Proves a lifting theorem for self-testing assumptions with a counterexample correlation that requires them and cannot be realized by projective measurements on full Schmidt rank states.
Constant-sized robust self-tests for states and measurements of unbounded dimension, 2021, 2103.01729 http://arxiv.org/abs/2103.01729
2 Pith papers cite this work. Polarity classification is still indexing.
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A family of steering inequalities is constructed whose maximal quantum violation certifies specific classes of d-outcome measurements (linear combinations of Heisenberg-Weyl operators) and the maximally entangled two-qudit state without purity or projectivity assumptions.
citing papers explorer
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A mathematical foundation for self-testing: Lifting common assumptions
Proves a lifting theorem for self-testing assumptions with a counterexample correlation that requires them and cannot be realized by projective measurements on full Schmidt rank states.
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Certifying classes of $d$-outcome measurements with quantum steering
A family of steering inequalities is constructed whose maximal quantum violation certifies specific classes of d-outcome measurements (linear combinations of Heisenberg-Weyl operators) and the maximally entangled two-qudit state without purity or projectivity assumptions.