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Das Wasserstoffatom (relativistsich) - Revision history
2026-04-05T06:11:16Z
Revision history for this page on the wiki
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*>SchuBot: Interpunktion, replaced: ! → ! (5)
2010-09-12T22:35:37Z
<p>Interpunktion, replaced: ! → ! (5)</p>
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<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">← Older revision</td>
<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">Revision as of 00:35, 13 September 2010</td>
</tr><tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l42">Line 42:</td>
<td colspan="2" class="diff-lineno">Line 42:</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>\left[ \hbar Q,H \right]=0</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[ \hbar Q,H \right]=0</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> </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;">.</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;">. </del>Somit existieren gemeinsame Eigenzustände zu <math>H</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><ins style="font-weight: bold; text-decoration: none;"> </ins>Somit existieren gemeinsame Eigenzustände zu <math>H</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"></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>und <math>\hbar Q</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>und <math>\hbar Q</math></div></td></tr>
<tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l350">Line 350:</td>
<td colspan="2" class="diff-lineno">Line 350:</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>Weil <math>{{e}^{+\rho }}</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>Weil <math>{{e}^{+\rho }}</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>divergiert !</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>divergiert!</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>\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-l377">Line 377:</td>
<td colspan="2" class="diff-lineno">Line 377:</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>Es existieren nichttriviale Lösungen <math>{{f}_{0}},{{g}_{0}}</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>Es existieren nichttriviale Lösungen <math>{{f}_{0}},{{g}_{0}}</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> </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;">,</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;">, </del>falls <math>\left( \lambda +q \right)\left( \lambda -q \right)+{{\gamma }^{2}}={{\lambda }^{2}}-{{q}^{2}}+{{\gamma }^{2}}=0</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><ins style="font-weight: bold; text-decoration: none;"> </ins>falls <math>\left( \lambda +q \right)\left( \lambda -q \right)+{{\gamma }^{2}}={{\lambda }^{2}}-{{q}^{2}}+{{\gamma }^{2}}=0</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"></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 <math>\lambda =\pm \sqrt{{{q}^{2}}-{{\gamma }^{2}}}>0</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>Also <math>\lambda =\pm \sqrt{{{q}^{2}}-{{\gamma }^{2}}}>0</math></div></td></tr>
<tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l434">Line 434:</td>
<td colspan="2" class="diff-lineno">Line 434:</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;"><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>k=0,1,2,.... Rekursionsformel !!</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>k=0,1,2,.... Rekursionsformel!!</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>\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-l480">Line 480:</td>
<td colspan="2" class="diff-lineno">Line 480:</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>exponentiell für <math>\rho \to \infty \Rightarrow F(\rho ),G(\rho )\tilde{\ }{{e}^{\rho }}</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>exponentiell für <math>\rho \to \infty \Rightarrow F(\rho ),G(\rho )\tilde{\ }{{e}^{\rho }}</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 ist jedoch ein Widerspruch zu den gesetzten Randbedingungen !</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 jedoch ein Widerspruch zu den gesetzten Randbedingungen!</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 muss es einen Abbruch bei <math>k=n\acute{\ }\in N</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>Also muss es einen Abbruch bei <math>k=n\acute{\ }\in N</math></div></td></tr>
<tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l563">Line 563:</td>
<td colspan="2" class="diff-lineno">Line 563:</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>entwickelt man die Energieeigenwerte nach der Feinstrukturkonstanten bis <math>O\left( {{\gamma }^{4}} \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>entwickelt man die Energieeigenwerte nach der Feinstrukturkonstanten bis <math>O\left( {{\gamma }^{4}} \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> </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;">,</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;">, </del>so folgt:</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;"> </ins>so 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;"><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>E={{m}_{0}}{{c}^{2}}\left[ 1-\frac{1}{2}{{\left( \frac{\gamma }{\lambda +n\acute{\ }} \right)}^{2}}+\frac{3}{8}{{\left( \frac{\gamma }{\lambda +n\acute{\ }} \right)}^{4}}+O\left( {{\gamma }^{6}} \right) \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>E={{m}_{0}}{{c}^{2}}\left[ 1-\frac{1}{2}{{\left( \frac{\gamma }{\lambda +n\acute{\ }} \right)}^{2}}+\frac{3}{8}{{\left( \frac{\gamma }{\lambda +n\acute{\ }} \right)}^{4}}+O\left( {{\gamma }^{6}} \right) \right]</math></div></td></tr>
<tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l582">Line 582:</td>
<td colspan="2" class="diff-lineno">Line 582:</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;"><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>Setzt man dies in die exakten Energieeigenwerte E ein , so folgt:</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>Setzt man dies in die exakten Energieeigenwerte E ein, so 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 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>& E={{m}_{0}}{{c}^{2}}\left[ 1-\left( \frac{{{\gamma }^{2}}}{2{{n}^{2}}} \right)-\left( \frac{{{\gamma }^{4}}}{2{{n}^{3}}} \right)\left( \frac{1}{j+\frac{1}{2}}-\frac{3}{4n} \right)+O\left( {{\gamma }^{6}} \right) \right] \\</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>& E={{m}_{0}}{{c}^{2}}\left[ 1-\left( \frac{{{\gamma }^{2}}}{2{{n}^{2}}} \right)-\left( \frac{{{\gamma }^{4}}}{2{{n}^{3}}} \right)\left( \frac{1}{j+\frac{1}{2}}-\frac{3}{4n} \right)+O\left( {{\gamma }^{6}} \right) \right] \\</div></td></tr>
<tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l599">Line 599:</td>
<td colspan="2" class="diff-lineno">Line 599:</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 bleibt die Freiheit der Ausrichtung der Achse des magnetischen Moments, also die <math>2(2j+1)</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 bleibt die Freiheit der Ausrichtung der Achse des magnetischen Moments, also die <math>2(2j+1)</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>- fache <math>{{m}_{j}}</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>- fache <math>{{m}_{j}}</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>- Entartung+ Parität !</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>- Entartung+ Parität!</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>====Spektroskopische Beziehung der Feinstrukturterme: <math>n{{l}_{j}}</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>====Spektroskopische Beziehung der Feinstrukturterme: <math>n{{l}_{j}}</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>:<math>n=1:\quad j=\frac{1}{2}:\ 1{{s}_{\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>n=1:\quad j=\frac{1}{2}:\ 1{{s}_{\frac{1}{2}}}</math></div></td></tr>
<tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l608">Line 608:</td>
<td colspan="2" class="diff-lineno">Line 608:</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{array}</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{array}</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> n´=0</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> n´=0<ins style="font-weight: bold; text-decoration: none;">.</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;">.</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>
</table>
*>SchuBot
https://physikerwelt.de:8080/w/index.php?title=Das_Wasserstoffatom_(relativistsich)&diff=1825&oldid=prev
*>SchuBot: Einrückungen Mathematik
2010-09-12T14:36:11Z
<p>Einrückungen Mathematik</p>
