A projective conformal map defines generalized Fock-Lorentz transformations applied to 1D Klein-Gordon and Dirac oscillators, producing explicit FL corrections to their spectra that vanish as the deformation length R goes to infinity.
Relativistic quan- tum mechanics of a Dirac oscillator,
2 Pith papers cite this work. Polarity classification is still indexing.
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physics.gen-ph 2years
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Derives time-dependent apparent mass from FL dual ansatz, quantizes to KG/Dirac equations, and computes adiabatic spectra for 1D oscillators showing slow drift to zero energy.
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Generalized Fock--Lorentz Transformations from Projective Conformal Coordinates and Their Application to One-Dimensional Relativistic Oscillators
A projective conformal map defines generalized Fock-Lorentz transformations applied to 1D Klein-Gordon and Dirac oscillators, producing explicit FL corrections to their spectra that vanish as the deformation length R goes to infinity.
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Klein--Gordon and Dirac Oscillators with an Apparent Mass Induced by the Momentum-Space Dual of the Fock--Lorentz Transformations
Derives time-dependent apparent mass from FL dual ansatz, quantizes to KG/Dirac equations, and computes adiabatic spectra for 1D oscillators showing slow drift to zero energy.