Stochastic wave equation with L\'evy white noise

Abstract

In this article, we study the stochastic wave equation on the entire space Rd, driven by a space-time L\'evy white noise with possibly infinite variance (such as the α-stable L\'evy noise). In this equation, the noise is multiplied by a Lipschitz function σ(u) of the solution. We assume that the spatial dimension is d=1 or d=2. Under general conditions on the L\'evy measure of the noise, we prove the existence of the solution, and we show that, as a function-valued process, the solution has a c\`adl\`ag modification in the local fractional Sobolev space of order r<1/4 if d=1, respectively r<-1 if d=2.