Effect of small noise on the speed of reaction-diffusion equations with non-Lipschitz drift

Abstract

We consider the [0,1]-valued solution (ut,x:t≥ 0, x∈ R) to the one dimensional stochastic reaction diffusion equation with Wright-Fisher noise \[∂t u= ∂x2 u + f(u) + ε u(1-u) W.\] Here, W is a space-time white noise, ε > 0 is the noise strength, and f is a continuous function on [0,1] satisfying z∈ [0,1]|f(z)|/ z(1-z) < ∞. We assume the initial data satisfies 1 - u0,-x = u0,x = 0 for x large enough. Recently, it was proved in (Comm. Math. Phys. 384 (2021), no. 2) that the front of ut propagates with a finite deterministic speed Vf,ε, and under slightly stronger conditions on f, the asymptotic behavior of Vf,ε was derived as the noise strength ε approaches ∞. In this paper we complement the above result by obtaining the asymptotic behavior of Vf,ε as the noise strength ε approaches 0: for a given p∈ [1/2,1), if f(z) is non-negative and is comparable to zp for sufficiently small z, then Vf,ε is comparable to ε-21-p1+p for sufficiently small ε.