Nonuniqueness for a parabolic SPDE with $\frac{3}{4}-\varepsilon$-H\"older diffusion coefficients

TL;DR

This paper demonstrates nonuniqueness of solutions for a specific parabolic SPDE with Hölder continuous diffusion coefficients below a critical regularity threshold, highlighting sharpness of existing uniqueness results.

Contribution

It proves nonuniqueness for the SPDE with diffusion coefficient Hölder exponent less than 3/4, establishing the sharpness of previous pathwise uniqueness results.

Findings

Nonzero solutions exist for 0<γ<3/4

Solutions are neither unique in law nor pathwise

The result parallels finite-dimensional SDE behavior with a critical exponent of 3/4.

Abstract

Motivated by Girsanov's nonuniqueness examples for SDEs, we prove nonuniqueness for the parabolic stochastic partial differential equation (SPDE) \[\frac{\partial u}{\partial t}=\frac{\Delta}{2}u(t,x) +\bigl|u(t,x)\bigr|^{\gamma}\dot{W}(t,x),\qquad u(0,x)=0.\] Here $\dot{W}$ is a space-time white noise on ${\mathbb {R}}_+\times {\mathbb {R}}$. More precisely, we show the above stochastic PDE has a nonzero solution for $0<\gamma<3/4$. Since $u(t,x)=0$ solves the equation, it follows that solutions are neither unique in law nor pathwise unique. An analogue of Yamada-Watanabe's famous theorem for SDEs was recently shown in Mytnik and Perkins [Probab. Theory Related Fields 149 (2011) 1-96] for SPDE's by establishing pathwise uniqueness of solutions to \[\frac{\partial u}{\partial t}=\frac{\Delta}{2}u(t,x)+\sigma \bigl(u(t,x)\bigr)\dot{W}(t,x)\] if $\sigma$ is H\"{o}lder continuous of index $\gamma>3/4$. Hence our examples show this result is essentially sharp. The situation for the above class of parabolic SPDE's is therefore similar to their finite dimensional counterparts, but with the index $3/4$ in place of $1/2$. The case $\gamma=1/2$ of the first equation above is particularly interesting as it arises as the scaling limit of the signed mass for a system of annihilating critical branching random walks.