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Display information for equation id:math.1777.28 on revision:1777
* Page found: Lippmann- Schwinger- Gleichung (eq math.1777.28)
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TeX (original user input):
\begin{align}
& \Rightarrow \left\langle {\bar{q}} \right|\frac{1}{E-{{{\hat{H}}}_{0}}+i\varepsilon }\left| \bar{q}\acute{\ } \right\rangle =\frac{2m}{{{\hbar }^{2}}}\frac{\delta \left( \bar{q}-\bar{q}\acute{\ } \right)}{{{{\bar{k}}}^{2}}-{{{\bar{q}}}^{2}}+i\eta }=:\frac{2m}{{{\hbar }^{2}}}{{{\tilde{G}}}_{+}}(\bar{q})\delta \left( \bar{q}-\bar{q}\acute{\ } \right) \\
& \eta =\frac{2m}{{{\hbar }^{2}}}\varepsilon \\
& \left\langle {\bar{r}} | {\bar{q}} \right\rangle =\frac{1}{{{\left( 2\pi \right)}^{\frac{3}{2}}}}{{e}^{i\bar{q}\bar{r}}} \\
\end{align}
TeX (checked):
{\begin{aligned}&\Rightarrow \left\langle {\bar {q}}\right|{\frac {1}{E-{{\hat {H}}_{0}}+i\varepsilon }}\left|{\bar {q}}{\acute {\ }}\right\rangle ={\frac {2m}{{\hbar }^{2}}}{\frac {\delta \left({\bar {q}}-{\bar {q}}{\acute {\ }}\right)}{{{\bar {k}}^{2}}-{{\bar {q}}^{2}}+i\eta }}=:{\frac {2m}{{\hbar }^{2}}}{{\tilde {G}}_{+}}({\bar {q}})\delta \left({\bar {q}}-{\bar {q}}{\acute {\ }}\right)\\&\eta ={\frac {2m}{{\hbar }^{2}}}\varepsilon \\&\left\langle {\bar {r}}|{\bar {q}}\right\rangle ={\frac {1}{{\left(2\pi \right)}^{\frac {3}{2}}}}{{e}^{i{\bar {q}}{\bar {r}}}}\\\end{aligned}}
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