Resolvents and complex powers of semiclassical cone operators

Abstract

We give a uniform description of resolvents and complex powers of elliptic semiclassical cone differential operators as the semiclassical parameter h tends to 0. An example of such an operator is the shifted semiclassical Laplacian h2g+1 on a manifold (X, g) of dimension n≥ 3 with conic singularities. Our approach is constructive and based on techniques from geometric microlocal analysis: we construct the Schwartz kernels of resolvents and complex powers as conormal distributions on a suitable resolution of the space [0,1)h× X× X of h-dependent integral kernels; the construction of complex powers relies on a calculus with a second semiclassical parameter. As an application, we characterize the domains of (h2g+1)w/2 for Re\,w∈(-n2,n2) and use this to prove the propagation of semiclassical regularity through a cone point on a range of weighted semiclassical function spaces.