Tight bounds for antidistinguishability and circulant sets of pure quantum states

Abstract

A set of pure quantum states is said to be antidistinguishable if upon sampling one at random, there exists a measurement to perfectly determine some state that was not sampled. We show that antidistinguishability of a set of n pure states is equivalent to a property of its Gram matrix called (n-1)-incoherence, thus establishing a connection with quantum resource theories that lets us apply a wide variety of new tools to antidistinguishability. As a particular application of our result, we present an explicit formula (not involving any semidefinite programming) that determines whether or not a set with a circulant Gram matrix is antidistinguishable. We also show that if all inner products are smaller than (n-2)/(2n-2) then the set must be antidistinguishable, and we show that this bound is tight when n ≤ 4. We also give a simpler proof that if all the inner products are strictly larger than (n-2)/(n-1), then the set cannot be antidistinguishable, and we show that this bound is tight for all n.

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