Coherent states with minimum Gini uncertainty for finite quantum systems

Abstract

Uncertainty relations () ηd in terms of the Gini index are studied. The `Gini uncertainty constant' ηd is estimated numerically and compared to an upper bound ηd ηd. It is shown that for large d we get ηd≈ ηd. States g with minimum Gini uncertainty and displacement transformations are used to define coherent states α, βg (where α, β ∈ Zd) with minimum Gini uncertainty ([α, βg\;gα, β]≈ ηd). The α, βg resolve the identity, and therefore an arbitrary state can be expanded in terms of them. This expansion is robust in the presence of noise.

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