User:Condmatstrel/Roth Approximation

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Roth approximation^[1] is an approximate solution method for many-body problems in condensed-matter systems. It is based on the equation-of-motion method (or Liouvillian superoperator method^[2]) and Green's function formalism. It is originally developed by Laura M. Roth for the Hubbard model. This method is applicable to systems with any electron filling, and any strength of disorder and interaction.

Very basics[edit]

We shall explain the basic idea of the Roth approximation in words first, and this will be followed by the rigorous derivation. Roth approximation includes two steps. First, one truncates the exponentially growing fermionic operator basis due to that the time evolution of the single fermionic creation/annihilation operators in the retarded Green's function lead to many fermionic operators in the presence of interactions. Second, one uses Roth's idea to approximately calculate some unknown correlations due to the truncation of the basis. Note that truncation of the basis is the same thing as the decoupling of the hierarchy of the Green's functions which occur when electrons interact.

Generalized Green's function[edit]

The rigorous derivation of the Roth approximation is as follows. Define the retarded Green's function (set $\hbar =1$ ):

G_{ij}=-i\langle \{{\hat {c}}_{i}(t_{1}),{\hat {c}}_{j}^{\dagger }(t_{2})\}\rangle \theta (t_{1}-t_{2})

.

Also define the Liouvillian superoperator via its acting on an operator

{\hat {L}}{\hat {O}}\equiv [{\hat {H}},{\hat {O}}]

which is nothing but the time evolution of the operator ${\hat {O}}$ . Rewrite the retarded Green's function using the Liouvillian superoperator:

G_{ij}=-i\langle \{{\hat {c}}_{i}(0),{\hat {c}}_{j}^{\dagger }(0)e^{-i{\hat {L}}t}\}\rangle \theta (t)

,

and Fourier transfrom to the energy space:

G_{ij}(\omega )=\langle \{c_{i}(0),{\frac {1}{\omega -{\hat {L}}}}c_{j}^{\dagger }(0)\}\rangle

where $1/(\omega -{\hat {L}})$ above should be understood as the inverse operator of $(\omega -{\hat {L}})$ . Generalize this Green's function via including many-fermionic operators in the basis: define ${\hat {A}}$ be an (zero time) operator in the generalized basis including many-fermionic operators, and explicitly write down the generalized Green's function:

g_{ij}(\omega )=\langle \{{\hat {A}}_{i},{\frac {1}{\omega -{\hat {L}}}}{\hat {A}}_{j}^{\dagger }\}\rangle

.

It is convenient to express the generalized Green's function in the matrix form. For this purpose define: the normalization matrix $\mathbf {\chi } _{ij}=\langle \{{\hat {A}},{\hat {A}}_{j}^{\dagger }\}\rangle$ , and the energy matrix $\mathbf {E} _{ij}=\langle \{A_{i},{\hat {L}}{\hat {A}}_{j}\}\rangle$ . Then the matrix form of the generalized Green's function reads:

\mathbf {g} =\chi [\omega \mathbf {I} -\chi ^{-1}\mathbf {E} ]^{-1}

where $\mathbf {I}$ is the identity matrix, and $^{-1}$ is the matrix inverse.

Truncation of the basis[edit]

Include only the operators ${\hat {c}}_{i}^{\dagger }$ and ${\hat {b}}_{i}^{\dagger }\equiv {\hat {c}}_{i}^{\dagger }({\hat {n}}_{i}-n_{i})$ where $n_{i}\equiv \langle {\hat {n}}_{i}\rangle$ . The idea is that the operators that is believed to be most relevant to the physics of the system that is studied is included in the basis. For example, one expects a gap in the excitation spectrum when the electron-electron repulsion is large. So, the operator which gives a gap in the excitation spectrum is included in the basis. Additionally, the clue of what operator to include comes from ${\hat {L}}{\hat {c}}^{\dagger }$ .

For this basis, $\mathbf {E}$ matrix takes the following form for an ordered system for example:

Fixing the self consistency cycle[edit]

The solution method of that is used is a numerical procedure called "the self consistency cycle" or "iteration".

Notation[edit]

$i$ : complex constant
${\hat {c}}_{i}(t_{1})$ : a second quantized fermionic operator annihilating a given electron from site $i$ at time $t_{1}$
${\hat {c}}_{j}^{\dagger }(t_{2})$ : a second quantized operator creating an electron at site $j$ at time $t_{2}$
$\{,\}$ : anticommutation
$\theta$ : the step or Heaviside function.

References[edit]

^ Electron Correlation in Narrow Energy Bands. I. The Two-Pole Approximation in a Narrow S Band, Laura M. Roth, Phys. Rev. 184, 451–459 (1969).
^ See the book by Peter Fulde: Electron Correlations in Solids and Molecules

External links[edit]

example.com

[1] Electron Correlation in Narrow Energy Bands. I. The Two-Pole Approximation in a Narrow S Band, Laura M. Roth, Phys. Rev. 184, 451–459 (1969).

[2] See the book by Peter Fulde: Electron Correlations in Solids and Molecules

[1]

[2]