Evolution of the Stochastic Airy eigenvalues under a changing boundary

Abstract

The Airyβ point process, originally introduced by Ram\'irez, Rider, and Vir\'ag, is defined as the spectrum of the stochastic Airy operator Hβ acting on a subspace of L2[0,∞) with Dirichlet boundary condition. In this paper we study the coupled family of point processes defined as the eigenvalues of Hβ acting on a subspace of L2[t,∞). These point processes are coupled through the Brownian term of Hβ. We show that these point processes as a function of t are differentiable with explicitly computable derivative. Moreover when recentered by t the resulting point process is stationary. This process can also be viewed as an analogue to the 'GUE minor process' in the tridiagonal setting.