Asymptotic expansion of a partition function related to the sinh-model

Abstract

This paper develops a method to carry out the large-N asymptotic analysis of a class of N-dimensional integrals arising in the context of the so-called quantum separation of variables method. We push further ideas developed in the context of random matrices of size N, but in the present problem, two scales 1/Nα and 1/N naturally occur. In our case, the equilibrium measure is Nα-dependent and characterised by means of the solution to a 2× 2 Riemann--Hilbert problem, whose large-N behavior is analysed in detail. Combining these results with techniques of concentration of measures and an asymptotic analysis of the Schwinger-Dyson equations at the distributional level, we obtain the large-N behavior of the free energy explicitly up to o(1). The use of distributional Schwinger-Dyson is a novelty that allows us treating sufficiently differentiable interactions and the mixing of scales 1/Nα and 1/N, thus waiving the analyticity assumptions often used in random matrix theory.