Regularity of the Optimal Stopping Problem for Jump Diffusions

Abstract

The value function of an optimal stopping problem for jump diffusions is known to be a generalized solution of a variational inequality. Assuming that the diffusion component of the process is nondegenerate and a mild assumption on the singularity of the L\'evy measure, this paper shows that the value function of this optimal stopping problem on an unbounded domain with finite/infinite variation jumps is in W2,1p, loc with p∈(1, ∞). As a consequence, the smooth-fit property holds.