The semi-classical limit with delta potentials

Abstract

We consider the semi-classical limit of the quantum evolution of Gaussian coherent states whenever the Hamiltonian H is given, as sum of quadratic forms, by H= -22m\,d2\,dx2\,+\,αδ0, with α∈ R and δ0 the Dirac delta-distribution at x=0. We show that the quantum evolution can be approximated, uniformly for any time away from the collision time and with an error of order 3/2-λ, 0\!<\!λ\!<\!3/2, by the quasi-classical evolution generated by a self-adjoint extension of the restriction to C∞c( M0), M0:=\(q,p)\!∈\! R2\,|\,q\!=\!0\, of (-i times) the generator of the free classical dynamics; such a self-adjoint extension does not correspond to the classical dynamics describing the complete reflection due to the infinite barrier. Similar approximation results are also provided for the wave and scattering operators.