CHSH mod 3 reaches its exact maximal quantum value only with maximally entangled qutrit pairs (unique up to symmetry) and any strategy within ε of the optimum is O(√ε)-close to a direct sum of those optimal strategies.
Self-testing of quantum systems: A review
3 Pith papers cite this work. Polarity classification is still indexing.
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UNVERDICTED 3representative citing papers
Exhaustive search yields conjectured tight Bell inequalities defining the local set for symmetric binary-outcome triangle networks, together with outer approximations used to probe the classical-quantum gap.
Analytical self-testing criterion proven for equal-coefficient symmetric three-qubit state; general family shown numerically self-testable via swap method and SDP.
citing papers explorer
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Robust self-testing with CHSH mod 3
CHSH mod 3 reaches its exact maximal quantum value only with maximally entangled qutrit pairs (unique up to symmetry) and any strategy within ε of the optimum is O(√ε)-close to a direct sum of those optimal strategies.
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Local models and Bell inequalities for the minimal triangle network
Exhaustive search yields conjectured tight Bell inequalities defining the local set for symmetric binary-outcome triangle networks, together with outer approximations used to probe the classical-quantum gap.
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Self-testing of symmetric three-qubit states
Analytical self-testing criterion proven for equal-coefficient symmetric three-qubit state; general family shown numerically self-testable via swap method and SDP.