Kernels and point processes associated with Whittaker functions

Abstract

This article considers Whittaker's function W ,μ where is real and μ is real or purely imaginary. Then (x)=x-μ -1/2W ,μ (x) arises as the scattering function of a continuous time linear system with state space L2(1/2, ∞ ) and input and output spaces C. The Hankel operator on L2(0, ∞ ) is expressed as a matrix with respect to the Laguerre basis and gives the Hankel matrix of moments of a Jacobi weight w. The operation of translating is equivalent to multiplying w by an exponential factor to give w. The determinant of the Hankel matrix of moments of w satisfies the σ form of Painlev\'e's transcendental differential equation PV. It is shown that gives rise to the Whittaker kernel from random matrix theory, as studied by Borodin and Olshanski (Comm. Math. Phys. 211 (2000), 335--358).