Asymptotic Integral Kernel for Ensembles of Random Normal Matrix with Radial Potentials
Abstract
We use the steepest descents method to study the integral kernel of a family of normal random matrix ensembles with eigenvalue distribution PN(z1,...,zN) = ZN-1 e-Ni=1NVα(zi) 1≤i<j≤N|zi-zj|2 where Vα(z)=|z|α, z ∈ C and α ∈ ]0,∞[. Asymptotic analysis with error estimates are obtained. A corollary of this expansion is a scaling limit for the n-point function in terms of the integral kernel for the classical Segal--Bargmann space.
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