Structure of minimum error discrimination for linearly independent states

Tanmay Singal, Eunsang Kim, and Sibasish Ghosh

Phys. Rev. A 99, 052334 – Published 23 May 2019

Abstract

In this paper we study the minimum error discrimination problem (MED) for ensembles of linearly independent (LI) states. We define a bijective map from the set of those ensembles to itself and we show that the pretty good measurement (PGM) and the optimal measurement for the MED are related by the map. In particular, the fixed points of the map are those ensembles for which the PGM is the optimal measurement. Also, we simplify the optimality conditions for the measurement of an ensemble of LI states.

Received 14 January 2019

DOI:https://doi.org/10.1103/PhysRevA.99.052334

Physics Subject Headings (PhySH)

Quantum measurements

Quantum Information, Science & TechnologyGeneral PhysicsAtomic, Molecular & Optical

Authors & Affiliations

Tanmay Singal^1,*, Eunsang Kim^1,†, and Sibasish Ghosh^2,3,‡

¹Department of Applied Mathematics, Hanyang University, Ansan Kyunggi-do, Korea
²Optics & Quantum Information Group, The Institute of Mathematical Sciences, CIT Campus, Taramani, Chennai, 600 113, India
³Homi Bhabha National Institute, Training School Complex, Anushakti Nagar, Mumbai 400094, India

^*tanmaysingal@gmail.com
^†eskim@hanyang.ac.kr
^‡sibasish@imsc.res.in

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Issue

Vol. 99, Iss. 5 — May 2019

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