<a href="//physikerwelt.de:8080/w/index.php?title=Das_Wasserstoffatom_(relativistsich)&diff=1825&oldid=1824">Show changes</a>
*>SchuBot
https://physikerwelt.de:8080/w/index.php?title=Das_Wasserstoffatom_(relativistsich)&diff=1824&oldid=prev
Schubotz at 14:38, 9 September 2010
2010-09-09T14:38:12Z
<p></p>
<table style="background-color: #fff; color: #202122;" data-mw="interface">
<col class="diff-marker" />
<col class="diff-content" />
<col class="diff-marker" />
<col class="diff-content" />
<tr class="diff-title" lang="en">
<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">← Older revision</td>
<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">Revision as of 16:38, 9 September 2010</td>
</tr><tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l1">Line 1:</td>
<td colspan="2" class="diff-lineno">Line 1:</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>{{Scripthinweis|Quantenmechanik|7|5}}</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|7|5}}<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>In einem rotationssymmetrischen Potenzial haben wir als Dirac- Hamiltonian:</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>In einem rotationssymmetrischen Potenzial haben wir als Dirac- Hamiltonian:</div></td></tr>
</table>
Schubotz
https://physikerwelt.de:8080/w/index.php?title=Das_Wasserstoffatom_(relativistsich)&diff=1823&oldid=prev
Schubotz: /* : */
2010-08-26T14:36:42Z
<p><span class="autocomment">:</span></p>
<table style="background-color: #fff; color: #202122;" data-mw="interface">
<col class="diff-marker" />
<col class="diff-content" />
<col class="diff-marker" />
<col class="diff-content" />
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<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">← Older revision</td>
<td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">Revision as of 16:36, 26 August 2010</td>
</tr><tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l601">Line 601:</td>
<td colspan="2" class="diff-lineno">Line 601:</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>- Entartung+ Parität !</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>- Entartung+ Parität !</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>====Spektroskopische Beziehung der Feinstrukturterme: <math>n{{l}_{j}}</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>====Spektroskopische Beziehung der Feinstrukturterme: <math>n{{l}_{j}}</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><del style="font-weight: bold; text-decoration: none;">====:====</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><math>n=1:\quad j=\frac{1}{2}:\ 1{{s}_{\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>n=1:\quad j=\frac{1}{2}:\ 1{{s}_{\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;"><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>
</table>
Schubotz
https://physikerwelt.de:8080/w/index.php?title=Das_Wasserstoffatom_(relativistsich)&diff=1822&oldid=prev
Schubotz: Die Seite wurde neu angelegt: „{{Scripthinweis|Quantenmechanik|7|5}} In einem rotationssymmetrischen Potenzial haben wir als Dirac- Hamiltonian: <math>\begin{align} & H=\left( c\bar{\alpha }…“
2010-08-24T23:55:56Z
<p>Die Seite wurde neu angelegt: „{{Scripthinweis|Quantenmechanik|7|5}} In einem rotationssymmetrischen Potenzial haben wir als Dirac- Hamiltonian: <math>\begin{align} & H=\left( c\bar{\alpha }…“</p>
<p><b>New page</b></p><div>{{Scripthinweis|Quantenmechanik|7|5}}<br />
<br />
In einem rotationssymmetrischen Potenzial haben wir als Dirac- Hamiltonian:<br />
<br />
<math>\begin{align}<br />
<br />
& H=\left( c\bar{\alpha }\bar{p}+{{m}_{0}}{{c}^{2}}\beta +V(r) \right) \\<br />
<br />
& {{p}_{r}}:=\frac{1}{r}\left( \bar{r}\bar{p}-i\hbar \right) \\<br />
<br />
& {{\alpha }_{r}}:=\frac{1}{r}\bar{\alpha }\bar{r} \\<br />
<br />
& \hbar Q:=\beta \left( \tilde{\bar{\sigma }}\bar{L}+\hbar \right) \\<br />
<br />
\end{align}</math><br />
<br />
Dabei sind <math>{{p}_{r}},{{\alpha }_{r}},\hbar Q</math><br />
<br />
hermitesche Operatoren<br />
<br />
Man kann den Hamilton- Operator schreiben als:<br />
<br />
<math>H=\left( c{{\alpha }_{r}}{{p}_{r}}+\frac{ic}{r}{{\alpha }_{r}}\beta \hbar Q+{{m}_{0}}{{c}^{2}}\beta +V(r) \right)</math><br />
<br />
Beweis:<br />
<br />
<math>\begin{align}<br />
<br />
