Approximations of quantum-graph vertex couplings by singularly scaled potentials

Abstract

We investigate the limit properties of a family of Schr\"odinger operators of the form H= -d2dx2+ λ()2Q (x) acting on n-edge star graphs with Kirchhoff conditions imposed at the vertex. The real-valued potential Q is supposed to have compact support and λ(·) to be analytic around =0 with λ(0)=1. We show that if the operator has a zero-energy resonance of order m for =1 and λ(1)=1, in the limit 0 one obtains the Laplacian with a vertex coupling depending on 1+12 m(2n-m+1) parameters. We prove the norm-resolvent convergence as well as the convergence of the corresponding on-shell scattering matrices. The obtained vertex couplings are of scale-invariant type provided λ'(0)=0; otherwise the scattering matrix depends on energy and the scaled potential becomes asymptotically opaque in the low-energy limit.