Complex powers for cone differential operators and the heat equation on manifolds with conical singularities

Abstract

We obtain left and right continuous embeddings for the domains of the complex powers of sectorial B-elliptic cone differential operators. We apply this result to the heat equation on manifolds with conical singularities and provide asymptotic expansions of the unique solution close to the conical points. We further show that the decomposition of the solution in terms of asymptotics spaces, i.e. finite dimensional spaces that describe the domains of the integer powers of the Laplacian and determined by the local geometry around the singularity, is preserved under the evolution.