Asymptotic behavior of the stochastic heat equation over large intervals

Abstract

We consider a nonlinear stochastic heat equation on [0,T]× [-L,L], driven by a space-time white noise W, with a given initial condition u0: R R and three different types of (vanishing) boundary conditions: Dirichlet, Mixed and Neumann. We prove that as L∞, the random field solution at any space-time position converges in the Lp(Ω)-norm (p 1) to the solution of the stochastic heat equation on R (with the same initial condition u0), and we determine the (near optimal) rate of convergence. The proof relies on estimates of differences between the corresponding Green's functions on [-L, L] and the heat kernel on R, and on a space-time version of a Gronwall-type lemma.