A method fixes preparation polytope dimension to enable efficient computation of noncontextual facet inequalities, yielding new inequalities and applications to measurement certification, dimension witnessing, and randomness certification.
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The argument of weak values of any observable in N-level systems is expressed as the sum of N-1 solid angles on the Bloch sphere using the Majorana symmetric representation.
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Efficient Computation of Generalized Noncontextual Polytopes and Quantum violation of their Facet Inequalities
A method fixes preparation polytope dimension to enable efficient computation of noncontextual facet inequalities, yielding new inequalities and applications to measurement certification, dimension witnessing, and randomness certification.
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Exploring weak value arguments and Bargmann invariants in $N$-level quantum systems through the Majorana symmetric representation
The argument of weak values of any observable in N-level systems is expressed as the sum of N-1 solid angles on the Bloch sphere using the Majorana symmetric representation.