Master Gleichung: Difference between revisions

Betrachtung eines mikr. Hamiltonoperators ${\displaystyle H={{H}_{S}}+{{H}_{B}}+{{H}_{I}}}$ bestehend aus

• System ${\displaystyle H_{S}}$
• Umgebung ${\displaystyle H_{B}}$
• WW ${\displaystyle H_{I}}$

Die Umgebung setzt sich aus einem Reservoir

• links ${\displaystyle {}^{L}{{H}_{B}}=\sum \limits _{k}{{}^{L}{{\varepsilon }_{k}}{}^{L}{{N}_{k}}}}$
• und rechts ${\displaystyle {}^{R}{{H}_{B}}=\sum \limits _{k}{{}^{R}{{\varepsilon }_{k}}{}^{R}{{N}_{k}}}}$ zuammen mit ${\displaystyle {}^{X}{{N}_{k}}={}^{X}a_{k}^{+}{}^{X}{{a}_{k}}}$

Wechselwirkung besteht aus 4 Teilen ${\displaystyle {{H}_{I}}={}_{S}^{L}{{H}_{I}}+{}_{S}^{R}{{H}_{I}}+{}_{L}^{S}{{H}_{I}}+{}_{R}^{S}{{H}_{I}}}$

• Von Links ins System ${\displaystyle {}_{S}^{L}{{H}_{I}}}$
• Vor Rechts ins System ${\displaystyle {}_{S}^{R}{{H}_{I}}}$
• Vom System nach Links ${\displaystyle {}_{L}^{S}{{H}_{I}}}$
• Vom System nach Rechts ${\displaystyle {}_{R}^{S}{{H}_{I}}}$

mit ${\displaystyle {}_{S}^{X}{{H}_{I}}=\sum \limits _{k,i}{{}^{X}{{V}_{k}}^{X}a_{k}^{\dagger }{{e}_{i}}}}$ und ${\displaystyle {}_{X}^{S}{{H}_{I}}=\sum \limits _{k,i}{{}^{X}{{V}_{k}}^{X}{{a}_{k}}e_{i}^{\dagger }}}$

${\displaystyle {{e}_{i}}}$ erzeugt ein Electron im System mit Energieniveau i. ${\displaystyle e_{i}^{\dagger }}$ vernichtet ...

Transformation ins WW-Bild

Operator ins WWBild

${\displaystyle {\tilde {A}}\left(t\right):=U_{0}^{\dagger }A{{U}_{0}}}$ mit ${\displaystyle {{U}_{0}}=\exp \left(-{\mathfrak {i}}{{H}_{0}}t\right)}$ und ${\displaystyle {{H}_{0}}={{H}_{S}}+{{H}_{B}}}$

Starte von Liouville-von-Neumann-Gleichung ${\displaystyle {\dot {\rho }}=-{\mathfrak {i}}\left[{H,\rho }\right]}$

mit der Lösung

${\displaystyle \rho \left(t\right)={{U}^{\dagger }}{{\rho }_{0}}U}$

mit ${\displaystyle U=\exp \left(-{\mathfrak {i}}Ht\right)}$

Beweis

${\displaystyle {{\partial }_{t}}U=-{\mathfrak {i}}HU}$

sowie

${\displaystyle {{\partial }_{t}}{{U}^{\dagger }}={\mathfrak {i}}HU}$

Dann ist ${\displaystyle {{d}_{t}}\rho =\underbrace {-{\mathfrak {i}}HU{{\rho }_{0}}{{U}^{\dagger }}+U{{\rho }_{0}}{\mathfrak {i}}H{{U}^{\dagger }}} _{-{\mathfrak {i}}\left[H,\rho \right]}+\underbrace {U\left({{\partial }_{t}}{{\rho }_{0}}\right){{U}^{\dagger }}} _{0}}$

beweis ende

lösung ende

Die LVN-Gln wird zu

${\displaystyle {\begin{aligned}&{{d}_{t}}{\tilde {\rho }}={{d}_{t}}\left(U_{0}^{\dagger }\rho {{U}_{0}}\right)\\&={\mathfrak {i}}{{H}_{0}}U_{0}^{\dagger }\rho {{U}_{0}}-iU_{0}^{\dagger }\rho {{H}_{0}}{{U}_{0}}+U_{0}^{\dagger }{{d}_{t}}\left(\rho \right){{U}_{0}}\\&={\mathfrak {i}}\left[{{H}_{0}},{\tilde {\rho }}\right]-{\mathfrak {i}}U_{0}^{\dagger }\left[H,\rho \right]{{U}_{0}}\\&={\mathfrak {i}}\left[{{H}_{0}},{\tilde {\rho }}\right]-{\mathfrak {i}}U_{0}^{\dagger }\left[{{H}_{0}}+{{H}_{I}},\rho \right]{{U}_{0}}\\&={\mathfrak {i}}\left[{{H}_{0}},{\tilde {\rho }}\right]-{\mathfrak {i}}\left[{{H}_{0}},{\tilde {\rho }}\right]-{\mathfrak {i}}U_{0}^{\dagger }\left[{{H}_{I}},\rho \right]{{U}_{0}}\\&=-{\mathfrak {i}}\left[{{\tilde {H}}_{I}},{\tilde {\rho }}\right]\\\end{aligned}}}$