Mid-concavity of survival probability for isotropic Levy processes

Abstract

Let X be a symmetric, pure jump, unimodal Levy process in R with an infinite Levy measure. We prove that for any fixed t > 0 the survival probability Px(τ(-a,a) > t) is nondecreasing on (-a,0], nonincreasing on [0,a) and concave on (-a/2,a/2), where a > 0 and τ(-a,a) is the first exit time of the process X from (-a,a). We also show a similar statement for sets (-a,a) × F ⊂ Rd.