Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
10725976 | Physics Letters B | 2006 | 9 Pages |
Abstract
In fermion mixing phenomenology, the matrix of moduli squared, P=(|U|2), is well known to carry essentially the same information as the complex mixing matrix U itself, but with the advantage of being phase-convention independent. The matrix K, formed from the real parts of the mixing-matrix “plaquette” products, is similarly invariant. In this Letter, the P and K matrices are shown to be entirely equivalent, both being directly related (in the leptonic case) to the observable, locally L/E-averaged transition probabilities in neutrino oscillations. We study an (over-)complete set of flavour-symmetric Jarlskog-invariant functions of mass-matrix commutators, rewriting them simply as moment-transforms of such (real) invariant matrices.
Related Topics
Physical Sciences and Engineering
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Authors
P.F. Harrison, W.G. Scott, T.J. Weiler,