Interpolating self-energy of the infinite-dimensional Hubbard model:
  Modifying the iterative perturbation theory

A. B. Harris; A. Georges; A. Georges; A. Georges; A. Georges; A. L. Fetter; A. Martin-Rodero; A. Martin-Rodero; B. Mehlig; D. C. Langreth; D. Vollhardt; D. Vollhardt; E. H. Lieb; E. Müller-Hartmann; G. Bulk; G. Geipel; H. Kajueter; H. Mori; J. Beenen; J. Hubbard; J. Kanamori; J. M. Luttinger; J. Schmalian; K. Yosida; K. Yosida; L. M. Roth; M. C. Gutzwiller; M. Caffarel; M. J. Rozenberg; M. J. Rozenberg; M. J. Rozenberg; M. Jarrell; M. Jarrell; M. Potthoff; M. Potthoff; M. Salomaa; N. Bulut; N. Bulut; P. W. Leung; R. G. Gordon; R. Zwanzig; S. Bei der Kellen; S. Wermbter; T. Herrmann; T. Wegner; V. Zlatic; W. Metzner; W. Nolting; W. Nolting; W. Nolting; X. Y. Zhang

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Interpolating self-energy of the infinite-dimensional Hubbard model: Modifying the iterative perturbation theory

Abstract

We develop an analytical expression for the self-energy of the infinite-dimensional Hubbard model that is correct in a number of different limits. The approach represents a generalization of the iterative perturbation theory to arbitrary fillings. In the weak-coupling regime perturbation theory to second order in the interaction U is recovered. The theory is exact in the atomic limit. The high-energy behavior of the self-energy up to order (1/E)**2 and thereby the first four moments of the spectral density are reproduced correctly. Referring to a standard strong-coupling moment method, we analyze the limit of strong U. Different modifications of the approach are discussed and tested by comparing with the results of an exact diagonalization study.Comment: LaTeX, 14 pages, 5 ps figures included, title changed, references updated, minor change

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Last time updated on 05/06/2019