Exact Quantum Correlations of Conjugate Variables From Joint Quadrature Measurements

Abstract

We demonstrate that for two canonically conjugate operators q, p ,the global correlation q p + p q -2 q p, and the local correlations q (p) - q and p (q)- p can be measured exactly by Von Neumann-Arthurs-Kelly joint quadrature measurements . These correlations provide a sensitive experimental test of quantum phase space probabilities quite distinct from the probability densities of q,p . E.g. for EPR states, and entangled generalized coherent states, phase space probabilities which reproduce the correct position and momentum probability densities have to be modified to reproduce these correlations as well.