English

Asymptotics for the partition function in two-cut random matrix models

Mathematical Physics 2015-10-07 v2 Analysis of PDEs math.MP

Abstract

We obtain large N asymptotics for the Hermitian random matrix partition function ZN(V)=RNi<j(xixj)2j=1NeNV(xj)dxj,Z_N(V)=\int_{\mathbb R^N}\prod_{i<j}(x_i-x_j)^2 \prod_{j=1}^N e^{-N V(x_j)}dx_j, in the case where the external potential VV 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 logZN(V)\log Z_N(V), up to terms that are small as NN goes to infinity. Our approach is based on the explicit computation of the first terms in the asymptotic expansion for a quartic symmetric potential VV. Afterwards, we use deformation theory of the partition function and of the associated equilibrium measure to generalize our results to general two-cut potentials VV. The asymptotic expansion of logZN(V)\log Z_N(V) as NN goes to infinity contains terms that depend analytically on the potential VV and that have already appeared in the literature. In addition our method allows to compute the VV-independent terms of the asymptotic expansion of logZN(V)\log Z_N(V) 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

R2 v1 2026-06-22T06:36:43.501Z