A CLT for the L2 moduli of continuity of local times of Levy processes

Abstract

Let X=\Xt,t∈ R+\ be a symmetric L\'evy process with local time \Lxt ; (x,t)∈ R1× R1+\. When the L\'evy exponent () is regularly varying at infinity with index 1<β≤ 2 and satisfies some additional regularity conditions && h2(1/h) ∫ (Lx+h1- Lx1)2 dx- E(∫ (Lx+h1- Lx1)2 dx) && 1 in L (8cβ,1)1/2 η (∫ (L1x)2 dx)1/2 , as h 0, where η is a normal random variable with mean zero and variance one that is independent of Lxt, and cβ,1 is a known constant.