Stochastic wave equation with heavy-tailed noise: Uniqueness of solutions and past light-cone property
Abstract
In this article, we study the stochastic wave equation in spatial dimensions d 2 with multiplicative L\'evy noise that can have infinite p-th moments. Using the past light-cone property of the wave equation, we prove the existence and uniqueness of a solution, considering only the p-integrability of the L\'evy measure for the region corresponding to the small jumps of the noise. For d=1, there are no restrictions on . For d=2, we assume that there exists a value p ∈ (0,2) for which ∫ \|z| 1 \ |z|p (dz) < + ∞.
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