Moments and asymptotics for a class of SPDEs with space-time white noise

Abstract

In this article, we consider the nonlinear stochastic partial differential equation of fractional order in both space and time variables with constant initial condition: equation* (∂βt+2(-)α / 2) u(t, x)= ~ Itγ[λ u(t, x) W(t, x)] t>0,~ x∈ Rd, equation* where W is space-time white noise, α>0, β∈(0,2], γ 0, λ≠0 and >0. The existence and uniqueness of solution in the It\o-Skorohod sense is obtained under Dalang's condition. We obtain explicit formulas for both the second moment and the second moment Lyapunov exponent. We derive the p-th moment upper bounds and find the matching lower bounds. Our results solve a large class of conjectures regarding the order of the p-th moment Lyapunov exponents. In particular, by letting β=2, α=2, γ=0, and d=1, we confirm the following standing conjecture for the stochastic wave equation: align* t-1 E[u(t,x)p] p3/2, for p 2 as t ∞. align* The method for the lower bounds is inspired by a recent work by Hu and Wang [HW21], where the authors focus on the space-time colored Gaussian noise.