Center of mass distribution of the Jacobi unitary ensembles: Painleve V, asymptotic expansions

Abstract

In this paper, we study the probability density function, P(c,α,β, n)\,dc, of the center of mass of the finite n Jacobi unitary ensembles with parameters α\,>-1 and β >-1; that is the probability that trMn∈(c, c+dc), where Mn are n× n matrices drawn from the unitary Jacobi ensembles. We first compute the exponential moment generating function of the linear statistics Σj=1n\,f(xj):=Σj=1nxj, denoted by Mf(λ,α,β,n).