Spectral properties of the Cauchy process

Abstract

We study the spectral properties of the transition semigroup of the killed one-dimensional Cauchy process on the half-line (0,infty) and the interval (-1,1). This process is related to the square root of one-dimensional Laplacian A = -sqrt(-d2/dx2) with a Dirichlet exterior condition (on a complement of a domain), and to a mixed Steklov problem in the half-plane. For the half-line, an explicit formula for generalized eigenfunctions psilambda of A is derived, and then used to construct spectral representation of A. Explicit formulas for the transition density of the killed Cauchy process in the half-line (or the heat kernel of A in (0,infty)), and for the distribution of the first exit time from the half-line follow. The formula for psilambda is also used to construct approximations to eigenfunctions of A in the interval. For the eigenvalues lambdan of A in the interval the asymptotic formula lambdan = n pi/2 - pi/8 + O(1/n) is derived, and all eigenvalues lambdan are proved to be simple. Finally, efficient numerical methods of estimation of eigenvalues lambdan are applied to obtain lower and upper numerical bounds for the first few eigenvalues up to 9th decimal point.