Stochastic wave equation in a plane driven by spatial stable noise

Abstract

The main object of this paper is the planar wave equation \[(∂2∂ t2-a2)U(x,t)=f(x,t), t0, x∈ R2,\] with random source f. The latter is, in certain sense, a symmetric α-stable spatial white noise multiplied by some regular function σ. We define a candidate solution U to the equation via Poisson's formula and prove that the corresponding expression is well defined at each point almost surely, although the exceptional set may depend on the particular point (x,t). We further show that U is H\"older continuous in time but with probability 1 is unbounded in any neighborhood of each point where σ does not vanish. Finally, we prove that U is a generalized solution to the equation.