Differential equations defined by Kren-Feller operators on Riemannian manifolds

Abstract

We study linear and semi-linear wave, heat, and Schr\"odinger equations defined by Kren-Feller operator -μ on a complete Riemannian n-manifolds M, where μ is a finite positive Borel measure on a bounded open subset of M with support contained in . Under the assumption that dim∞(μ)>n-2, we prove that for a linear or semi-linear equation of each of the above three types, there exists a unique weak solution. We study the crucial condition (μ)>n-2 and provide examples of measures on S2 and T2 that satisfy the condition. We also study weak solutions of linear equations of the above three classes by using examples on S1