Stochastic geometric wave equations with values in compact Riemannian homogeneous spaces

Abstract

Let M be a compact Riemannian homogeneous space (e.g. a Euclidean sphere). We prove existence of a global weak solution of the stochastic wave equation Dt∂tu=Σk=1d Dxk∂xku+fu(Du)+gu(Du)\, W in any dimension d 1, where f and g are continuous multilinear mappings and W is a spatially homogeneous Wiener process on Rd$ with finite spectral measure. A nonstandard method of constructing weak solutions of SPDEs, that does not rely on martingale representation theorem, is employed.