The semi-classical limit with a delta-prime potential

Abstract

We consider the quantum evolution e-itHβ of a Gaussian coherent state ∈ L2(R) localized close to the classical state (q,p) ∈ R2, where Hβ denotes a self-adjoint realization of the formal Hamiltonian -22m\,d2\,dx2 + β\,δ'0, with δ'0 the derivative of Dirac's delta distribution at x = 0 and β a real parameter. We show that in the semi-classical limit such a quantum evolution can be approximated (w.r.t. the L2(R)-norm, uniformly for any t ∈ R away from the collision time) by ei At eit LB φx, where At = p2t2m, φx() := (x) and LB is a suitable 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. While the operator LB here utilized is similar to the one appearing in our previous work [C. Cacciapuoti, D. Fermi, A. Posilicano, The semi-classical limit with a delta potential, Annali di Matematica Pura e Applicata (2020)] regarding the semi-classical limit with a delta potential, in the present case the approximation gives a smaller error: it is of order 7/2-λ, 0 < λ < 1/2, whereas it turns out to be of order 3/2-λ, 0 < λ < 3/2, for the delta potential. We also provide similar approximation results for both the wave and scattering operators.