Entropy of Quantum Measurements

Abstract

If a is a quantum effect and is a state, we define the -entropy Sa( ) which gives the amount of uncertainty that a measurement of a provides about . The smaller Sa( ) is, the more information a measurement of a gives about . In Section~2, we provide bounds on Sa( ) and show that if a+b is an effect, then Sa+b( ) Sa( )+Sb( ). We then prove a result concerning convex mixtures of effects. We also consider sequential products of effects and their -entropies. In Section~3, we employ Sa( ) to define the -entropy SA( ) for an observable A. We show that SA( ) directly provides the -entropy S ( ) for an instrument . We establish bounds for SA( ) and prove characterizations for when these bounds are obtained. These give simplified proofs of results given in the literature. We also consider -entropies for measurement models, sequential products of observables and coarse-graining of observables. Various examples that illustrate the theory are provided.