Nonclassical statistics of fields in pair coherent states
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We examine the nonclassical properties of the pair coherent states defined as operator the simultaneous eigenstates of the that annihilates photons in pairs and of the operator that gives the relative occupation number in the two modes. We show that fields in such states have remarkable quantum features such as sub-Poissonian statistics, correlations in the number fluctuations, squeezing, and violations of Cauchy-Schwarz inequalities. We show how such pair coherent states can be generated by the competition of different nonlinear processes in a two-photon medium. The quantum features occur not only in the transient domain but also survive in the steady state because of the balance between nonlinear processes. 1988, Optical Society of America.