Generalized quantum Zernike Hamiltonians admit a polynomial Higgs-type algebra yielding a deformed oscillator whose structure function factors, allowing algebraic energy spectra for N=1 to 5 with conjectures for all N.
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Bohmian electron trajectories plus classical-like EM fields reproduce quantum optics results including partition noise and the Born rule, treating photons as non-ontic descriptions of field-matter interactions.
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Generalized quantum Zernike Hamiltonians: Polynomial Higgs-type algebras and algebraic derivation of the spectrum
Generalized quantum Zernike Hamiltonians admit a polynomial Higgs-type algebra yielding a deformed oscillator whose structure function factors, allowing algebraic energy spectra for N=1 to 5 with conjectures for all N.
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A simple understanding of quantum electrodynamics using Bohmian trajectories: detecting non-ontic photons
Bohmian electron trajectories plus classical-like EM fields reproduce quantum optics results including partition noise and the Born rule, treating photons as non-ontic descriptions of field-matter interactions.