& {{\alpha }_{r}}{{p}_{r}}+\frac{i}{r}{{\alpha }_{r}}\beta \hbar Q={{\alpha }_{r}}\left[ \frac{1}{r}\left( \bar{r}\bar{p}-i\hbar \right)+\frac{i}{r}{{\beta }^{2}}\left( \tilde{\bar{\sigma }}\bar{L}+\hbar \right) \right] \\<br />
<br />
& {{\beta }^{2}}=1 \\<br />
<br />
& =\frac{{{\alpha }_{r}}}{r}\left( \bar{r}\bar{p}+i\tilde{\bar{\sigma }}\bar{L} \right)=\frac{1}{{{r}^{2}}}\left[ \left( \bar{\alpha }\bar{r} \right)\left( \bar{r}\bar{p} \right)+i\left( \bar{\alpha }\bar{r} \right)\left( \tilde{\bar{\sigma }}\bar{L} \right) \right] \\<br />
<br />
& i\left( \bar{\alpha }\bar{r} \right)\left( \tilde{\bar{\sigma }}\bar{L} \right)=i\left( \bar{\alpha }\bar{r} \right)\left( \bar{r}\bar{p} \right)-i{{r}^{2}}\left( \bar{\alpha }\bar{p} \right) \\<br />
<br />
& \Rightarrow {{\alpha }_{r}}{{p}_{r}}+\frac{i}{r}{{\alpha }_{r}}\beta \hbar Q=\frac{1}{{{r}^{2}}}\left[ \left( \bar{\alpha }\bar{r} \right)\left( \bar{r}\bar{p} \right)+i\left( \bar{\alpha }\bar{r} \right)\left( \tilde{\bar{\sigma }}\bar{L} \right) \right]=\bar{\alpha }\bar{p} \\<br />
<br />
\end{align}</math><br />
<br />
Es gilt weiter:<br />
<br />
<math>\left[ \hbar Q,H \right]=0</math><br />
<br />
. Somit existieren gemeinsame Eigenzustände zu <math>H</math><br />
<br />
und <math>\hbar Q</math><br />
<br />
'''Eigenwerte von '''<math>\hbar Q</math><br />
<br />
:<br />
<br />
<math>\begin{align}<br />
<br />
& {{\left( \hbar Q \right)}^{2}}=\beta \left( \tilde{\bar{\sigma }}\bar{L}+\hbar \right)\beta \left( \tilde{\bar{\sigma }}\bar{L}+\hbar \right)={{\beta }^{2}}{{\left( \tilde{\bar{\sigma }}\bar{L}+\hbar \right)}^{2}} \\<br />
<br />
& \left[ \beta ,\tilde{\bar{\sigma }} \right]=0=\left( \begin{matrix}<br />
<br />
\left[ 1,\tilde{\bar{\sigma }} \right] & {} \\<br />
<br />
{} & -\left[ 1,\tilde{\bar{\sigma }} \right] \\<br />
<br />
\end{matrix} \right) \\<br />
<br />
& {{\beta }^{2}}=1 \\<br />
<br />
& \Rightarrow {{\left( \hbar Q \right)}^{2}}=\left( \tilde{\bar{\sigma }}\bar{L} \right)\left( \tilde{\bar{\sigma }}\bar{L} \right)+2\hbar \left( \tilde{\bar{\sigma }}\bar{L} \right)+{{\hbar }^{2}} \\<br />
<br />
& \left( \tilde{\bar{\sigma }}\bar{L} \right)\left( \tilde{\bar{\sigma }}\bar{L} \right)={{L}^{2}}+i\tilde{\bar{\sigma }}\left( \bar{L}\times \bar{L} \right) \\<br />
<br />
& \left( \bar{L}\times \bar{L} \right)=i\hbar \bar{L} \\<br />
<br />
& \Rightarrow \left( \tilde{\bar{\sigma }}\bar{L} \right)\left( \tilde{\bar{\sigma }}\bar{L} \right)={{L}^{2}}-\hbar \tilde{\bar{\sigma }}(\bar{L}) \\<br />
<br />
\end{align}</math><br />
<br />
Somit:<br />
<br />
<math>\begin{align}<br />
<br />
& {{\left( \hbar Q \right)}^{2}}={{L}^{2}}+\hbar \tilde{\bar{\sigma }}\bar{L}+{{\hbar }^{2}}={{\left( \bar{L}+\frac{\hbar }{2}\tilde{\bar{\sigma }} \right)}^{2}}+\frac{{{\hbar }^{2}}}{4} \\<br />
<br />
& mit\ {{\left( \bar{L}+\frac{\hbar }{2}\tilde{\bar{\sigma }} \right)}^{2}}={{L}^{2}}+\hbar \tilde{\bar{\sigma }}\bar{L}+\frac{{{\hbar }^{2}}}{4}{{{\tilde{\bar{\sigma }}}}^{2}} \\<br />
<br />
& {{{\tilde{\bar{\sigma }}}}^{2}}=3 \\<br />
<br />
& \left( \bar{L}+\frac{\hbar }{2}\tilde{\bar{\sigma }} \right)=\bar{J} \\<br />
<br />
\end{align}</math><br />
<br />
Schließlich also<br />
<br />
<math>{{\left( \hbar Q \right)}^{2}}={{\bar{J}}^{2}}+\frac{{{\hbar }^{2}}}{4}</math><br />
<br />
Die Eigenwerte von <math>{{\bar{J}}^{2}}</math><br />
<br />
sind jedoch bekannt, nämlich <math>\hbar j\left( j+1 \right)</math><br />
<br />
mit <math>j=l\pm s=\frac{1}{2},\frac{3}{2},...</math><br />
<br />
<math>\begin{align}<br />
<br />
& {{\left( \hbar Q \right)}^{2}}\left| j \right\rangle =\left( {{\hbar }^{2}}j(j+1)+\frac{{{\hbar }^{2}}}{4} \right)\left| j \right\rangle ={{\hbar }^{2}}{{(j+\frac{1}{2})}^{2}}\left| j \right\rangle \\<br />
<br />
& {{(j+\frac{1}{2})}^{2}}:={{q}^{2}} \\<br />
<br />
\end{align}</math><br />
<br />
Somit:<br />
<br />
<math>\begin{align}<br />
<br />
& \left( \hbar Q \right)\left| j \right\rangle =\left( \hbar q \right)\left| j \right\rangle \\<br />
<br />
& q=\pm 1,\pm 2,... \\<br />
<br />
\end{align}</math><br />
<br />
Es bleibt das radiale Eigenwertproblem für<br />
<br />
<math>H=\left( c{{\alpha }_{r}}{{p}_{r}}+\frac{ic}{r}{{\alpha }_{r}}\beta \hbar Q+{{m}_{0}}{{c}^{2}}\beta +V(r) \right)</math><br />
<br />
'''Geeignete Darstellung für '''<math>{{\alpha }_{r}}</math><br />
<br />
:<br />
<br />
<math>\begin{align}<br />
<br />
