Kinks in the Kondo problem
Abstract
We find the exact quasiparticle spectrum for the continuum Kondo problem of species of electrons coupled to an impurity of spin . In this description, the impurity becomes an immobile quasiparticle sitting on the boundary. The particles are ``kinks'', which can be thought of as field configurations interpolating between adjacent wells of a potential with degenerate minima. For the overscreened case , the boundary has this kink structure as well, which explains the non-integer number of boundary states previously observed. Using simple arguments along with the consistency requirements of an integrable theory, we find the exact elastic -matrix for the quasiparticles scattering among themselves and off of the boundary. This allows the calculation of the exact free energy, which agrees with the known Bethe ansatz solution.
Cite
@article{arxiv.cond-mat/9304031,
title = {Kinks in the Kondo problem},
author = {Paul Fendley},
journal= {arXiv preprint arXiv:cond-mat/9304031},
year = {2016}
}
Comments
9 pages +1 figure