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Who is afraid of nonhermitian operators? A quantum description of angle and phase - MaRDI portal

Who is afraid of nonhermitian operators? A quantum description of angle and phase

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Publication:1231149

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DOI10.1016/0003-4916(76)90283-9zbMath0338.47015OpenAlexW2090513440MaRDI QIDQ1231149

Jean-Marc Lévy-Leblond

Publication date: 1976

Published in: Annals of Physics (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1016/0003-4916(76)90283-9

Mathematics Subject Classification ID

Hermitian and normal operators (spectral measures, functional calculus, etc.) (47B15) Miscellaneous applications of functional analysis (46N99)

Related Items (20)

Uncertainty inequalities for superoscillations ⋮ Role of information theoretic uncertainty relations in quantum theory ⋮ Effect of losses on phase noise ⋮ Quantum localisation on the circle ⋮ A time operator in quantum mechanics ⋮ Observables, disassembled ⋮ Phase-number uncertainty from Weyl commutation relations ⋮ Quantum integrability and action operators in spin dynamics ⋮ On localized and coherent states on some new fuzzy spheres ⋮ Measuring localization-delocalization phenomena in a quantum corral ⋮ Uncertainty relations in quantum optics. Is the photon intelligent? ⋮ Self-adjoint phase operator ⋮ Classical and quantum complementarity ⋮ Characterizations of the canonical phase observable ⋮ On phase-space representations of quantum mechanics ⋮ Phase information from a conservation law ⋮ Phase operators via group contraction ⋮ Minimum uncertainty states for Dirac's number-phase pair ⋮ Coarse-graining approach to quantum cosmology ⋮ Group contraction and the nine Cayley-Klein geometries

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