& {{\left( {{\alpha }_{r}} \right)}^{2}}=\frac{1}{{{r}^{2}}}\left( \bar{\alpha }\bar{r} \right)\left( \bar{\alpha }\bar{r} \right)=\frac{1}{{{r}^{2}}}{{\alpha }^{\mu }}{{\alpha }^{\nu }}{{x}^{\mu }}{{x}^{\nu }}=\frac{1}{2{{r}^{2}}}\left( {{\alpha }^{\mu }}{{\alpha }^{\nu }}+{{\alpha }^{\nu }}{{\alpha }^{\mu }} \right){{x}^{\mu }}{{x}^{\nu }} \\<br />
<br />
& \left( {{\alpha }^{\mu }}{{\alpha }^{\nu }}+{{\alpha }^{\nu }}{{\alpha }^{\mu }} \right)=2{{\delta }^{\mu \nu }} \\<br />
<br />
& \frac{1}{2{{r}^{2}}}2{{x}^{\mu }}{{x}^{\mu }}=\frac{{{r}^{2}}}{{{r}^{2}}}=1 \\<br />
<br />
& {{\alpha }_{r}}\beta +\beta {{\alpha }_{r}}=\frac{1}{r}\left( \bar{\alpha }\beta +\beta \bar{\alpha } \right)\bar{r} \\<br />
<br />
& \left( \bar{\alpha }\beta +\beta \bar{\alpha } \right)=0\Rightarrow \frac{1}{r}\left( \bar{\alpha }\beta +\beta \bar{\alpha } \right)\bar{r}=0 \\<br />
<br />
\end{align}</math><br />
<br />
Für<br />
<br />
<math>\beta =\left( \begin{matrix}<br />
<br />
1 & 0 \\<br />
<br />
0 & -1 \\<br />
<br />
\end{matrix} \right)</math><br />
<br />
kann dies durch die Darstellung <math>{{\alpha }_{r}}=\left( \begin{matrix}<br />
<br />
0 & -i \\<br />
<br />
i & 0 \\<br />
<br />
\end{matrix} \right)</math><br />
<br />
mit <math>{{\alpha }_{r}}={{\alpha }_{r}}^{+}</math><br />
<br />
erfüllt werden:<br />
<br />
<math>\begin{align}<br />
<br />
& {{\alpha }_{r}}\beta =\left( \begin{matrix}<br />
<br />
0 & i \\<br />
<br />
i & 0 \\<br />
<br />
\end{matrix} \right) \\<br />
<br />
& \beta {{\alpha }_{r}}=\left( \begin{matrix}<br />
<br />
0 & -i \\<br />
<br />
-i & 0 \\<br />
<br />
\end{matrix} \right) \\<br />
<br />
\end{align}</math><br />
<br />
Es gilt:<br />
<br />
<math>\begin{align}<br />
<br />
& {{p}_{r}}=\frac{1}{r}\left( \bar{r}\bar{p}-i\hbar \right) \\<br />
<br />
& \bar{r}\bar{p}=\frac{\hbar }{i}r\frac{\partial }{\partial r} \\<br />
<br />
& {{p}_{r}}=\frac{1}{r}\left( \frac{\hbar }{i}r\frac{\partial }{\partial r}-i\hbar \right)=-i\hbar \left( \frac{\partial }{\partial r}+\frac{1}{r} \right) \\<br />
<br />
\end{align}</math><br />
<br />
Also<br />
<br />
<math>H=\hbar c\left( \begin{matrix}<br />
<br />
0 & -1 \\<br />
<br />
1 & 0 \\<br />
<br />
\end{matrix} \right)\left( \frac{\partial }{\partial r}+\frac{1}{r} \right)-\frac{c\hbar q}{r}\left( \begin{matrix}<br />
<br />
0 & 1 \\<br />
<br />
1 & 0 \\<br />
<br />
\end{matrix} \right)+{{m}_{0}}{{c}^{2}}\left( \begin{matrix}<br />
<br />
1 & 0 \\<br />
<br />
0 & -1 \\<br />
<br />
\end{matrix} \right)+V\left( \begin{matrix}<br />
<br />
1 & 0 \\<br />
<br />
0 & 1 \\<br />
<br />
\end{matrix} \right)</math><br />
<br />
Ansatz für den Radialanteil<br />
<br />
<math>\left( \begin{matrix}<br />
<br />
{{\phi }_{a}} \\<br />
<br />
{{\phi }_{b}} \\<br />
<br />
\end{matrix} \right)\tilde{\ }\frac{1}{r}\left( \begin{matrix}<br />
<br />
F(r) \\<br />
<br />
G(r) \\<br />
<br />
\end{matrix} \right)</math><br />
<br />
Eingesetzt in die Eigenwertgleichung für H:<br />
<br />
<math>\left( \begin{matrix}<br />
<br />
{{\phi }_{a}} \\<br />
<br />
{{\phi }_{b}} \\<br />
<br />
\end{matrix} \right)\tilde{\ }\frac{1}{r}\left( \begin{matrix}<br />
<br />
F(r) \\<br />
<br />
G(r) \\<br />
<br />
\end{matrix} \right)</math><br />
<br />
folgt:<br />
<br />
<math>\begin{align}<br />
<br />
& -\frac{\hbar c}{r}\frac{dG}{dr}-\frac{c\hbar q}{{{r}^{2}}}G+\frac{{{m}_{0}}{{c}^{2}}}{r}F+\frac{V}{r}F=E\frac{F}{r} \\<br />
<br />
& \frac{\hbar c}{r}\frac{dF}{dr}-\frac{c\hbar q}{{{r}^{2}}}F-\frac{{{m}_{0}}{{c}^{2}}}{r}G+\frac{V}{r}G=E\frac{G}{r} \\<br />
<br />
& V=-\frac{{{e}^{2}}}{4\pi {{\varepsilon }_{0}}}\frac{1}{r} \\<br />
<br />
\end{align}</math><br />
<br />
Also:<br />
<br />
<math>\begin{align}<br />
<br />
& \left( E-{{m}_{0}}{{c}^{2}}-V \right)F+\hbar c\frac{dG}{dr}+\frac{c\hbar q}{r}G=0 \\<br />
<br />
& \left( E+{{m}_{0}}{{c}^{2}}-V \right)G-\hbar c\frac{dF}{dr}+\frac{c\hbar q}{r}F=0 \\<br />
<br />
& V=-\frac{{{e}^{2}}}{4\pi {{\varepsilon }_{0}}}\frac{1}{r} \\<br />
<br />
\end{align}</math><br />
<br />
====Skalentransformation:====<br />
<math>\begin{align}<br />
<br />
& {{a}_{1}}=\frac{{{m}_{0}}{{c}^{2}}+E}{\hbar c} \\<br />
<br />
& {{a}_{2}}=\frac{{{m}_{0}}{{c}^{2}}-E}{\hbar c} \\<br />
<br />
& a=\sqrt{{{a}_{1}}{{a}_{2}}}=\frac{\sqrt{{{m}_{0}}^{2}{{c}^{4}}-{{E}^{2}}}}{\hbar c} \\<br />
<br />
\end{align}</math><br />
<br />
Führt man des weiteren ein:<br />
<br />
