A stochastic heat equation with non-locally Lipschitz coefficients

Abstract

We consider the stochastic heat equation (SHE) on the torus T=[0,1], driven by space-time white noise W, with an initial condition u0 that is nonnegative and not identically zero: equation* ∂ u∂ t = 12∂2 u∂ x2 + b(u) + σ(u)W. equation* The drift b and diffusion coefficient σ are Lipschitz continuous away from zero, although their Lipschitz constants may blow up as the argument approaches zero. We establish the existence of a unique global mild solution that remains strictly positive. Examples include b(u)=u| u|A1 and σ(u)=u| u|A2 with A1∈(0,1) and A2∈(0,1/4).