Resonances and resonance expansions for point interactions on the half-space

Abstract: In this paper we describe the resonances of the singular perturbation of the Laplacian on the half space $\Omega =\mathbb R^3_+$ given by the self-adjoint operator named $\delta$-interaction or point interaction. We will assume Dirichlet or Neumann boundary conditions on $\partial \Omega$. At variance with the well known case of $\mathbb R^3$, the resonances constitute an infinite set, here completely characterized. Moreover, we prove that resonances have an asymptotic distribution satisfying a modified Weyl law. Finally we give applications of the results to the asymptotic behavior of the abstract Wave and Schr\"odinger dynamics generated by the Laplacian with a point interaction on the half-space.