Top eigenvalue of a random matrix: large deviations and third order phase transition

Abstract

We study the fluctuations of the largest eigenvalue λ of N × N random matrices in the limit of large N. The main focus is on Gaussian β-ensembles, including in particular the Gaussian orthogonal (β=1), unitary (β=2) and symplectic (β = 4) ensembles. The probability density function (PDF) of λ consists, for large N, of a central part described by Tracy-Widom distributions flanked, on both sides, by two large deviations tails. While the central part characterizes the typical fluctuations of λ -- of order O(N-2/3) --, the large deviations tails are instead associated to extremely rare fluctuations -- of order O(1). Here we review some recent developments in the theory of these extremely rare events using a Coulomb gas approach. We discuss in particular the third-order phase transition which separates the left tail from the right tail, a transition akin to the so-called Gross-Witten-Wadia phase transition found in 2-d lattice quantum chromodynamics. We also discuss the occurrence of similar third-order transitions in various physical problems, including non-intersecting Brownian motions, conductance fluctuations in mesoscopic physics and entanglement in a bipartite system.