The quantum fidelity for the time-dependent singular quantum oscillator

Abstract

In this paper we perform an exact study of ``Quantum Fidelity'' (also called Loschmidt Echo) for the time-periodic quantum Harmonic Oscillator of Hamiltonian : H\g(t):=P22+ f(t)Q22+g2Q2 when compared with the quantum evolution induced by H\0(t) (g=0), in the case where f is a T-periodic function and g a real constant. The reference (initial) state is taken to be an arbitrary ``generalized coherent state'' in the sense of Perelomov. We show that, starting with a quadratic decrease in time in the neighborhood of t=0, this quantum fidelity may recur to its initial value 1 at an infinite sequence of times t\k. We discuss the result when the classical motion induced by Hamiltonian H\0(t) is assumed to be stable versus unstable. A beautiful relationship between the quantum and the classical fidelity is also demonstrated.

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