Singularities of solutions to quadratic vector equations on complex upper half-plane

Abstract

Let S be a positivity preserving symmetric linear operator acting on bounded functions. The nonlinear equation -1m=z+Sm with a parameter z in the complex upper half-plane H has a unique solution m with values in H . We show that the z -dependence of this solution can be represented as the Stieltjes transforms of a family of probability measures v on R . Under suitable conditions on S , we show that v has a real analytic density apart from finitely many algebraic singularities of degree at most three. Our motivation comes from large random matrices. The solution m determines the density of eigenvalues of two prominent matrix ensembles; (i) matrices with centered independent entries whose variances are given by S and (ii) matrices with correlated entries with a translation invariant correlation structure. Our analysis shows that the limiting eigenvalue density has only square root singularities or a cubic root cusps; no other singularities occur.