Poisson kernels on the half-plane are bell-shaped

Abstract

Consider a second-order elliptic operator L in the half-plane R × (0, ∞) with coefficients depending only on the second coordinate. The Poisson kernel for L is used in the representation of positive L-harmonic functions, that is, solutions of L u = 0. In probabilistic terms, the Poisson kernel is the density function of the distribution of the diffusion in R × (0, ∞) with generator L at the hitting time of the boundary. We prove that the Poisson kernel for L is bell-shaped: its nth derivative changes sign n times. In particular, it is unimodal and it has two inflection points (it is concave, then convex, then concave again).