Difference system for Selberg correlation integrals

Abstract

The Selberg correlation integrals are averages of the products Πs=1mΠl=1n (xs - zl)μs with respect to the Selberg density. Our interest is in the case m=1, μ1 = μ, when this corresponds to the μ-th moment of the corresponding characteristic polynomial. We give the explicit form of a (n+1) × (n+1) matrix linear difference system in the variable μ which determines the average, and we give the Gauss decomposition of the corresponding (n+1) × (n+1) matrix. For μ a positive integer the difference system can be used to efficiently compute the power series defined by this average.