Related papers: Entangled symmetric states and copositive matrices

Entangled symmetric states and copositive matrices

URL: http://arxiv.org/abs/2012.06631v4
Date: Tue, 5 Oct 2021 08:22:58 GMT
Title: Entangled symmetric states and copositive matrices
Authors: Carlo Marconi, Albert Aloy, Jordi Tura and Anna Sanpera
Abstract summary: Entanglement in symmetric quantum states and the theory of copositive matrices are intimately related. For the simplest symmetric states, i.e., the diagonal symmetric (DS) states, it has been shown that there exists a correspondence between exceptional (non-exceptional) copositive matrices and non-decomposable (decomposable) Entanglement Witnesses (EWs)
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Entanglement in symmetric quantum states and the theory of copositive matrices are intimately related concepts. For the simplest symmetric states, i.e., the diagonal symmetric (DS) states, it has been shown that there exists a correspondence between exceptional (non-exceptional) copositive matrices and non-decomposable (decomposable) Entanglement Witnesses (EWs). Here we show that EWs of symmetric, but not DS, states can also be constructed from extended copositive matrices, providing new examples of bound entangled symmetric states, together with their corresponding EWs, in arbitrary odd dimensions.

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