Correlation hole for an exactly solvable problem

In this work we study the ground-state properties of the model Hamiltonian

A model for the interface of two interacting one-component plasmas of different background densities separated by an impermeable surface, is solved exactly in two dimensions at one special temperature. This model emulates the behaviour of an ideally polarizable interface. We obtain density profiles.

We present an exactly solvable Hamiltonian which consists of nearest neighbor hopping and infinite range interaction. The ground state and the thermodynamic quantities are analytically given in any dimensions. When the interaction is repulsive, the Luttinger's theorem breaks down. At half filling, w

A simple model of electrons interacting with phonons which displays a metal-insulator phase transition in the case of s.c. and b.c.c, tight-binding bands is studied. A proof is given that the model is exactly solvable in the thermodynamic limit.