Authors: Peter Cameron
The possibility of electron geometric structure is studied using a model based upon quantized electromagnetic impedances, and written in the language of geometric Clifford algebra. In such a model the electron is expanded beyond the point, to include the simplest possible objects in one, two, and three dimensions. These point, line, plane, and volume elements, quantized at the scale of the electron Compton wavelength and given the attributes of electric and magnetic fields, comprise a minimally complete Pauli algebra of flat 3D space. One can calculate quantized impedances associated with elementary particle spectrum observables (the S-matrix) from interactions between the eight geometric objects of this algebra - one scalar, three vectors, three bivector pseudovectors, and one trivector pseudoscalar. The resulting matrix comprises a Dirac algebra of 4D spacetime. Proton structure and spin are extracted via the dual character of scalar electric and pseudoscalar magnetic charges.
Comments: 12 Pages.
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