Large deviations of the largest eigenvalue for deformed GOE/GUE random matrices via replica
Abstract
We study the probability distribution function P(λ) of the largest eigenvalue λ max of N × N random matrices of the form H + V, where H belongs to the GOE/GUE ensemble and V is a full rank deterministic diagonal perturbation. This model is related to spherical spin glasses and semi-discrete directed polymers. In the large N limit, using the replica method introduced in Ref. TrivializationUs2014, we obtain the rate function L(λ) which describes the upper large deviation tail P(λ) e- β N L(λ) . We also obtain the moment generating function eN s λ eN φ(s) and the overlap of the optimal eigenvector with the perturbation V. For suitable V, a transition generically occurs in the rate functions. For the GUE it has a direct interpretation as a localisation transition for tilted directed polymers with competing columnar and point disorder. Although in a different form, our results are consistent with those obtained recently by Mc Kenna in McKenna2021. Finally, we consider briefly the quadratic optimisation problem in presence of an additional random field and obtain its large deviation rate function, although only within the replica symmetric phase.
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