Moment bounds of a class of stochastic heat equations driven by space-time colored noise in bounded domains

Abstract

We consider the fractional stochastic heat type equation align* ∂∂ t ut(x)=-(-)α/2ut(x)+σ(ut(x))F(t,x),\ \ \ x∈ D, \ \ t>0, align* with nonnegative bounded initial condition, where α∈ (0,2], >0 is the noise level, σ:R→R is a globally Lipschitz function satisfying some growth conditions and the noise term behaves in space like the Riez kernel and is possibly correlated in time and D is the unit open ball centered at the origin in Rd. When the noise term is not correlated in time, we establish a change in the growth of the solution of these equations depending on the noise level . On the other hand when the noise term behaves in time like the fractional Brownian motion with index H∈ (1/2,1), We also derive explicit bounds leading to a well-known intermittency property.