English

Kernels and point processes associated with Whittaker functions

Classical Analysis and ODEs 2024-09-24 v1

Abstract

This article considers Whittaker's function Wκ,μW_{\kappa ,\mu } where κ\kappa is real and μ\mu is real or purely imaginary. Then φ(x)=xμ1/2Wκ,μ(x)\varphi (x)=x^{-\mu -1/2}W_{\kappa ,\mu }(x) arises as the scattering function of a continuous time linear system with state space L2(1/2,)L^2(1/2, \infty ) and input and output spaces C{\bf C}. The Hankel operator Γφ\Gamma_\varphi on L2(0,)L^2(0, \infty ) is expressed as a matrix with respect to the Laguerre basis and gives the Hankel matrix of moments of a Jacobi weight ww. The operation of translating φ\varphi is equivalent to multiplying ww by an exponential factor to give wεw_\varepsilon. The determinant of the Hankel matrix of moments of wεw_\varepsilon satisfies the σ\sigma form of Painlev\'e's transcendental differential equation PVPV. It is shown that Γφ\Gamma_\varphi gives rise to the Whittaker kernel from random matrix theory, as studied by Borodin and Olshanski (Comm. Math. Phys. 211 (2000), 335--358).\par

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Cite

@article{arxiv.1512.05249,
  title  = {Kernels and point processes associated with Whittaker functions},
  author = {Gordon Blower and Yang Chen},
  journal= {arXiv preprint arXiv:1512.05249},
  year   = {2024}
}

Comments

19 pages

R2 v1 2026-06-22T12:11:24.035Z