A Strange Vertex Condition Coming From Nowhere

Abstract

We prove norm-resolvent and spectral convergence in L2 of solutions to the Neumann Poisson problem - u = f on a domain perforated by Dirichlet-holes and shrinking to a 1-dimensional interval. The limit u satisfies an equation of the type -u''+μ u = f on the interval (0,1), where μ is a positive constant. As an application we study the convergence of solutions in perforated graph-like domains. We show that if the scaling between the edge neighbourhood and the vertex neighbourhood is chosen correctly, the constant μ will appear in the vertex condition of the limit problem. In particular, this implies that the spectrum of the resulting quantum graph is altered in a controlled way by the perforation.