Constructing Multipartite Bell inequalities from stabilizers
- URL: http://arxiv.org/abs/2002.01843v1
- Date: Wed, 5 Feb 2020 16:07:11 GMT
- Title: Constructing Multipartite Bell inequalities from stabilizers
- Authors: Qi Zhao and You Zhou
- Abstract summary: We propose a systematical framework to construct Bell inequalities from stabilizers maximally violated by general stabilizer states.
We show that the constructed Bell inequalities can self-test any stabilizer state which is essentially device-independent.
Our framework can not only inspire more fruitful multipartite Bell inequalities from conventional verification methods, but also pave the way for their practical applications.
- Score: 21.98685929768227
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: Bell inequality with self-testing property has played an important role in
quantum information field with both fundamental and practical applications.
However, it is generally challenging to find Bell inequalities with
self-testing property for multipartite states and actually there are not many
known candidates. In this work, we propose a systematical framework to
construct Bell inequalities from stabilizers which are maximally violated by
general stabilizer states, with two observables for each local party. We show
that the constructed Bell inequalities can self-test any stabilizer state which
is essentially device-independent, if and only if these stabilizers can
uniquely determine the state in a device-dependent manner. This bridges the gap
between device-independent and device-dependent verification methods. Our
framework can provide plenty of Bell inequalities for self-testing stabilizer
states. Among them, we give two families of Bell inequalities with different
advantages: (1) a family of Bell inequalities with a constant ratio of quantum
and classical bounds using 2N correlations, (2) Single pair inequalities
improving on all previous robustness self-testing bounds using N+1
correlations, which are both efficient and suitable for realizations in
multipartite systems. Our framework can not only inspire more fruitful
multipartite Bell inequalities from conventional verification methods, but also
pave the way for their practical applications.
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