An exactly solvable model for the Fermi contact interaction

The Bose-Fermi Kondo model (BFKM) has a rich phase diagram which is sensitive to w À1 0 ðoÞ / joj 1À , the spectral density of the dissipative bosonic bath. Here, we show that the SUð2Þ BFKM is exactly solvable by the Bethe Ansatz method if the dissipative bosonic bath has a singular spectrum, corre

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.

A ternary solution is considered in which molecules of types AA, BB, aad AB occupy the bonds of a honeycomb lattice or a three-coordinate Bethe lattice. The three molecular ends near a common lattice site interact with arbitrary three-body interactions eAA A, eAa ~, e.Aa n and eBa B. The model is sh

## Abstract A model for the Fermi contact interaction is proposed in which the charge and magnetic moment of the nucleus are uniformly distributed within a sphere of radius __r__~0~. This leads to a Schrödinger equation, which is solvable without perturbation theory. In the mathematical limit __r__

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.