On It\o's formula for symmetric α -stable L\'evy process of index 1<α≤ 2

Abstract

We use Young integration (resp, bounded p,q-variation theory introduced in Feng-Zhao) to establish integration of determinate functions with respect to local time of symmetric α-stable L\'evy process, for α ∈ ]1,2], in one parameter case (resp, in two parameter case). We then apply these integrals to write the corresponding generalized It\o formula. Furthermore, some approximations schemes of the area integral w.r.t local time are given.