Matrix optimization under random external fields

Abstract

We consider the quadratic optimization problem FnW,h:= x ∈ Sn-1 ( xT W x/2 + hT x )\,, with W a (random) matrix and h a random external field. We study the probabilities of large deviation of FnW,h for h a centered Gaussian vector with i.i.d. entries, both conditioned on W (a general Wigner matrix), and unconditioned when W is a GOE matrix. Our results validate (in a certain region) and correct (in another region), the prediction obtained by the mathematically non-rigorous replica method in Y. V. Fyodorov, P. Le Doussal, J. Stat. phys. 154 (2014).