A Physical Limit, by Just Particle-Edge Dimension (re), for Harmonics Node as Causation for Rydberg Constant and Implications Versus Both Current a) Mass and b) Fine Structure Constant Methods
ORAL
Abstract
The current methods for deriving Rydberg’s Constant concentrate on either a) a combination of mass, Planck’s Constant and the speed of light; or b) the fine structure constant (αF) versus the Bohr-H radius. By replacing Rydberg infinity with the physical limit of harmonic nodes between electron and nucleon as inelastic limit defined by the particle dimeter (2re), I derive a Rydberg constant only by (re).
This approach explains why every Element and every subshell limits to the same Rydberg constant where existing, valid a) and b) do not. The frequency may be different, but eventually for every Element and every subshell at increasing energy levels, those harmonics eventually limit to a same physical particle radius dimension, no matter the subshell electron set location or its relative mass. So, Rmax and not R∞.
As such, my universal scaling factor (re/a0)V/W becomes more useful than αF, and frames all elementary particle mass-value and mass-units.
This approach explains why every Element and every subshell limits to the same Rydberg constant where existing, valid a) and b) do not. The frequency may be different, but eventually for every Element and every subshell at increasing energy levels, those harmonics eventually limit to a same physical particle radius dimension, no matter the subshell electron set location or its relative mass. So, Rmax and not R∞.
As such, my universal scaling factor (re/a0)V/W becomes more useful than αF, and frames all elementary particle mass-value and mass-units.
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Presenters
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Arno Vigen
Authors
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Arno Vigen