A Variation on the Donsker-Varadhan Inequality for the Principial Eigenvalue

Abstract

The purpose of this short note is to give a variation on the classical Donsker-Varadhan inequality, which bounds the first eigenvalue of a second-order elliptic operator on a bounded domain by the largest mean first exit time of the associated drift-diffusion process via λ1 ≥ 1x ∈ Ex τc. Instead of looking at the mean of the first exit time, we study quantiles: let dp, ∂ : → R≥ 0 be the smallest time t such that the likelihood of exiting within that time is p, then λ1 ≥ (1/p)x ∈ dp,∂ (x). Moreover, as p → 0, this lower bound converges to λ1.