Fermion masses and mixings in aμ-τsymmetricSO(10)

Abstract: Thesymmetry imposed on the neutrino mass matrix in the flavor basis is known to be quite predictive. We integrate this very specific neutrino symmetry into a more general framework based on the supersymmetric SOð10Þ grand unified theory. As in several other models, the fermion mass spectrum is determined by Hermitian mass matrices resulting from the renormalizable Yukawa couplings of the 16plet of fermions with the Higgs fields transforming as 10, 126, and 120 representations of the SOð10Þ group. Thesymmetry i… Show more

“…In addition we had imposed a generalized parity symmetry [27] which makes the complex matrices M 0 and M 2 real thereby reducing the number of free parameters. Thus the model that we consider is SO(10)⊗Z 2 µ−τ ⊗Z P 2 [14]. However it is to be mentioned that if we assume exact µ − τ (anti)symmetry in (M 2 ) M 0 then a generalized CP-invariance holds [14] and the CKM matrix comes out as real.…”

“…Thus the model that we consider is SO(10)⊗Z 2 µ−τ ⊗Z P 2 [14]. However it is to be mentioned that if we assume exact µ − τ (anti)symmetry in (M 2 ) M 0 then a generalized CP-invariance holds [14] and the CKM matrix comes out as real. This can be rectified either by assuming some of the vevs to be complex or by allowing a small explicit breaking of µ − τ symmetry in M 0 .…”

“…The 126 H relates the Majorana mass of the neutrinos to the Dirac mass as well as other charged fermion masses making the model predictive. It is also possible and in some cases advantageous to include all the three Higgs representations [13,14]. The model with 10 H + 120 H [15,16], on the other hand, does not have the requisite scalars to lead to neutrino masses through the seesaw mechanism.…”

“…Small deviation from these exact values may be generated by breaking the µ − τ symmetry by a small amount. Combining µ − τ flavour symmetry with GUTs has been considered in the case of SU (5) in [26] and also for SO(10) [14]. Here we impose µ − τ symmetry on the Yukawa matrix for the 10 H and 16 H whereas the one for 120 H is taken to be antisymmetric.…”

“…We also impose a parity symmetry leading to Hermitian Yukawa matrices. Thus we consider the model SO(10) ⊗ Z (µ−τ ) 2 ⊗ Z P 2 [14]. Imposition of these two symmetries help in reducing the number of unknown parameters in the Yukawa sector.…”

An SO(10) model with adjoint fermions for double seesaw neutrino masses

“…In addition we had imposed a generalized parity symmetry [27] which makes the complex matrices M 0 and M 2 real thereby reducing the number of free parameters. Thus the model that we consider is SO(10)⊗Z 2 µ−τ ⊗Z P 2 [14]. However it is to be mentioned that if we assume exact µ − τ (anti)symmetry in (M 2 ) M 0 then a generalized CP-invariance holds [14] and the CKM matrix comes out as real.…”

“…Thus the model that we consider is SO(10)⊗Z 2 µ−τ ⊗Z P 2 [14]. However it is to be mentioned that if we assume exact µ − τ (anti)symmetry in (M 2 ) M 0 then a generalized CP-invariance holds [14] and the CKM matrix comes out as real. This can be rectified either by assuming some of the vevs to be complex or by allowing a small explicit breaking of µ − τ symmetry in M 0 .…”

“…The 126 H relates the Majorana mass of the neutrinos to the Dirac mass as well as other charged fermion masses making the model predictive. It is also possible and in some cases advantageous to include all the three Higgs representations [13,14]. The model with 10 H + 120 H [15,16], on the other hand, does not have the requisite scalars to lead to neutrino masses through the seesaw mechanism.…”

“…Small deviation from these exact values may be generated by breaking the µ − τ symmetry by a small amount. Combining µ − τ flavour symmetry with GUTs has been considered in the case of SU (5) in [26] and also for SO(10) [14]. Here we impose µ − τ symmetry on the Yukawa matrix for the 10 H and 16 H whereas the one for 120 H is taken to be antisymmetric.…”

“…We also impose a parity symmetry leading to Hermitian Yukawa matrices. Thus we consider the model SO(10) ⊗ Z (µ−τ ) 2 ⊗ Z P 2 [14]. Imposition of these two symmetries help in reducing the number of unknown parameters in the Yukawa sector.…”

An SO(10) model with adjoint fermions for double seesaw neutrino masses

A renormalizable supersymmetric SO(10) model with natural doublet-triplet splitting

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