Maximal inequality of Stochastic convolution driven by compensated Poisson random measures in Banach spaces

Abstract

Let (E, \| ·\|) be a Banach space such that, for some q≥ 2, the function x \|x\|q is of C2 class and its first and second Fr\'echet derivatives are bounded by some constant multiples of (q-1)-th power of the norm and (q-2)-th power of the norm and let S be a C0-semigroup of contraction type on (E, \| ·\|). We consider the following stochastic convolution process align* u(t)=∫0t∫ZS(t-s)(s,z)\,N(d s,d z), \;\;\; t≥ 0, align* where N is a compensated Poisson random measure on a measurable space (Z,Z) and :[0,∞)×× Z→ E is an F Z-predictable function. We prove that there exists a c\`adl\`ag modification a u of the process u which satisfies the following maximal inequality align* E 0≤ s≤ t \|u(s)\|q≤ C\ E (∫0t∫Z \|(s,z) \|p\,N(d s,d z))qp, align* for all q ≥ q and 1<p≤ 2 with C=C(q,p).