Stochastic evolution equations in UMD Banach spaces

Abstract

We discuss existence, uniqueness, and space-time H\"older regularity for solutions of the parabolic stochastic evolution equation dU(t) = (AU(t) + F(t,U(t))) dt + B(t,U(t)) dWH(t), t∈ [0,], U(0) = u0, where A generates an analytic C0-semigroup on a UMD Banach space E and WH is a cylindrical Brownian motion with values in a Hilbert space H. We prove that if the mappings F:[0,T]× E E and B:[0,T]× E L(H,E) satisfy suitable Lipschitz conditions and u0 is 0-measurable and bounded, then this problem has a unique mild solution, which has trajectories in C([0,T];((-A)θ) provided λ 0 and θ 0 satisfy +θ<12. Various extensions of this result are given and the results are applied to parabolic stochastic partial differential equations.