<math>\begin{align}<br />
<br />
& \rho :=ar \\<br />
<br />
& \gamma :=\frac{{{e}^{2}}}{4\pi {{\varepsilon }_{0}}\hbar c}\approx \frac{1}{137} \\<br />
<br />
\end{align}</math><br />
<br />
Also einen skalierten Radius und die Feinstrukturkonstante,<br />
<br />
wodurch sich auch das Potenzial vereinfacht zu:<br />
<br />
<math>\frac{V}{\hbar ca}=-\frac{\gamma }{\rho }</math><br />
<br />
:<br />
<br />
<math>\begin{align}<br />
<br />
& \left( \frac{d}{d\rho }+\frac{q}{\rho } \right)G-\left( \frac{{{a}_{2}}}{a}-\frac{\gamma }{\rho } \right)F=0 \\<br />
<br />
& \left( \frac{d}{d\rho }-\frac{q}{\rho } \right)F-\left( \frac{{{a}_{1}}}{a}+\frac{\gamma }{\rho } \right)G=0 \\<br />
<br />
\end{align}</math><br />
<br />
<u>'''Randbedingung:'''</u><br />
<br />
<math>F(\rho ),G(\rho )</math><br />
<br />
regulär bei <math>\rho \to 0</math><br />
<br />
<math>F(\rho ),G(\rho )\to 0</math><br />
<br />
für <math>\rho \to \infty </math><br />
<br />
<u>'''Betrachte '''</u><math>\begin{align}<br />
<br />
& \left| E \right|<{{m}_{0}}{{c}^{2}}\Rightarrow {{a}_{1}},{{a}_{2}}>0 \\<br />
<br />
& a\in R \\<br />
<br />
\end{align}</math><br />
<br />
also gebundene Zustände<br />
<br />
'''Asymptotisches Verhalten:'''<br />
<br />
<math>\begin{align}<br />
<br />
& \rho \to \infty \\<br />
<br />
& \Rightarrow G\acute{\ }=\frac{{{a}_{2}}}{a}F\quad F\acute{\ }=\frac{{{a}_{1}}}{a}G \\<br />
<br />
& \Rightarrow G\acute{\ }\acute{\ }=G,\quad F\acute{\ }\acute{\ }=F \\<br />
<br />
& \Rightarrow G={{e}^{-\rho }}=F=G={{e}^{-\rho }} \\<br />
<br />
\end{align}</math><br />
<br />
Weil <math>{{e}^{+\rho }}</math><br />
<br />
divergiert !<br />
<br />
<math>\begin{align}<br />
<br />
& \rho \to 0 \\<br />
<br />
& \Rightarrow G\acute{\ }+\frac{q}{\rho }G+\frac{\gamma }{\rho }F=0 \\<br />
<br />
& F\acute{\ }-\frac{q}{\rho }F-\frac{\gamma }{\rho }G=0 \\<br />
<br />
\end{align}</math><br />
<br />
Ansatz:<br />
<br />
<math>\begin{align}<br />
<br />
& F(\rho )={{f}_{0}}{{\rho }^{\lambda }} \\<br />
<br />
& G(\rho )={{g}_{0}}{{\rho }^{\lambda }} \\<br />
<br />
& \Rightarrow \left( \lambda +q \right){{g}_{0}}+\gamma {{f}_{0}}=0 \\<br />
<br />
& \left( \lambda -q \right){{f}_{0}}-\gamma {{g}_{0}}=0 \\<br />
<br />
\end{align}</math><br />
<br />
Es existieren nichttriviale Lösungen <math>{{f}_{0}},{{g}_{0}}</math><br />
<br />
, falls <math>\left( \lambda +q \right)\left( \lambda -q \right)+{{\gamma }^{2}}={{\lambda }^{2}}-{{q}^{2}}+{{\gamma }^{2}}=0</math><br />
<br />
Also <math>\lambda =\pm \sqrt{{{q}^{2}}-{{\gamma }^{2}}}>0</math><br />
<br />
und regulär bei <math>\rho \to 0</math><br />
<br />
Ansatz:<br />
<br />
<math>\begin{align}<br />
<br />
& F(\rho )={{\rho }^{\lambda }}{{e}^{-\rho }}f\left( \rho \right) \\<br />
<br />
& G(\rho )={{\rho }^{\lambda }}{{e}^{-\rho }}g\left( \rho \right) \\<br />
<br />
& \Rightarrow g\acute{\ }-g+\frac{\lambda +q}{\rho }g-\left( \frac{{{a}_{2}}}{a}-\frac{\gamma }{\rho } \right)f=0 \\<br />
<br />
& f\acute{\ }-f+\frac{\lambda -q}{\rho }f-\left( \frac{{{a}_{1}}}{a}+\frac{\gamma }{\rho } \right)g=0 \\<br />
<br />
\end{align}</math><br />
<br />
Die Lösung erfolgt über einen Potenzreihenansatz:<br />
<br />
<math>\begin{align}<br />
<br />
& f(\rho )=\sum\limits_{k=0}^{\infty }{{{f}_{k}}{{\rho }^{k}}}\Rightarrow f\acute{\ }(\rho )=\sum\limits_{k=1}^{\infty }{k{{f}_{k}}{{\rho }^{k-1}}}=\sum\limits_{k=0}^{\infty }{(k+1){{f}_{k+1}}{{\rho }^{k}}} \\<br />
<br />
& g(\rho )=\sum\limits_{k=0}^{\infty }{{{g}_{k}}{{\rho }^{k}}}\Rightarrow g\acute{\ }(\rho )=\sum\limits_{k=1}^{\infty }{k{{g}_{k}}{{\rho }^{k-1}}} \\<br />
<br />
& \frac{f(\rho )}{\rho }=\sum\limits_{k=0}^{\infty }{{{f}_{k}}{{\rho }^{k-1}}=}\frac{{{f}_{0}}}{\rho }+\sum\limits_{k=0}^{\infty }{{{f}_{k+1}}{{\rho }^{k}}} \\<br />
<br />
\end{align}</math><br />
<br />
usw... wird dies ebenfalls für <math>g\acute{\ }(\rho ),\frac{g(\rho )}{\rho }</math><br />
<br />
aufgestellt<br />
<br />
Koeffizientenvergleich liefert:<br />
<br />
<math>\begin{align}<br />
<br />
& O\left( \frac{1}{\rho } \right):\left( \lambda +q \right){{g}_{0}}+\gamma {{f}_{0}}=0\quad \quad \left( \lambda -q \right){{f}_{0}}-\gamma {{g}_{0}}=0 \\<br />
<br />
& \Rightarrow {{f}_{0}},{{g}_{0}} \\<br />
<br />
\end{align}</math><br />
<br />
bis auf Normfaktor<br />
<br />
<math>\begin{align}<br />
<br />
