Key equations from quantum statistical tools: Difference between revisions

Latest revision as of 15:32, 27 September 2012

Equilibrium

Expectation values

$A=\mathrm {Tr} [{\hat {\rho }}_{\mathrm {eq} }{\hat {A}}]$

Density matrix of fermions in equilibrium

using spectral decomposition:

${\hat {\rho }}_{\mathrm {eq} }=\sum _{\alpha }f(E_{\alpha })|E_{\alpha }\rangle \langle E_{\alpha }|=f({\hat {H}}-\mu {\hat {I}})$

using Green functions:

${\hat {\rho }}_{\mathrm {eq} }=-{\frac {1}{\pi }}\int dE\,\mathrm {Im} G^{r}f(E)$

Fermi-Dirac distribution function: $f(E)=1/[\exp((E-\mu )/k_{B}T)+1]$

Hamiltonian and its spectral decomposition: ${\hat {H}}=\sum _{\alpha }E_{\alpha }|E_{\alpha }\rangle \langle E_{\alpha }|$

function of Hamiltonian: $F({\hat {H}})=\sum _{\alpha }F(E_{\alpha })|E_{\alpha }\rangle \langle E_{\alpha }|$

Green operators:

${\hat {G}}^{r,a}(E)=[E{\hat {I}}-{\hat {H}}\pm i\eta ]^{-1}$

$\mathrm {Im} {\hat {G}}^{r}=({\hat {G}}^{r}-{\hat {G}}^{a})/2i$

Charge density

charge density operator: ${\hat {n}}(\mathbf {r} )=|\mathbf {r} \rangle \langle \mathbf {r} |$

expectation value: $n(\mathbf {r} )=\mathrm {Tr} [{\hat {\rho }}_{\mathrm {eq} }|\mathbf {r} \rangle \langle \mathbf {r} |]=\langle \mathbf {r} |{\hat {\rho }}_{\mathrm {eq} }|\mathbf {r} \rangle$ (in some discrete representation these is just diagonal matrix element)

Density of states

definition of total DOS: $g(E)=\sum _{\alpha }\delta (E-E_{\alpha })$ (with possible normalization factors like $2_{s}/V$ )

definition of LDOS: $g(E)=\int d^{3}\mathbf {r} g(\mathbf {r} ,E)$

LDOS using wavefunctions: $n(\mathbf {r} )=\mathrm {Tr} [{\hat {\rho }}_{\mathrm {eq} }|\mathbf {r} \rangle \langle \mathbf {r} |]=\sum _{\alpha }|\Psi _{\alpha }(\mathbf {r} )|^{2}f(E_{\alpha })=\int dE\left[\sum _{\alpha }|\Psi _{\alpha }(\mathbf {r} )|^{2}\delta (E-E_{\alpha })\right]f(E)=\int dE\,g(\mathbf {r} ,E)f(E)$

LDOS using Green functions:

$g(\mathbf {r} ,E)=-{\frac {1}{\pi }}\langle \mathbf {r} |\mathrm {Im} {\hat {G}}^{r}(E)|\mathbf {r} \rangle$

total DOS using Green functions:

$g(E)=-{\frac {1}{\pi }}\mathrm {Tr} [{\hat {G}}^{r}(E)]=-{\frac {1}{\pi }}\int d^{3}\mathbf {r} \,\langle \mathbf {r} |\mathrm {Im} {\hat {G}}^{r}(E)|\mathbf {r} \rangle$

Nonequilibrium

Expectation values

$A=\mathrm {Tr} [{\hat {\rho }}_{\mathrm {neq} }{\hat {A}}]$

Current operators:

@@ Line 21: / Line 21: @@
 * function of Hamiltonian: <math> F(\hat{H}) =  \sum_\alpha F(E_\alpha) |E_\alpha \rangle \langle E_\alpha| </math>
-* Green operators: <math> \hat{G}^{r,a} = [E\hat{I}-\hat{H} \pm i\eta]^{-1} </math>
+* Green operators:
+<math> \hat{G}^{r,a}(E) = [E\hat{I}-\hat{H} \pm i\eta]^{-1} </math>
+<math> \mathrm{Im} \hat{G}^r = (\hat{G}^{r} - \hat{G}^a)/2i </math>
 ===Charge density===
@@ Line 39: / Line 43: @@
 * LDOS using Green functions:
-<math> g(\mathbf{r},E) = -\frac{1}{\pi} \langle \mathbf{r} |\mathrm{Im} \hat{G}^r | \mathbf{r} \rangle </math>
+<math> g(\mathbf{r},E) = -\frac{1}{\pi} \langle \mathbf{r} |\mathrm{Im} \hat{G}^r(E) | \mathbf{r} \rangle </math>
+* total DOS using Green functions:
+<math> g(E) = -\frac{1}{\pi} \mathrm{Tr}[ \hat{G}^r(E)] = -\frac{1}{\pi} \int d^3 \mathbf{r} \, \langle \mathbf{r} |\mathrm{Im} \hat{G}^r(E) | \mathbf{r} \rangle  </math>
 ==Nonequilibrium==
-*Expectation values:
+===Expectation values===
+<math> A = \mathrm{Tr}[\hat{\rho}_\mathrm{neq} \hat{A}] </math>
-*Current operator:
+*Current operators:

Key equations from quantum statistical tools: Difference between revisions

Latest revision as of 15:32, 27 September 2012

Contents

Equilibrium

Expectation values

Density matrix of fermions in equilibrium

Charge density

Density of states

Nonequilibrium

Expectation values

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