Non-intersecting squared Bessel paths at a hard-edge tacnode

Abstract

The squared Bessel process is a 1-dimensional diffusion process related to the squared norm of a higher dimensional Brownian motion. We study a model of n non-intersecting squared Bessel paths, with all paths starting at the same point a>0 at time t=0 and ending at the same point b>0 at time t=1. Our interest lies in the critical regime ab=1/4, for which the paths are tangent to the hard edge at the origin at a critical time t*∈ (0,1). The critical behavior of the paths for n∞ is studied in a scaling limit with time t=t*+O(n-1/3) and temperature T=1+O(n-2/3). This leads to a critical correlation kernel that is defined via a new Riemann-Hilbert problem of size 4× 4. The Riemann-Hilbert problem gives rise to a new Lax pair representation for the Hastings-McLeod solution to the inhomogeneous Painlev\'e II equation q"(x) = xq(x)+2q3(x)-, where =α+1/2 with α>-1 the parameter of the squared Bessel process. These results extend our recent work with Kuijlaars and Zhang DKZ for the homogeneous case = 0.