Gazeau-Klauder squeezed states associated with solvable quantum systems

Abstract

A formalism for the construction of some classes of Gazeau-Klauder squeezed states, corresponding to arbitrary solvable quantum systems with a known discrete spectrum, are introduced. As some physical applications, the proposed structure is applied to a few known quantum systems and then statistical properties as well as squeezing of the obtained squeezed states are studied. Finally, numerical results are presented.