On some expectation and derivative operators related to integral representations of random variables with respect to a PII process

Abstract

Given a process with independent increments X (not necessarily a martingale) and a large class of square integrable r.v. H=f(XT), f being the Fourier transform of a finite measure μ, we provide explicit Kunita-Watanabe and F\"ollmer-Schweizer decompositions. The representation is expressed by means of two significant maps: the expectation and derivative operators related to the characteristics of X. We also provide an explicit expression for the variance optimal error when hedging the claim H with underlying process X. Those questions are motivated by finding the solution of the celebrated problem of global and local quadratic risk minimization in mathematical finance.