Electron Mass Calculation Based on Simple Physical Assumptions
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Abstract
In this article, the electron mass is calculated based on simple physical assumptions, taking into account its electrostatic and magnetic energy. This approach aims to derive the electron mass from fundamental principles and constants, offering insights into the intrinsic properties of the electron and potentially resolving some of the theoretical challenges in physics.
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Moylan P. Poincaré on mass-energy equivalence. Bulgarian J Phys. 2019;46(2):81-93. Available from: https://www.bjp-bg.com/papers/bjp2019_2_081-093.pdf
Dirac PA. The quantum theory of the electron. Proc R Soc A. 1962;268:57-67. Available from: http://dx.doi.org/10.1098/rspa.1962.0124
Feynman R, Leighton R, Sands M. The Feynman lectures on physics. 1964:2. Available from: https://www.feynmanlectures.caltech.edu/messenger.html
Buravov L. Confining potential and mass of elementary particles. J Mod Phys. 2016;7:129-133. Available from: https://www.scirp.org/journal/paperinformation?paperid=62955
Buravov LI. Elementary muon, pion, and kaon particles as resonators for neutrino quanta. Calculations of mass ratios for e, μ, π0, π±, K0, K±, and νe. Russ Phys J. 2009;52:25-32. Available from: http://dx.doi.org/10.1007/s11182-009-9196-5
Berestetskii VB. Zero-charge and asymptotic freedom. Sov Phys Uspekhi. 1976;19(11):934-943. Available from: https://iopscience.iop.org/article/10.1070/PU1976v019n11ABEH005353