New SubmissionFrom the Noncommutativity of the Pauli Matrices to the Antimatter Asymmetry
ORAL
Abstract
We deduce from [sigma z, sigma x] = 2i sigma y
to (a) [differentiation operator, multiplication operator] = iI,
to (b) the motion of an electron wave = the union of two perpendicular semi-circular rotations,
to (c) the pair-creation of an electron and its positron,and
to (d) the conclusion that a left-handed positron can turn into a right-handed electron by a 180-degree spatial rotation, effecting a change of the orientation, hence the antimatter asymmetry.
to (a) [differentiation operator, multiplication operator] = iI,
to (b) the motion of an electron wave = the union of two perpendicular semi-circular rotations,
to (c) the pair-creation of an electron and its positron,and
to (d) the conclusion that a left-handed positron can turn into a right-handed electron by a 180-degree spatial rotation, effecting a change of the orientation, hence the antimatter asymmetry.
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Publication: Light, G. L. Pauli matrices immersion. Mater. Sci. Eng. B. 264, 114910 (1-6). https://doi.org/10.1016/j.mseb.2020.114910 (2021).
Presenters
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Gregory L Light
Providence College
Authors
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Gregory L Light
Providence College