Critical Behaviour of the Number of Minima of a Random Landscape at the Glass Transition Point and the Tracy-Widom distribution

Abstract

We exploit a relation between the mean number Nm of minima of random Gaussian surfaces and extreme eigenvalues of random matrices to understand the critical behaviour of Nm in the simplest glass-like transition occuring in a toy model of a single particle in N-dimensional random environment, with N 1. Varying the control parameter μ through the critical value μc we analyse in detail how Nm(μ) drops from being exponentially large in the glassy phase to Nm(μ) 1 on the other side of the transition. We also extract a subleading behaviour of Nm(μ) in both glassy and simple phases. The width δμ/μc of the critical region is found to scale as N-1/3 and inside that region Nm(μ) converges to a limiting shape expressed in terms of the Tracy-Widom distribution.