Sum Rules for Elements of Flavor-Mixing Matrices Based on a Non-Semisimple Symmetry
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概要
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Sum rules for elements of flavor-mixing matrices (FMMs) are derived within a new algebraic theory for flavor physics, in which the FMMs are identified with elements of the Lie group isomorphic to SU(2)×U(1). The resulting sum rules originating from the unique elaborate structure of the algebra of the group are so simple and explicit that their validity can be confirmed by analyzing properly processed experimental data.
- 2006-02-25
著者
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SOGAMI Ikuo
Physics Department, Kyoto Sangyo University
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Sogami Ikuo
Kyoto Sangyo Univ. Kyoto Jpn
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Sogami Ikuo
Physics Department Kyoto Sangyo University
関連論文
- Gauge Field Theory of Horizontal Symmetry Generated by a Central Extension of the Pauli Algebra(Particles and Fields)
- Notes on Flavor Mixing Matrices Characterized by SU(2)×U(1) Group Parameters
- Sum Rules for Elements of Flavor-Mixing Matrices Based on a Non-Semisimple Symmetry
- A Non-Semisimple Hidden Symmetry for Flavor Physics(Particles and Fields)
- Dirac Mass Matrices in Gauge Field Theory of Horizontal Symmetry(Particles and Fields)