Level sets of the stochastic wave equation driven by a symmetric L\'evy noise

Abstract

We consider the solution \u(t,x);t≥0,x∈R\ of a system of d linear stochastic wave equations driven by a d-dimensional symmetric space-time L\'evy noise. We provide a necessary and sufficient condition on the characteristic exponent of the L\'evy noise, which describes exactly when the zero set of u is non-void. We also compute the Hausdorff dimension of that zero set when it is non-empty. These results will follow from more general potential-theoretic theorems on the level sets of L\'evy sheets.