Random Matrices with Merging Singularities and the Painlev\'e V Equation

Abstract

We study the asymptotic behavior of the partition function and the correlation kernel in random matrix ensembles of the form 1Zn | ( M2-tI )|α e-nTr V(M)dM, where M is an n× n Hermitian matrix, α>-1/2 and t∈ R, in double scaling limits where n∞ and simultaneously t 0. If t is proportional to 1/n2, a transition takes place which can be described in terms of a family of solutions to the Painlev\'e V equation. These Painlev\'e solutions are in general transcendental functions, but for certain values of α, they are algebraic, which leads to explicit asymptotics of the partition function and the correlation kernel.