A Hierarchy for Replica Quantum Advantage

Abstract

We prove that given the ability to make entangled measurements on at most k replicas of an n-qubit state simultaneously, there is a property of which requires at least order 2n measurements to learn. However, the same property only requires one measurement to learn if we can make an entangled measurement over a number of replicas polynomial in k, n. Because the above holds for each positive integer k, we obtain a hierarchy of tasks necessitating progressively more replicas to be performed efficiently. We introduce a powerful proof technique to establish our results, and also use this to provide new bounds for testing the mixedness of a quantum state.