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Topological Expansion in the Complex Cubic Log-Gas Model. One-Cut Case

Published 14 Jun 2016 in math-ph, math.CA, and math.MP | (1606.04303v1)

Abstract: We prove the topological expansion for the cubic log-gas partition function [ Z_N(t)= \int_\Gamma\cdots\int_\Gamma\prod_{1\leq j<k\leq N}(z_j-z_k)2 \prod_{k=1}Ne{-N\left(-\frac{z3}{3}+tz\right)}\mathrm dz_1\cdots \mathrm dz_N, ] where $t$ is a complex parameter and $\Gamma$ is an unbounded contour on the complex plane extending from $e{\pi \mathrm i}\infty$ to $e{\pi \mathrm i/3}\infty$. The complex cubic log-gas model exhibits two phase regions on the complex $t$-plane, with one cut and two cuts, separated by analytic critical arcs of the two types of phase transition: split of a cut and birth of a cut. The common point of the critical arcs is a tricritical point of the Painlev\'e I type. In the present paper we prove the topological expansion for $\log Z_N(t)$ in the one-cut phase region. The proof is based on the Riemann--Hilbert approach to semiclassical asymptotic expansions for the associated orthogonal polynomials and the theory of $S$-curves and quadratic differentials.

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