Unique Continuation Property for Stochastic Wave Equations
Abstract
This paper establishes a fundamental and surprising phenomenon in the theory of stochastic wave equations: the restoration of the unique continuation property (UCP) across characteristic hypersurfaces, a property that is known to fail generically in the deterministic setting. We prove that if a solution to a linear stochastic wave equation vanishes on one side of a characteristic surface , then it must vanish in a full neighborhood of any point on , provided the stochastic diffusion coefficient is non-degenerate. This result stands in sharp contrast to the classical H\"ormander-type counterexamples for deterministic waves. Furthermore, we extend the UCP to equations with non-homogeneous stochastic sources and establish a global unique continuation result from the interior of an arbitrarily narrow characteristic cone. Our proofs rely on a novel stochastic Carleman estimate, where the It\^o diffusion term introduces a crucial positive energy contribution that is absent in deterministic models. These findings demonstrate a qualitative difference between deterministic and stochastic hyperbolic dynamics and open new avenues for control theory and inverse problems in stochastic setting.
Keywords
Cite
@article{arxiv.2601.21854,
title = {Unique Continuation Property for Stochastic Wave Equations},
author = {Qi Lü and Zhonghua Liao},
journal= {arXiv preprint arXiv:2601.21854},
year = {2026}
}