& O\left( {{\rho }^{k}} \right):\left( \lambda +q+k+1 \right){{g}_{k+1}}-{{g}_{k}}+\gamma {{f}_{k+1}}-\frac{{{a}_{2}}}{a}{{f}_{k}}=0 \\<br />
<br />
& \left( \lambda -q+k+1 \right){{f}_{k+1}}-{{f}_{k}}+\gamma {{g}_{k+1}}-\frac{{{a}_{1}}}{a}{{g}_{k}}=0 \\<br />
<br />
\end{align}</math><br />
<br />
k=0,1,2,.... Rekursionsformel !!<br />
<br />
<math>\begin{align}<br />
<br />
& a\left[ \left( \lambda +q+k+1 \right){{g}_{k+1}}-{{g}_{k}}+\gamma {{f}_{k+1}}-\frac{{{a}_{2}}}{a}{{f}_{k}} \right]-{{a}_{2}}\left[ \left( \lambda -q+k+1 \right){{f}_{k+1}}-{{f}_{k}}+\gamma {{g}_{k+1}}-\frac{{{a}_{1}}}{a}{{g}_{k}} \right]=0 \\<br />
<br />
& \Rightarrow \left[ a\left( \lambda +q+k+1 \right)+{{a}_{2}}\gamma \right]{{g}_{k+1}}=\left[ {{a}_{2}}\left( \lambda -q+k+1 \right)-a\gamma \right]{{f}_{k+1}} \\<br />
<br />
\end{align}</math><br />
<br />
'''Verhalten für große k:'''<br />
<br />
<math>ak{{g}_{k+1}}\approx {{a}_{2}}k{{f}_{k+1}}\Rightarrow {{f}_{k}}\approx \frac{a}{{{a}_{2}}}{{g}_{k}}</math><br />
<br />
Dies kann man einsetzen in<br />
<br />
<math>\left( \lambda +q+k+1 \right){{g}_{k+1}}-{{g}_{k}}+\gamma {{f}_{k+1}}-\frac{{{a}_{2}}}{a}{{f}_{k}}=0</math><br />
<br />
und es folgt:<br />
<br />
<math>\begin{align}<br />
<br />
& \left( k+1 \right){{g}_{k+1}}\approx 2{{g}_{k}} \\<br />
<br />
& \Rightarrow \frac{{{g}_{k+1}}}{{{g}_{k}}}\approx \frac{2}{k+1}\Rightarrow {{g}_{k+1}}\approx \frac{{{2}^{k+1}}}{\left( k+1 \right)!}{{g}_{0}} \\<br />
<br />
& \Rightarrow g(\rho )\tilde{\ }{{e}^{2\rho }} \\<br />
<br />
& \Rightarrow f(\rho )\tilde{\ }{{e}^{2\rho }} \\<br />
<br />
\end{align}</math><br />
<br />
Falls die Potenzreihen<br />
<br />
<math>f(\rho )=\sum\limits_{k=0}^{\infty }{{{f}_{k}}{{\rho }^{k}}},g(\rho )=\sum\limits_{k=0}^{\infty }{{{g}_{k}}{{\rho }^{k}}}</math><br />
<br />
nicht abbrechen, so divergiert <math>\begin{align}<br />
<br />
& F(\rho )={{\rho }^{\lambda }}{{e}^{-\rho }}f\left( \rho \right) \\<br />
<br />
& G(\rho )={{\rho }^{\lambda }}{{e}^{-\rho }}g\left( \rho \right) \\<br />
<br />
\end{align}</math><br />
<br />
exponentiell für <math>\rho \to \infty \Rightarrow F(\rho ),G(\rho )\tilde{\ }{{e}^{\rho }}</math><br />
<br />
Dies ist jedoch ein Widerspruch zu den gesetzten Randbedingungen !<br />
<br />
Also muss es einen Abbruch bei <math>k=n\acute{\ }\in N</math><br />
<br />
geben:<br />
<br />
<math>{{f}_{n\acute{\ }+1}}={{g}_{n\acute{\ }+1}}=0</math><br />
<br />
Setzt man dies in die Rekursionsformel ein, so folgt:<br />
<br />
<math>\begin{align}<br />
<br />
& -{{g}_{n\acute{\ }}}-\frac{{{a}_{2}}}{a}{{f}_{n\acute{\ }}}=0\Rightarrow {{a}_{2}}{{f}_{n\acute{\ }}}=-a{{g}_{n\acute{\ }}} \\<br />
<br />
& -{{f}_{n\acute{\ }}}-\frac{{{a}_{1}}}{a}{{g}_{n\acute{\ }}}=0\Rightarrow a{{f}_{n\acute{\ }}}=-{{a}_{1}}{{g}_{n\acute{\ }}} \\<br />
<br />
\end{align}</math><br />
<br />
Diese beiden Gleichungen stimmen jedoch für alle f,g überein, da<br />
<br />
<math>\frac{{{a}_{2}}}{a}=\frac{a}{{{a}_{1}}}</math><br />
<br />
Setzt man <math>{{a}_{2}}{{f}_{n\acute{\ }}}=-a{{g}_{n\acute{\ }}}</math><br />
<br />
in <math>\left[ a\left( \lambda +q+k+1 \right)+{{a}_{2}}\gamma \right]{{g}_{k+1}}=\left[ {{a}_{2}}\left( \lambda -q+k+1 \right)-a\gamma \right]{{f}_{k+1}}</math><br />
<br />
ein, so folgt mit <math>k+1=n\acute{\ }</math><br />
<br />
:<br />
<br />
<math>\begin{align}<br />
<br />
& \frac{a\left( \lambda +q+n\acute{\ } \right)+{{a}_{2}}\gamma }{a}=-\frac{\left[ {{a}_{2}}\left( \lambda -q+n\acute{\ } \right)-a\gamma \right]}{{{a}_{2}}} \\<br />
<br />
& \lambda +q+n\acute{\ }+\frac{{{a}_{2}}}{a}\gamma +\lambda -q+n\acute{\ }+\frac{a}{{{a}_{2}}}\gamma =0 \\<br />
<br />
& 2a\left( \lambda +n\acute{\ } \right)=\left( \frac{{{a}^{2}}}{{{a}_{2}}}-{{a}_{2}} \right)\gamma =\frac{2E}{\hbar c}\gamma \\<br />
<br />
& \frac{{{a}^{2}}}{{{a}_{2}}}={{a}_{1}} \\<br />
<br />
& {{a}^{2}}{{\left( \lambda +n\acute{\ } \right)}^{2}}=\frac{{{E}^{2}}}{{{\hbar }^{2}}{{c}^{2}}}{{\gamma }^{2}} \\<br />
<br />
\end{align}</math><br />
<br />
Weiter gilt:<br />
<br />
<math>\begin{align}<br />
<br />
& {{a}^{2}}=\frac{{{m}_{0}}^{2}{{c}^{4}}-{{E}^{2}}}{{{\hbar }^{2}}{{c}^{2}}} \\<br />
<br />
& \Rightarrow \left( {{m}_{0}}^{2}{{c}^{4}}-{{E}^{2}} \right){{\left( \lambda +n\acute{\ } \right)}^{2}}={{E}^{2}}{{\gamma }^{2}} \\<br />
<br />
\end{align}</math><br />
<br />
