SO(10) unification in noncommutative geometry revisited
arXiv:hep-th/9804046 · doi:10.1142/S0217751X99000282
Abstract
We investigate the SO(10)-unification model in a Lie algebraic formulation of noncommutative geometry. The SO(10)-symmetry is broken by a 45-Higgs and the Majorana mass term for the right neutrinos (126-Higgs) to the standard model structure group. We study the case that the fermion masses are as general as possible, which leads to two 10-multiplets, four 120-multiplets and two additional 126-multiplets of Higgs fields. This Higgs structure differs considerably from the two Higgs multiplets 16 \otimes 16^* and 16^c \otimes 16^* used by Chamseddine and Fröhlich. We find the usual tree-level predictions of noncommutative geometry m_W=(1/2)m_t, \sin^2θ_W=(3/8) and g_2=g_3 as well as m_H \leq m_t.
25 pages, LaTeX 2e. v2: typos corrected and footnote on Super-Kamiokande results added