Global solutions to reaction-diffusion equations with super-linear drift and multiplicative noise

Abstract

Let (t\,,x) denote space-time white noise and consider a reaction-diffusion equation of the form \[ u(t\,,x)=12 u"(t\,,x) + b(u(t\,,x)) + σ(u(t\,,x)) (t\,,x), \] on R+×[0\,,1], with homogeneous Dirichlet boundary conditions and suitable initial data, in the case that there exists >0 such that b(z) |z|(|z|)1+ for all sufficiently-large values of |z|. When σ 0, it is well known that such PDEs frequently have non-trivial stationary solutions. By contrast, Bonder and Groisman (2009) have recently shown that there is finite-time blowup when σ is a non-zero constant. In this paper, we prove that the Bonder--Groisman condition is unimproveable by showing that the reaction-diffusion equation with noise is "typically" well posed when b(z) =O(|z|+|z|) as |z|∞. We interpret the word "typically" in two essentially-different ways without altering the conclusions of our assertions.