Stochastic partial differential equations for superprocesses in random environments

Abstract

Let X=(Xt, t≥ 0) be a superprocess in a random environment described by a Gaussian noise Wg=\Wg(t,x), t≥ 0, x∈ Rd\ white in time and colored in space with correlation kernel g(x,y). We show that when d=1, Xt admits a jointly continuous density function Xt(x) that is a unique in law solution to a stochastic partial differential equation align* ∂ ∂ tXt(x)=2 Xt(x)+Xt(x) V(t,x)+Xt(x)Wg(t, x) , Xt(x)≥ 0, align* where V=\V(t,x), t≥ 0, x∈ R\ is a space-time white noise and is orthogonal with Wg. When d≥ 2, we prove that Xt is singular and hence density does not exist.