Solutions to the stochastic heat equation with polynomially growing multiplicative noise do not explode in the critical regime

Abstract

We investigate the finite time explosion of the stochastic heat equation ∂ u∂ t = u(t,x) + σ(u(t,x))W(t,x) in the critical setting where σ grows like σ(u) ≈ C(1 + |u|γ) and γ = 32. Mueller previously identified γ=32 as the critical growth rate for explosion and proved that solutions cannot explode in finite time if γ< 32 and solutions will explode with positive probability if γ>32. This paper proves that explosion does not occur in the critical γ=32 setting.