Local times for systems of non-linear stochastic heat equations

Abstract

We consider u(t,x)=(u1(t,x),·s,ud(t,x)) the solution to a system of non-linear stochastic heat equations in spatial dimension one driven by a d-dimensional space-time white noise. We prove that, when d≤ 3, the local time L(,t) of \u(t,x)\,,\;t∈[0,T]\ exists and L(,t) belongs a.s. to the Sobolev space Hα(Rd) for α<4-d2, and when d≥ 4, the local time does not exist. We also show joint continuity and establish H\"older conditions for the local time of \u(t,x)\,,\;t∈[0,T]\. These results are then used to investigate the irregularity of the coordinate functions of \u(t,x)\,,\;t∈[0,T]\. Comparing to similar results obtained for the linear stochastic heat equation (i.e., the solution is Gaussian), we believe that our results are sharp. Finally, we get a sharp estimate for the partial derivatives of the joint density of (u(t1,x)-u(t0,x),·s,u(tn,x)-u(tn-1,x)), which is a new result and of independent interest.