On Steiner Symmetrizations for First Exit Time Distributions

Abstract

Let At be an α-stable symmetric process, 0<α≤ 2, on Rd and D⊂ Rd be a bounded domain. This paper presents a proof, based on the classical Brascamp-Lieb-Luttinger inequalities for multiple integrals, that the distribution of the first exit time of At from D increases under Steiner symmetrization. Further, it is shown that when a sequence of domains \Dm\ each contained in a ball B and satisfying the -cone condition converges to a domain D' with respect to the Hausdorff metric, the sequence of distributions of first exit times for Brownian motion from Dm converges to the distribution of the first exit time of Brownian motion from D'. These results will then be used to establish inequalities involving distributions of first exit times of At from triangles and quadrilaterals. The primary application of these inequalities is verifying a conjecture from Ba\~nuelos for these planar domains. This extends a classical result of P\'olya and Szeg\"o to the fractional Laplacian with Dirichlet boundary conditions.