Approximate evolution for a hybrid system: An optomechanical Jaynes-Cummings model

Abstract

In this work we start from a phenomenological Hamiltonian built from two known systems: the Hamiltonian of a pumped optomechanical system and the Jaynes Cummings Hamiltonian. Using algebraic techniques we construct an approximate time evolution operator Uopt for the forced optomechanical system (as a product of exponentials) and take the JC Hamiltonian as an interaction. We transform the later with Uopt to obtain a generalized interaction picture Hamiltonian which can be linearized and whose time evolution operator is written in a product form. The analytic results are compared with purely numerical calculations using the full Hamiltonian and the agreement between them is remarkable.