Uncertainty Relations of Variances in View of the Weak Value

Abstract

The Schr\"odinger inequality is known to underlie the Kennard-Robertson inequality, which is the standard expression of quantum uncertainty for the product of variances of two observables A and B, in the sense that the latter is derived from the former. In this paper we point out that, albeit more subtle, there is yet another inequality which underlies the Schr\"odinger inequality in the same sense. The key component of this observation is the use of the weak-value operator A w(B) introduced in our previous works (named after Aharonov's weak value), which was shown to act as the proxy operator for A when B is measured. The lower bound of our novel inequality supplements that of the Schr\"odinger inequality by a term representing the discord between A w(B) and A. In addition, the decomposition of the Schr\"odinger inequality, which was also obtained in our previous works by making use the weak-value operator, is examined more closely to analyze its structure and the minimal uncertainty states. Our results are exemplified with some elementary spin 1 and 3/2 models as well as the familiar case of A and B being the position and momentum of a particle.