Query complexity of unitary operation discrimination

Abstract

Discrimination of unitary operations is fundamental in quantum computation and information. A lot of quantum algorithms including the well-known Deutsch-Jozsa algorithm, Simon's algorithm, and Grover's algorithm can essentially be regarded as discriminating among individual, or sets of unitary operations (oracle operators). The problem of discriminating between two unitary operations U and V can be described as: Given X∈\U, V\, determine which one X is. If X is given with multiple copies, then one can design an adaptive procedure that takes multiple queries to X to output the identification result of X. In this paper, we consider the problem: How many queries are required for achieving a desired failure probability ε of discrimination between U and V. We prove in a uniform framework: (i) if U and V are discriminated with bound error ε , then the number of queries T must satisfy T≥ 21-4ε(1-ε) (U V), and (ii) if they are discriminated with one-sided error ε, then there is T≥ 21-ε2 (U V), where k denotes the minimum integer not less than k and (W) denotes the length of the smallest arc containing all the eigenvalues of W on the unit circle.