The semiclassical limit on a star-graph with Kirchhoff conditions

Abstract

We consider the dynamics of a quantum particle of mass m on a n-edges star-graph with Hamiltonian HK=-(2m)-12 and Kirchhoff conditions in the vertex. We describe the semiclassical limit of the quantum evolution of an initial state supported on one of the edges and close to a Gaussian coherent state. We define the limiting classical dynamics through a Liouville operator on the graph, obtained by means of Kren's theory of singular perturbations of self-adjoint operators. For the same class of initial states, we study the semiclassical limit of the wave and scattering operators for the couple (HK,HD), where HD is the free Hamiltonian with Dirichlet conditions in the vertex.