Correlations constrained by composite measurements
- URL: http://arxiv.org/abs/2009.04994v4
- Date: Thu, 3 Aug 2023 08:19:28 GMT
- Title: Correlations constrained by composite measurements
- Authors: John H. Selby, Ana Bel\'en Sainz, Victor Magron, {\L}ukasz Czekaj,
Micha{\l} Horodecki
- Abstract summary: How to understand the set of admissible correlations in nature is one outstanding open problem in the core of the foundations of quantum theory.
We show that demanding that a theory exhibits a composite measurement imposes a hierarchy of constraints on the structure of its sets of states and effects.
In particular, we show that in certain situations this assumption has surprisingly strong consequences, namely, that Tsirelson's bound can be recovered.
- Score: 1.539147548025619
- License: http://creativecommons.org/licenses/by/4.0/
- Abstract: How to understand the set of correlations admissible in nature is one
outstanding open problem in the core of the foundations of quantum theory. Here
we take a complementary viewpoint to the device-independent approach, and
explore the correlations that physical theories may feature when restricted by
some particular constraints on their measurements. We show that demanding that
a theory exhibits {a composite} measurement imposes a hierarchy of constraints
on the structure of its sets of states and effects, which translate to a
hierarchy of constraints on the allowed correlations themselves. We moreover
focus on the particular case where one demands the existence of a correlated
measurement that reads out the parity of local fiducial measurements. By
formulating a non-linear Optimisation Problem, and semidefinite relaxations of
it, we explore the consequences of the existence of such a parity reading
measurement for violations of Bell inequalities. In particular, we show that in
certain situations this assumption has surprisingly strong consequences,
namely, that Tsirelson's bound can be recovered.
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