Limit theorems for time-dependent averages of nonlinear stochastic heat equations

Abstract

We study limit theorems for time-dependent averages of the form Xt:=12L(t)∫-L(t)L(t) u(t, x) \, dx, as t ∞, where L(t)=(λ t) and u(t, x) is the solution to a stochastic heat equation on R+× R driven by space-time white noise with u0(x)=1 for all x∈ R. We show that for Xt (i) the weak law of large numbers holds when λ>λ1, (ii) the strong law of large numbers holds when λ>λ2, (iii) the central limit theorem holds when λ>λ3, but fails when λ <λ4≤ λ3, (iv) the quantitative central limit theorem holds when λ>λ5, where λi's are positive constants depending on the moment Lyapunov exponents of u(t, x).