Asymptotics of the density of parabolic Anderson random fields

Abstract

We investigate the sharp density (t,x; y) of the solution u(t,x) to stochastic partial differential equation ∂ ∂ t u(t,x)=12 u(t,x)+u W(t,x), where W is a general Gaussian noise and denotes the Wick product. We mainly concern with the asymptotic behavior of (t,x; y) when y→ ∞ or when t0+. Both upper and lower bounds are obtained and these two bounds match each other modulo some multiplicative constants. If the initial datum is positive, then (t,x;y) is supported on the positive half line y∈ [0, ∞) and in this case we show that (t,x; 0+)=0 and obtain an upper bound for (t,x; y) when y→ 0+.