A scattering approach to a surface with hyperbolic cusp

Abstract

Let X be a two-dimensional smooth manifold with boundary S1 and Y=[1,∞)× S1. We consider a family of complete surfaces arising by endowing XS1Y with a parameter dependent Riemannian metric, such that the restriction of the metric to Y converges to the hyperbolic metric as a limit with respect to the parameter. We describe the associated spectral and scattering theory of the Laplacian for such a surface. We further show that on Y the zero S1-Fourier coefficient of the generalized eigenfunction of this Laplacian, as a family with respect to the parameter, approximates in a certain sense, for large values of the spectral parameter, the zero S1-Fourier coefficient of the generalized eigenfunction of the Laplacian for the case of a surface with hyperbolic cusp.