Weak Moment of a Class of Stochastic Heat Equation with Martingale-valued Harmonic Function

Abstract

A study of a non-linear parabolic SPDEs of the form ∂tu=L\,u + σ(u)f(Btx,t)w with w as the space-time white noise and f(Btx,t) a space-time harmonic function was done. The function σ:R→R is Lipschitz continuous and L the L2-generator of a L\'evy process. Some precise condition for existence and uniqueness of the solution were given and we show that the solution grows weakly(in law/distribution) in time (for large t) at most a precise exponential rate for the L; and grows in time at most a precise exponential rate for the case of L=-(-)α/2,\,\,α∈(1,2] generator of an alpha-stable process.