New Functional Integral Approach to Strongly Correlated Fermi Systems: The Gutzwiller Approximation as a Saddle Point
- 15 September 1986
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review Letters
- Vol. 57 (11), 1362-1365
- https://doi.org/10.1103/physrevlett.57.1362
Abstract
We propose a new functional integral representation of the Hubbarda and Anderson models of lattice fermions. The simplest saddle-point approximation leads, at zero temperature, to the results derived from the Gutzwiller variational wave function. This approach uncovers the limitations of the Gutzwiller approximation and clarifies its connection to the "auxiliary-boson" mean-field theory of the Anderson model. This formulation leads to a novel strong-coupling mean-field theory which allows for a unified treatment of antiferromagnetism and ferromagnetism, metal-to-insulator transition, and Kondo compensation effects.Keywords
This publication has 16 references indexed in Scilit:
- Role of infrared divergences in the 1/N expansion of the U=∞ Anderson modelJournal of Physics C: Solid State Physics, 1985
- New approach to the mixed-valence problemPhysical Review B, 1984
- Monte Carlo Study of the Two-Dimensional Hubbard ModelPhysical Review Letters, 1983
- On the solution of the Coqblin-Schreiffer Hamiltonian by the large-N expansion techniqueJournal of Physics C: Solid State Physics, 1983
- New method for the Anderson model. II. The U=0 limitJournal of Physics F: Metal Physics, 1977
- New method for the Anderson modelJournal of Physics F: Metal Physics, 1976
- Application of Gutzwiller's Variational Method to the Metal-Insulator TransitionPhysical Review B, 1970
- Ferromagnetism in a Narrow, Almost Half-FilledBandPhysical Review B, 1966
- Correlation of Electrons in a NarrowBandPhysical Review B, 1965
- Effect of Correlation on the Ferromagnetism of Transition MetalsPhysical Review Letters, 1963