Determinantal structures for Bessel fields

Abstract

A Bessel field B=\B(α,t), α∈N0, t∈R\ is a two-variable random field such that for every (α,t), B(α,t) has the law of a Bessel point process with index α. The Bessel fields arise as hard edge scaling limits of the Laguerre field, a natural extension of the classical Laguerre unitary ensemble. It is recently proved in [LW21] that for fixed α, \B(α,t), t∈R\ is a squared Bessel Gibbsian line ensemble. In this paper, we discover rich integrable structures for the Bessel fields: along a time-like or a space-like path, B is a determinantal point process with an explicit correlation kernel; for fixed t, \B(α,t),α∈N0\ is an exponential Gibbsian line ensemble.