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Hauptverfasser: Kolangatt, Mayalakshmi, Muruganandan, Thigazholi, Naik, Sahil Gopalkrishna, Guha, Tamal, Banik, Manik, Saha, Sutapa
Format: Preprint
Veröffentlicht: 2022
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Online-Zugang:https://arxiv.org/abs/2205.05415
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author Kolangatt, Mayalakshmi
Muruganandan, Thigazholi
Naik, Sahil Gopalkrishna
Guha, Tamal
Banik, Manik
Saha, Sutapa
author_facet Kolangatt, Mayalakshmi
Muruganandan, Thigazholi
Naik, Sahil Gopalkrishna
Guha, Tamal
Banik, Manik
Saha, Sutapa
contents Hardy's argument constitutes an elegantly logical test for identifying nonlocal features of multipartite correlations. In this paper, we investigate Hardy's nonlocal behavior within a broad class of operational theories, including the qubit state space as a specific case. Specifically, we begin by examining a wider range of operational models with state space descriptions in the form of regular polygons. First, we present a systematic method to characterize the possible forms of entangled states within bipartite compositions of these models. Then, through explicit examples, we identify the classes of entangled states that exhibit Hardy-type nonlocality. Remarkably, our findings highlight a closer analogy between odd polygon models and the qubit state space in terms of their bipartite Hardy nonlocal behavior compared to even-sided polygons. Furthermore, we demonstrate that the emergence of mixed-state Hardy nonlocality in any operational model is determined by a specific symmetry inherent in its dynamic description. Finally, our results uncover an unexplored class of almost-quantum correlations that can be associated with an explicit operational model.
format Preprint
id arxiv_https___arxiv_org_abs_2205_05415
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle Bipartite polygon models: entanglement classes and their nonlocal behaviour
Kolangatt, Mayalakshmi
Muruganandan, Thigazholi
Naik, Sahil Gopalkrishna
Guha, Tamal
Banik, Manik
Saha, Sutapa
Quantum Physics
Hardy's argument constitutes an elegantly logical test for identifying nonlocal features of multipartite correlations. In this paper, we investigate Hardy's nonlocal behavior within a broad class of operational theories, including the qubit state space as a specific case. Specifically, we begin by examining a wider range of operational models with state space descriptions in the form of regular polygons. First, we present a systematic method to characterize the possible forms of entangled states within bipartite compositions of these models. Then, through explicit examples, we identify the classes of entangled states that exhibit Hardy-type nonlocality. Remarkably, our findings highlight a closer analogy between odd polygon models and the qubit state space in terms of their bipartite Hardy nonlocal behavior compared to even-sided polygons. Furthermore, we demonstrate that the emergence of mixed-state Hardy nonlocality in any operational model is determined by a specific symmetry inherent in its dynamic description. Finally, our results uncover an unexplored class of almost-quantum correlations that can be associated with an explicit operational model.
title Bipartite polygon models: entanglement classes and their nonlocal behaviour
topic Quantum Physics
url https://arxiv.org/abs/2205.05415