Temporal regularity for the stochastic heat equation with rough dependence in space

Abstract

Consider the nonlinear stochastic heat equation ∂ u (t,x)∂ t=∂2 u (t,x)∂ x2+ σ(u (t,x))W(t,x), t> 0,\, x∈ R, where W is a Gaussian noise which is white in time and has the covariance of a fractional Brownian motion with Hurst parameter H∈( 14, 12) in the space variable. When σ(0)=0, the well-posedness of the solution and its H\"older continuity have been proved by Hu et al. HHLNT2017. In this paper, we study the asymptotic properties of the temporal gradient u(t+, x)-u(t, x) at any fixed t 0 and x∈ R, as 0. As applications, we deduce Khintchine's law of iterated logarithm, Chung's law of iterated logarithm, and a result on the q-variations of the temporal process \u(t, x)\t 0, where x∈ R is fixed.