An Exactly Soluble Model of a Many-Fermion System
- 1 September 1963
- journal article
- conference paper
- Published by AIP Publishing in Journal of Mathematical Physics
- Vol. 4 (9) , 1154-1162
- https://doi.org/10.1063/1.1704046
Abstract
An exactly soluble model of a one-dimensional many-fermion system is discussed. The model has a fairly realistic interaction between pairs of fermions. An exact calculation of the momentum distribution in the ground state is given. It is shown that there is no discontinuity in the momentum distribution in this model at the Fermi surface, but that the momentum distribution has infinite slope there. Comparison with the results of perturbation theory for the same model is also presented, and it is shown that, for this case at least, the perturbation and exact answers behave qualitatively alike. Finally, the response of the system to external fields is also discussed.Keywords
This publication has 10 references indexed in Scilit:
- Méthodes d’approximation pour la détermination de potentiels semi-phénoménologiques nucléon-nucléonIl Nuovo Cimento (1869-1876), 1961
- Solution of the equations for the green’s functions of a two dimensional relativistic field theoryIl Nuovo Cimento (1869-1876), 1961
- Analytic Properties of Single-Particle Propagators for Many-Fermion SystemsPhysical Review B, 1961
- Fermi Surface and Some Simple Equilibrium Properties of a System of Interacting FermionsPhysical Review B, 1960
- Ground-State Energy of a Many-Fermion System. IIPhysical Review B, 1960
- Image of the Fermi Surface in the Vibration Spectrum of a MetalPhysical Review Letters, 1959
- An explicit solution of the thirring modelIl Nuovo Cimento (1869-1876), 1958
- A soluble relativistic field theoryAnnals of Physics, 1958
- A GENERAL EXPRESSION FOR THE CONDUCTIVITY TENSORCanadian Journal of Physics, 1956
- Theory of Positron Annihilation in SolidsReviews of Modern Physics, 1956