Variation and Rough Path Properties of Local Times of L\'evy Processes

Abstract

In this paper, we will prove that the local time of a L\'evy process is of finite p-variation in the space variable in the classical sense, a.s. for any p>2, t≥ 0, if the L\'evy measure satisfies ∫R \0\(|y|3 2 1)n(dy)<∞, and is a rough path of roughness p a.s. for any 2<p<3 under a slightly stronger condition for the L\'evy measure. Then for any function g of finite q-variation (1≤ q <3), we establish the integral ∫-∞∞g(x)dLtx as a Young integral when 1≤ q<2 and a Lyons' rough path integral when 2≤ q<3. We therefore apply these path integrals to extend the Tanaka-Meyer formula for a continuous function f if ∇ -f exists and is of finite q-variation when 1≤ q<3, for both continuous semi-martingales and a class of L\'evy processes.