Generalized Householder Transformations
Copyright policy )Generalized Householder Transformations
The Householder transformation, allowing a rewrite of probabilities into expectations of dichotomic observables, is generalized in terms of its spectral decomposition. The dichotomy is modulated by allowing more than one negative eigenvalue or by abandoning binaries altogether, yielding generalized operator-valued arguments for contextuality. We also discuss a form of contextuality by the variation of the functional relations of the operators, in particular by additivity.
Quantum Physics, probability distribution, Science, Physics, QC1-999, Q, FOS: Physical sciences, affine transformation, Householder transformation, Astrophysics, Article, QB460-466, expectation value, Physical Sciences, Quantum Physics (quant-ph), Mathematical Physics
Quantum Physics, probability distribution, Science, Physics, QC1-999, Q, FOS: Physical sciences, affine transformation, Householder transformation, Astrophysics, Article, QB460-466, expectation value, Physical Sciences, Quantum Physics (quant-ph), Mathematical Physics
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