A note on stochastic Fubini's theorem and stochastic convolution

Abstract

We provide a version of the stochastic Fubini's theorem which does not depend on the particular stochastic integrator chosen as far as the stochastic integration is built as a continuous linear operator from an Lp space of Banach space-valued processes (the stochastically integrable processes) to an Lp space of Banach space-valued paths (the integrated processes). Then, for integrators on a Hilbert space H, we consider stochastic convolutions with respect to a strongly continuous map R:(0,T]→ L(H), not necessarily a semigroup. We prove existence of predictable versions of stochastic convolutions and we characterize the measurability needed by operator-valued processes in order to be convoluted with R. Finally, when R is a C0-semigroup and the stochastic integral provides continuous paths, we show existence of a continuous version of the convolution, by adapting the factorization method to the present setting.