On the support of solutions to nonlinear stochastic heat equations

Abstract

We investigate the strict positivity and the compact support property of solutions to the one-dimensional nonlinear stochastic heat equation: ∂t u(t,x) = 12∂2x u(t,x) + σ(u(t,x))W(t,x), (t,x)∈ R+×R, with nonnegative and compactly supported initial data u0, where W is the space-time white noise and σ:R R is a continuous function with σ(0)=0. We prove that (i) if v/ σ(v) is sufficiently large near v=0, then the solution u(t,·) is strictly positive for all t>0, and (ii) if v/σ(v) is sufficiently small near v= 0, then the solution u(t,·) has compact support for all t>0. These findings extend previous results concerning the strict positivity and the compact support property, which were analyzed only for the case σ(u)≈ uγ for γ>0. Additionally, we establish the uniqueness of a solution and the weak comparison principle in case (i).

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