Time regularity of stochastic convolutions and stochastic evolution equations in duals of nuclear spaces

Abstract

Let a locally convex space and be a quasi-complete, bornological, nuclear space (like spaces of smooth functions and distributions) with dual spaces ' and '. In this work we introduce sufficient conditions for time regularity properties of the '-valued stochastic convolution ∫0t ∫U S(t-r)'R(r,u) M(dr,du), t ∈ [0,T], where (S(t): t ≥ 0) is a C0-semigroup on , R(r,ω,u) is a suitable operator form ' into ' and M is a cylindrical-martingale valued measure on '. Our result is latter applied to study time regularity of solutions to '-valued stochastic evolutions equations.