Polarity of almost all points for systems of non-linear stochastic heat equations in the critical dimension

Abstract

We study vector-valued solutions u(t,x)∈Rd to systems of nonlinear stochastic heat equations with multiplicative noise: equation* ∂∂ t u(t,x)=∂2∂ x2 u(t,x)+σ(u(t,x))W(t,x). equation* Here t≥ 0, x∈R and W(t,x) is an Rd-valued space-time white noise. We say that a point z∈Rd is polar if equation* P\u(t,x)=z for some t>0 and x∈R\=0. equation* We show that in the critical dimension d=6, almost all points in Rd are polar.