Uncertainty relations for general unitary operators

TL;DR

This paper derives tighter uncertainty relations for arbitrary unitary operators, providing new bounds and insights into minimum-uncertainty states, with applications to quantum interference and higher-dimensional systems.

Contribution

It introduces improved uncertainty bounds for unitary operators, connects them to ground states of the Harper Hamiltonian, and explores their operational implications in quantum interference.

Findings

Tighter bounds than existing literature for unitary operator uncertainties.

Derived the minimum-uncertainty state equation analytically.

Linked uncertainty in unitary operators to quantum interference visibility.

Abstract

We derive several uncertainty relations for two arbitrary unitary operators acting on physical states of a Hilbert space. We show that our bounds are tighter in various cases than the ones existing in the current literature. Using the uncertainty relation for the unitary operators, we obtain the tight state-independent lower bound for the uncertainty of two Pauli observables and anticommuting observables in higher dimensions. With regard to the minimum-uncertainty states, we derive the minimum-uncertainty state equation by the analytic method and relate this to the ground-state problem of the Harper Hamiltonian. Furthermore, the higher-dimensional limit of the uncertainty relations and minimum-uncertainty states are explored. From an operational point of view, we show that the uncertainty in the unitary operator is directly related to the visibility of quantum interference in an interferometer where one arm of the interferometer is affected by a unitary operator. This shows a principle of preparation uncertainty, i.e., for any quantum system, the amount of visibility for two general noncommuting unitary operators is nontrivially upper bounded.