Decision problems with quantum black boxes

Mark Hillery, Erika Andersson, Stephen M. Barnett, Daniel Oi

Research output: Contribution to journalArticle

2 Citations (Scopus)

Abstract

We examine how to distinguish between unitary operators, when the exact form of the possible operators is not known. Instead we are supplied with 'programs' in the form of unitary transforms, which can be used as references for identifying the unknown unitary transform. All unitary transforms should be used as few times as possible. This situation is analogous to programmable state discrimination. One difference, however, is that the quantum state to which we apply the unitary transforms may be entangled, leading to a richer variety of possible strategies. By suitable selection of an input state and generalized measurement of the output state, both unambiguous and minimum-error discrimination can be achieved. Pairwise comparison of operators, comparing each transform to be identified with a program transform, is often a useful strategy. There are, however, situations in which more complicated strategies perform better. This is the case especially when the number of allowed applications of program operations is different from the number of the transforms to be identified.

Original languageEnglish
Pages (from-to)244-252
Number of pages9
JournalJournal of Modern Optics
Volume57
Issue number3
DOIs
Publication statusPublished - Jan 2010

Keywords

  • Generalized measurements
  • Operator comparison
  • Optimum discrimination
  • Unambiguous discrimination

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