This
paper deals with the determination of currents and charges in the Feynman-Dyson
derivation of the Maxwell-Faraday equations in hypercomplex extensions. This
paper is a continuation of the Maxwell-Faraday equations' discussions on
hypercomplex extensions of the derivation of Feynman-Dyson. Mathematical proofs
typically have only a comparatively small validity since it is possible to
present an equally valuable set of contra-arguments for any set of mathematical
arguments; in physics, on the other hand, the ultimate verification of a
proposition is its confirmation by experiment and the solution is unique.
In non-abelian
versions of that approach: SU(2), SU(3) and G2, we examine the appearance of
charges and currents. G2 Lie algebra 's structure constants are directly
computed. Lastly, we propose a seven-dimensional color therapy.
Author(s) Details
Daniel Sepunaru
RCQCE - Research Center for Quantum Communication, Holon Academic
Institute of Technology, 52 Golomb St., Holon 58102, Israel.
View Book :- https://bp.bookpi.org/index.php/bpi/catalog/book/319
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