Two point eigenvalue correlation for a class of non-selfadjoint operators under random perturbations

Abstract

We consider a non-selfadjoint h-differential model operator Ph in the semiclassical limit (h→ 0) subject to random perturbations with a small coupling constant δ. Assume that (-1Ch) < δ h for constants C,>0 suitably large. Let be the closure of the range of the principal symbol. We study the 2-point intensity measure of the random point process of eigenvalues of the randomly perturbed operator Phδ and prove an h-asymptotic formula for the average 2-point density of eigenvalues. With this we show that two eigenvalues of Phδ in the interior of exhibit close range repulsion and long range decoupling.