Resolvent expansions and continuity of the scattering matrix at embedded thresholds: the case of quantum waveguides
arXiv:1402.0373
Abstract
We present an inversion formula which can be used to obtain resolvent expansions near embedded thresholds. As an application, we prove for a class of quantum waveguides the absence of accumulation of eigenvalues and the continuity of the scattering matrix at all thresholds.
Updated version of the manuscript with a new title