A Note on a threshold for temporal regularity of stochastic PDEs

Abstract

We consider solutions to linear parabolic SPDEs of the form \[ d u(t) + A u(t)\, d t = g(t)\, d β, u(0)=0, \] where A is a positive, invertible, and self-adjoint operator on a Hilbert space X, β is a one-dimensional Brownian motion, and g(t) x∈ X. We show that, for all α∈ [0,12), \[ u∈ L2(Ω;Wα,2(0,T;D(A1/2))) if and only if x∈ D(Aα). \] In particular, there is a lack of persistence of temporal regularity from the diffusion coefficient g to the solution, and additional spatial regularity is required to improve time regularity. In particular, this provides a counterexample to a conjectured time-regularity property for monotone stochastic evolution equations posed by D. Breit and M. Hofmanová in [C. R. Math. Acad. Sci. Paris 354 (2016), 33-37].