Measurement uncertainty: the problem of characterising optimal error bounds

Research output: Working paperPreprint

Author(s)

Department/unit(s)

Publication details

DateIn preparation - May 2016
Number of pages14
VolumearXiv:1512.00104v2
Original languageEnglish

Abstract

We consider the task of characterizing optimal protocols for approximating incompatible observables via jointly measurable observables. This amounts to jointly minimizing the approximation errors (suitably quantified), subject to the compatibility constraint. We review two distinct ways of conceptualizing the joint measurement problem and elucidate their connection. As a case study we consider the approximation of two-valued qubit observables and scrutinize two recent approaches that are based on different ways of quantifying errors, each giving rise to a form of tradeoff relation for the error measures used. For the first of these approaches we exhibit a formulation of the trade-off in operational terms as a measurement uncertainty relation. Furthermore we find a disparity between the respective optimal approximators singled out by the two approaches, which underlines the operational shortcomings of the second type of error measures.

    Research areas

  • quantum mechanics, uncertainty relations, quantum measurement

Discover related content

Find related publications, people, projects, datasets and more using interactive charts.

View graph of relations