Optimal regularity of SPDEs with additive noise

Abstract

The sample-function regularity of the random-field solution to a stochastic partial differential equation (SPDE) depends naturally on the roughness of the external noise, as well as on the properties of the underlying integro-differential operator that is used to define the equation. In this paper, we consider parabolic and hyperbolic SPDEs on 0,∞)×Rd of the form ∂t u = L u + g(u) + F ∂2t u = L u + c + F, with suitable initial data, forced with a space-time homogeneous Gaussian noise F that is white in its time variable and correlated in its space variable, and driven by the generator L of a genuinely d-dimensional L\'evy process X. We find optimal H\"older conditions for the respective random-field solutions to these SPDEs. Our conditions are stated in terms of indices that describe thresholds on the integrability of some functionals of the characteristic exponent of the process X with respect to the spectral measure of the spatial covariance of F. Those indices are suggested by references [45, 46] on the particular case that L is the Laplace operator on Rd.