A quasilinear continuous evolution is introduced that reproduces the final states of von Neumann rank-one projective measurement while preserving no-signaling and ensemble equivalence.
What does it take to solve the measurement prob- lem?
2 Pith papers cite this work. Polarity classification is still indexing.
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Eigenfunctions of the 2D quantum harmonic oscillator map to Z_n-invariant classical particle motions along circles in lens spaces S^3/Z_n inside the reduced phase space C^2/Z_n.
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Quantum selective measurement as a quasilinear evolution
A quasilinear continuous evolution is introduced that reproduces the final states of von Neumann rank-one projective measurement while preserving no-signaling and ensemble equivalence.
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The Geometry Underlying the Quantum Harmonic Oscillator
Eigenfunctions of the 2D quantum harmonic oscillator map to Z_n-invariant classical particle motions along circles in lens spaces S^3/Z_n inside the reduced phase space C^2/Z_n.