Openness of Regular Regimes of Complex Random Matrix Models

Abstract

Consider the general complex polynomial external field V(z)=zkk+Σj=1k-1 tj zjj, tj ∈ C, k ∈ N. Fix an equivalence class T of admissible contours whose members approach ∞ in two different directions and consider the associated max-min energy problem. When k=2p, p ∈ N, and T contains the real axis, we show that the set of parameters t1, ·s, t2p-1 which gives rise to a regular q-cut max-min (equilibrium) measure, 1 ≤ q ≤ 2p-1 , is an open set in C2p-1. We use the implicit function theorem to prove that the endpoint equations are solvable in a small enough neighborhood of a regular q-cut point. We also establish the real-analyticity of the real and imaginary parts of the end-points for all q-cut regimes, 1 ≤ q ≤ 2p-1, with respect to the real and imaginary parts of the complex parameters in the external field. Our choice of even k and the equivalence class T R of admissible contours is only for the simplicity of exposition and our proof extends to all possible choices in an analogous way.