Eigenvalue gaps for the Cauchy process and a Poincar\'e inequality
Abstract
A connection between the semigroup of the Cauchy process killed upon exiting a domain and a mixed boundary value problem for the Laplacian in one dimension higher known as the "mixed Steklov problem," was established in a previous paper of the authors. From this, a variational characterization for the eigenvalues , , of the Cauchy process in was obtained. In this paper we obtain a variational characterization of the difference between and . We study bounded convex domains which are symmetric with respect to one of the coordinate axis and obtain lower bound estimates for where is the eigenvalue corresponding to the "first" antisymmetric eigenfunction for . The proof is based on a variational characterization of and on a weighted Poincar\'e--type inequality. The Poincar\'e inequality is valid for all symmetric stable processes, , and any other process obtained from Brownian motion by subordination. We also prove upper bound estimates for the spectral gap in bounded convex domains.
Cite
@article{arxiv.math/0408267,
title = {Eigenvalue gaps for the Cauchy process and a Poincar\'e inequality},
author = {Rodrigo Banuelos and Tadeusz Kulczycki},
journal= {arXiv preprint arXiv:math/0408267},
year = {2007}
}