Asymptotics for the partition function in two-cut random matrix models
Abstract
We obtain large N asymptotics for the Hermitian random matrix partition function in the case where the external potential is a polynomials such that the random matrix eigenvalues accumulate on two disjoint intervals (the two-cut case). We compute leading and sub-leading terms in the asymptotic expansion for , up to terms that are small as goes to infinity. Our approach is based on the explicit computation of the first terms in the asymptotic expansion for a quartic symmetric potential . Afterwards, we use deformation theory of the partition function and of the associated equilibrium measure to generalize our results to general two-cut potentials . The asymptotic expansion of as goes to infinity contains terms that depend analytically on the potential and that have already appeared in the literature. In addition our method allows to compute the -independent terms of the asymptotic expansion of which, to the best of our knowledge, had not appeared before in the literature. We use rigorous orthogonal polynomial and Riemann-Hilbert techniques which had so far been successful to compute asymptotics for the partition function only in the one-cut case.
Keywords
Cite
@article{arxiv.1410.7001,
title = {Asymptotics for the partition function in two-cut random matrix models},
author = {Tom Claeys and Tamara Grava and Kenneth D. T-R McLaughlin},
journal= {arXiv preprint arXiv:1410.7001},
year = {2015}
}
Comments
75 pages. To appear in Comm. Math. Physics