Equation of motion approach to the Hubbard model in infinite dimensions
Abstract
We consider the Hubbard model on the infinite-dimensional Bethe lattice and construct a systematic series of self-consistent approximations to the one-particle Green's function, G(n)(ω),\ n=2,3,…\ . The first n-1 equations of motion are exactly fullfilled by G(n)(ω) and the n'th equation of motion is decoupled following a simple set of decoupling rules. G(2)(ω) corresponds to the Hubbard-III approximation. We present analytic and numerical results for the Mott-Hubbard transition at half filling for n=2,3,4.
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