Löst man dies nach den exakten Energieeigenwerten, die sich damit ergeben, also nach E auf, so erhält man die Feinstrukturformel:<br />
<br />
<math>E=\frac{{{m}_{0}}{{c}^{2}}}{\sqrt{1+{{\left( \frac{\gamma }{\lambda +n\acute{\ }} \right)}^{2}}}}</math><br />
<br />
Mit der Feinstrukturkonstanten<br />
<br />
<math>\gamma \approx \frac{1}{137}</math><br />
<br />
<math>\begin{align}<br />
<br />
& \lambda =\sqrt{q} \\<br />
<br />
& {{a}^{2}}=\frac{{{m}_{0}}^{2}{{c}^{4}}-{{E}^{2}}}{{{\hbar }^{2}}{{c}^{2}}} \\<br />
<br />
& \Rightarrow \left( {{m}_{0}}^{2}{{c}^{4}}-{{E}^{2}} \right){{\left( \lambda +n\acute{\ } \right)}^{2}}={{E}^{2}}{{\gamma }^{2}} \\<br />
<br />
\end{align}</math><br />
<br />
<math>\begin{align}<br />
<br />
& \lambda =\sqrt{{{q}^{2}}-{{\gamma }^{2}}}=\sqrt{{{\left( j+\frac{1}{2} \right)}^{2}}-{{\gamma }^{2}}} \\<br />
<br />
& j=\frac{1}{2},\frac{3}{2},...,n\acute{\ }\in {{N}_{0}} \\<br />
<br />
& j=l\pm s \\<br />
<br />
\end{align}</math><br />
<br />
entwickelt man die Energieeigenwerte nach der Feinstrukturkonstanten bis <math>O\left( {{\gamma }^{4}} \right)</math><br />
<br />
, so folgt:<br />
<br />
<math>E={{m}_{0}}{{c}^{2}}\left[ 1-\frac{1}{2}{{\left( \frac{\gamma }{\lambda +n\acute{\ }} \right)}^{2}}+\frac{3}{8}{{\left( \frac{\gamma }{\lambda +n\acute{\ }} \right)}^{4}}+O\left( {{\gamma }^{6}} \right) \right]</math><br />
<br />
mit<br />
<br />
<math>\lambda \left( \gamma \right)=|q|\sqrt{1-{{\left( \frac{\gamma }{q} \right)}^{2}}}=|q|\left[ 1-\frac{1}{2}{{\left( \frac{\gamma }{q} \right)}^{2}} \right]+O\left( {{\gamma }^{4}} \right)</math><br />
<br />
<math>\begin{align}<br />
<br />
& {{\left( \frac{1}{\lambda +n\acute{\ }} \right)}^{2}}=\frac{1}{{{\left[ n\acute{\ }+|q|-\frac{1}{2}\left( \frac{{{\gamma }^{2}}}{\left| q \right|} \right) \right]}^{2}}}+O\left( {{\gamma }^{4}} \right) \\<br />
& n=n\acute{\ }+\left| q \right| \\<br />
& n\acute{\ }=0,1,2,... \\<br />
& \left| q \right|=j+\frac{1}{2}=1,2,.... \\<br />
& {{\left( \frac{1}{\lambda +n\acute{\ }} \right)}^{2}}=\frac{1}{{{n}^{2}}}{{\left[ 1-\frac{1}{2}\left( \frac{{{\gamma }^{2}}}{\left| q \right|n} \right) \right]}^{-2}}+O\left( {{\gamma }^{4}} \right)=\frac{1}{{{n}^{2}}}\left[ 1+\left( \frac{{{\gamma }^{2}}}{\left| q \right|n} \right) \right]+O\left( {{\gamma }^{4}} \right)=\frac{1}{{{n}^{2}}}+\left( \frac{{{\gamma }^{2}}}{\left| q \right|{{n}^{3}}} \right)+O\left( {{\gamma }^{4}} \right) \\<br />
& \left| q \right|=j+\frac{1}{2}=l\pm s+\frac{1}{2} \\<br />
\end{align}</math><br />
<br />
Setzt man dies in die exakten Energieeigenwerte E ein , so folgt:<br />
<math>\begin{align}<br />
& E={{m}_{0}}{{c}^{2}}\left[ 1-\left( \frac{{{\gamma }^{2}}}{2{{n}^{2}}} \right)-\left( \frac{{{\gamma }^{4}}}{2{{n}^{3}}} \right)\left( \frac{1}{j+\frac{1}{2}}-\frac{3}{4n} \right)+O\left( {{\gamma }^{6}} \right) \right] \\<br />
& n=1,2,3 \\<br />
& j=\frac{1}{2},\frac{3}{2},...,n-\frac{1}{2},wegen\ n=n\acute{\ }+j+\frac{1}{2} \\<br />
& j=l\pm s \\<br />
\end{align}</math><br />
<br />
<u>'''Diskussion'''</u><br />
<math>O\left( {{\gamma }^{0}} \right):E={{m}_{0}}{{c}^{2}}</math><br />
Ruheenergie<br />
<math>O\left( {{\gamma }^{2}} \right):\Delta {{E}^{(2)}}=-{{m}_{0}}{{c}^{2}}\left( \frac{{{\gamma }^{2}}}{2{{n}^{2}}} \right)=-\frac{{{R}_{H}}}{{{n}^{2}}}</math><br />
nicht relativistisches, entartetes Energiespektrum<br />
<math>O\left( {{\gamma }^{4}} \right):\Delta {{E}^{(4)}}=-{{m}_{0}}{{c}^{2}}\left( \frac{{{\gamma }^{4}}}{2{{n}^{3}}} \right)\left( \frac{1}{j+\frac{1}{2}}-\frac{3}{4n} \right)</math><br />
Feinstruktur- Aufspaltung. Eine Aufhebung der j-Entartung durch Spin- Bahn- Kopplung.<br />
Dabei bleibt die Freiheit der Ausrichtung der Achse des magnetischen Moments, also die <math>2(2j+1)</math><br />
- fache <math>{{m}_{j}}</math><br />
- Entartung+ Parität !<br />
====Spektroskopische Beziehung der Feinstrukturterme: <math>n{{l}_{j}}</math>====<br />
====:====<br />
<math>n=1:\quad j=\frac{1}{2}:\ 1{{s}_{\frac{1}{2}}}</math><br />
<br />
<math>\begin{array}{*{35}{l}}<br />
{} & n=2:\quad j=\frac{1}{2}:\ 2{{s}_{\frac{1}{2}}}\quad 2{{p}_{\frac{1}{2}}}\quad \quad \quad \quad \quad \quad \quad n\overset{\acute{\ }}{\mathop{\ }}\,=1 \\<br />
{} & \quad \quad \quad \,j=\frac{3}{2}:\quad \quad \quad 2{{p}_{\frac{3}{2}}}\quad \quad \quad \quad \quad \quad \quad n\overset{\acute{\ }}{\mathop{\ }}\,=0 \\<br />
\end{array}</math><br />
<br />
n´=0<br />
..</div>
Schubotz