Electric Charge as a Vector Quantity
Abstract
Starting with the premise that the electric charge associated with fundamental fermions (quarks and leptons) can, under certain circumstances, be appropriately represented as a real internal 2-vector, the mathematical ``machinery'' implicit in the associated internal 2-space is shown to apply to all fundamental fermions. In particular, it is shown that flavor eigenstates, flavor doublets and families of fundamental fermions can all be represented in the 2-space, and that such things as internal colors, family replication, and the observed number (three) of families, are more-or-less implicit in the new 2-space description. Moreover, the model predicts that, unlike the case in the standard model, particles such as the u, c and t quarks are characterized by significant internal (topological and other) differences. Similar differences may help explain recent observations of (nearly) maximal μ-τ mixing.
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