langle {\bar{r}} | \Psi \right\rangle =\frac{1}{{{\left( 2\pi \hbar \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p{{e}^{\frac{i}{\hbar }\bar{p}\bar{r}}}}\left\langle {\bar{p}} | \Psi \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left\langle {\bar{r}} | {\bar{p}} \right\rangle }\left\langle {\bar{p}} | \Psi \right\rangle \\<br />
& \tilde{\Psi }(\bar{p})=\left\langle {\bar{p}} | \Psi \right\rangle =\frac{1}{{{\left( 2\pi \hbar \right)}^{\tfrac{3}{2}}}}\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r{{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}}\left\langle {\bar{r}} | \Psi \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle {\bar{r}} | {\bar{p}} \right\rangle *}\left\langle {\bar{r}} | \Psi \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle {\bar{p}} | {\bar{r}} \right\rangle }\left\langle {\bar{r}} | \Psi \right\rangle \\ <br />
<br />
\end{align}</math><br />
Da <math>\bar{r}</math>und <math>\bar{p}</math>vollständige Darstellungen sind, folgt:<br />
<math>\left| \Psi \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left| {\bar{p}} \right\rangle }\left\langle {\bar{p}} | \Psi \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left| {\bar{r}} \right\rangle }\left\langle {\bar{r}} | \Psi \right\rangle </math><br />
analog zur Entwicklung des Vektors <math>\left| {\bar{a}} \right\rangle \in {{R}^{n}}</math>nach Basisvektoren ( in seinen Koordinaten, mit seinen Koordinaten als Entwicklungskoeffizienten).<br />
<math>\bar{a}=\sum\limits_{j}{{}}{{a}_{j}}\left| {{{\bar{e}}}_{j}} \right\rangle =\sum\limits_{j}{\left| {{{\bar{e}}}_{j}} \right\rangle \left\langle {{{\bar{e}}}_{j}} \right|\left| {\bar{a}} \right\rangle =\sum\limits_{j}{{}}{{a}_{j}}\acute{\ }\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle }=\sum\limits_{j}{\left| {{{\bar{e}}}_{j}}\acute{\ } \right\rangle \left\langle {{{\bar{e}}}_{j}}\acute{\ } \right|\left| {\bar{a}} \right\rangle }</math><br />
Somit folgt jedoch:<br />
<math>\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left| {\bar{p}} \right\rangle \left\langle {\bar{p}} \right|}=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left| {\bar{r}} \right\rangle }\left\langle {\bar{r}} \right|=1</math> als Vollständigkeits- Relation. Nebenbemerkung: Der Hilbertraum der Zustände hat unendliche Dimension.<br />
Als Grenzwert definiert man den Dirac- Vektor, als Grenzwert einer diskreten Basis:<br />
<math>\begin{align}<br />
& \left| {\bar{p}} \right\rangle \notin H \\<br />
& \left| {\bar{p}} \right\rangle :=\begin{matrix}<br />
\lim \\<br />
\Delta p\to 0 \\<br />
\end{matrix}\left| \bar{p},\Delta \bar{p} \right\rangle \\<br />
\end{align}</math><br />
Eigenschaften der Funktionen, die H aufspannen:<br />
=====Dual:=====<br />
<math>\left\langle \Psi \right|=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left\langle \Psi | {\bar{p}} \right\rangle }\left\langle {\bar{p}} \right|=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle \Psi | {\bar{r}} \right\rangle }\left\langle {\bar{r}} \right|</math><br />
Man spricht auch vom " Einschieben einer 1 !".<br />
<math>\left\langle \Psi | {\bar{r}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p\left\langle \Psi | {\bar{p}} \right\rangle }\left\langle {\bar{p}} | {\bar{r}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p}\tilde{\Psi }(\bar{p})*{{\left( 2\pi \hbar \right)}^{-\tfrac{3}{2}}}{{e}^{-\frac{i}{\hbar }\bar{p}\bar{r}}}=\left\langle {\bar{r}} | \Psi \right\rangle *=\Psi (\bar{r})*</math><br />
=====Skalarprodukt:=====<br />
<math>\left\langle {{\Psi }_{1}} | {{\Psi }_{2}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle {{\Psi }_{1}} | {\bar{r}} \right\rangle }\left\langle {\bar{r}} | {{\Psi }_{2}} \right\rangle =\int_{{{R}^{3}}}^{{}}{{{d}^{3}}r}{{\Psi }_{1}}(\bar{r})*{{\Psi }_{2}}(\bar{r})=\int_{{{R}^{3}}}^{{}}{{{d}^{3}}p}{{\tilde{\Psi }}_{1}}(\bar{p})*{{\tilde{\Psi }}_{2}}(\bar{p})</math><br />
=====Norm:=====<br />
<math>\left\| \Psi \right\|={{\left[ \int_{{{R}^{3}}}^{{}}{{{d}^{3}}r\left\langle \Psi | {\bar{r}} \right\rangle }\left\langle {\bar{r}} | \Psi \right\rangle \right]}^{\frac{1}{2}}}={{\left[ \int_{{{R}^{3}}}^{{}}{{{d}^{3}}r{{\left| \Psi (\bar{r}) \right|}^{2}}} \right]}^{\frac{1}{2}}}</math><br />
Alle Funktionen im Hilbertraum müssen also insbesondere quadratintegrabel sein.<br />
Somit folgt:<br />
<math>H=L{}^\text{2}({{R}^{3}})=\left\{ \Psi :{{R}^{3}}\to C\left| {} \right.\left[ \int_{{{R}^{3}}}^{{}}{{{d}^{3}}r{{\left| \Psi (\bar{r}) \right|}^{2}}<\infty } \right] \right\}</math><br />
Nebenbemerkung:<br />
Die Linearität des Vektorraumes garantiert das Superpositionsprinzip für Wellenfunktionen!</div>
Schubotz