arXiv:hep-th/9607096 Abstract

arXiv:hep-th/9607096Abstract References Reviews Resources

The Standard Model within Non-associative Geometry

Published 1996-07-12Version 1

We present the construction of the standard model within the framework of non--associative geometry. For the simplest scalar product we get the tree--level predictions $m_W=\frac{1}{2} m_t\,,$ $m_H=\frac{3}{2} m_t$ and $\sin^2 \theta_W= \frac{3}{8}.$ These relations differ slightly from predictions derived in non--commutative geometry.

Comments: 9 pages. LaTeX 2e, styles: amsart, a4, array, eqnarray, bbm, mathrsfs, cite

Journal: Phys.Lett. B390 (1997) 119-127

DOI: 10.1016/S0370-2693(96)01336-6

Categories: hep-th

Subjects: 02.20.Sv, 11.15.-q, 12.10.Kt

Keywords: standard model, non-associative geometry, simplest scalar product, tree-level predictions, non-commutative geometry

Tags: journal article

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