The L2-unique continuation property on manifolds with bounded geometry and the deformation operator

Abstract

A differential operator T satisfies the L2-unique continuation property if every L2-solution of T that vanishes on an open subset vanishes identically. We study the L2-unique continuation property of an operator T acting on a manifold with bounded geometry. In particular, we establish some connections between this property and the regularity properties of T. As an application, we prove that the deformation operator on a manifold with bounded geometry satisfies regularity and L2-unique continuation properties. As another application, we prove that suitable elliptic operators are invertible (Hadamard well-posedness). Our results apply to compact manifolds, which have bounded geometry.