English

Initial measures for the stochastic heat equation

Probability 2011-10-19 v1

Abstract

We consider a family of nonlinear stochastic heat equations of the form tu=Lu+σ(u)W˙\partial_t u=\mathcal{L}u + \sigma(u)\dot{W}, where W˙\dot{W} denotes space-time white noise, L\mathcal{L} the generator of a symmetric L\'evy process on R\R, and σ\sigma is Lipschitz continuous and zero at 0. We show that this stochastic PDE has a random-field solution for every finite initial measure u0u_0. Tight a priori bounds on the moments of the solution are also obtained. In the particular case that Lf=cf"\mathcal{L}f=cf" for some c>0c>0, we prove that if u0u_0 is a finite measure of compact support, then the solution is with probability one a bounded function for all times t>0t>0.

Keywords

Cite

@article{arxiv.1110.4079,
  title  = {Initial measures for the stochastic heat equation},
  author = {Daniel Conus and Mathew Joseph and Davar Khoshnevisan and Shang-Yuan Shiu},
  journal= {arXiv preprint arXiv:1110.4079},
  year   = {2011}
}
R2 v1 2026-06-21T19:22:19.917Z