Can the Stochastic Wave Equation with Strong Drift Hit Zero?

Abstract

We study the stochastic wave equation with multiplicative noise and singular drift: \[ ∂tu(t,x)= u(t,x)+u-α(t,x)+g(u(t,x))W(t,x) \] where x lies in the circle R/JZ and u(0,x)>0. We show that (i) If 0<α<1 then with positive probability, u(t,x)=0 for some (t,x). (ii) If α>3 then with probability one, u(t,x)0 for all (t,x).