Relative entropy is an exact measure of non-Gaussianity
arXiv:1308.2939 · doi:10.1103/PhysRevA.88.012322
Abstract
We prove that the closest Gaussian state to an arbitrary $N$-mode field state through the relative entropy is built with the covariance matrix and the average displacement of the given state. Consequently, the relative entropy of an $N$-mode state to its associate Gaussian one is an exact distance-type measure of non-Gaussianity. In order to illustrate this finding, we discuss the general properties of the $N$-mode Fock-diagonal states and evaluate their exact entropic amount of non-Gaussianity.
6 pages, no figures. Comments are welcome