Literature DB >> 30996477

Bounds on entanglement dimensions and quantum graph parameters via noncommutative polynomial optimization.

Sander Gribling1, David de Laat1, Monique Laurent1,2.   

Abstract

In this paper we study optimization problems related to bipartite quantum correlations using techniques from tracial noncommutative polynomial optimization. First we consider the problem of finding the minimal entanglement dimension of such correlations. We construct a hierarchy of semidefinite programming lower bounds and show convergence to a new parameter: the minimal average entanglement dimension, which measures the amount of entanglement needed to reproduce a quantum correlation when access to shared randomness is free. Then we study optimization problems over synchronous quantum correlations arising from quantum graph parameters. We introduce semidefinite programming hierarchies and unify existing bounds on quantum chromatic and quantum stability numbers by placing them in the framework of tracial polynomial optimization.

Entities:  

Keywords:  Entanglement dimension; Polynomial optimization; Quantum correlation; Quantum graph parameters

Year:  2018        PMID: 30996477      PMCID: PMC6435212          DOI: 10.1007/s10107-018-1287-z

Source DB:  PubMed          Journal:  Math Program        ISSN: 0025-5610            Impact factor:   3.995


  5 in total

1.  Simple unified form for the major no-hidden-variables theorems.

Authors: 
Journal:  Phys Rev Lett       Date:  1990-12-31       Impact factor: 9.161

2.  Testing the dimension of Hilbert spaces.

Authors:  Nicolas Brunner; Stefano Pironio; Antonio Acin; Nicolas Gisin; André Allan Méthot; Valerio Scarani
Journal:  Phys Rev Lett       Date:  2008-05-30       Impact factor: 9.161

3.  Bounding the Set of Finite Dimensional Quantum Correlations.

Authors:  Miguel Navascués; Tamás Vértesi
Journal:  Phys Rev Lett       Date:  2015-07-07       Impact factor: 9.161

4.  Minimum Dimension of a Hilbert Space Needed to Generate a Quantum Correlation.

Authors:  Jamie Sikora; Antonios Varvitsiotis; Zhaohui Wei
Journal:  Phys Rev Lett       Date:  2016-08-04       Impact factor: 9.161

5.  Bounds on entanglement dimensions and quantum graph parameters via noncommutative polynomial optimization.

Authors:  Sander Gribling; David de Laat; Monique Laurent
Journal:  Math Program       Date:  2018-05-21       Impact factor: 3.995
  5 in total
  1 in total

1.  Bounds on entanglement dimensions and quantum graph parameters via noncommutative polynomial optimization.

Authors:  Sander Gribling; David de Laat; Monique Laurent
Journal:  Math Program       Date:  2018-05-21       Impact factor: 3.995
  1 in total

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