The Unique Pure Gaussian State Determined by the Partial Saturation of the Uncertainty Relations of a Mixed Gaussian State

Abstract

Let the density matrix of a mixed Gaussian state. Assuming that one of the Robertson--Schr\"odinger uncertainty inequalities is saturated by , e.g. (X1)2(P1)2=(X1,P1)2+(1/4)2, we show that there exists a unique pure Gaussian state whose Wigner distribution is dominated by that of and having the same variances and covariance X1,P1, and (X1,P1) as . This property can be viewed as an analytic version of Gromov's non-squeezing theorem in the linear case, which implies that the intersection of a symplectic ball by a single plane of conjugate coordinates determines the radius of this ball.