http://arxiv.org/abs/2105.14292
We propose an $A_4$ modular invariant flavor model of leptons, in which both CP and modular symmetries are broken spontaneously by the vacuum expectation value of the modulus $\tau$. The value of the modulus $\tau$ is restricted by the observed lepton mixing angles and lepton masses for the normal hierarchy of neutrino masses at $3\,\sigma$ confidence level. The predictive Dirac CP phase $\delta_{CP}$ is in the ranges $[0^\circ,50^\circ]$, $[170^\circ,175^\circ]$ and $[280^\circ,360^\circ]$ for ${\rm Re}\,[\tau]<0$, and $[0^\circ,80^\circ]$, $[185^\circ,190^\circ]$ and $[310^\circ,360^\circ]$ for ${\rm Re}\,[\tau]>0$ at $3\,\sigma$ confidence level. The sum of three neutrino masses is predicted in $[60,\,84]$ meV, and the effective mass for the $0\nu\beta\beta$ decay is in [0.003, 3] meV. On the other hand, there is no allowed region of the modulus $\tau$ for the inverted hierarchy of neutrino masses at $3\,\sigma$ confidence level. The modulus $\tau$ links the Dirac CP phase to the cosmological baryon asymmetry (BAU) via the leptogenesis. Due to the strong wash-out effect, the predictive baryon asymmetry $Y_B$ can be at most the same order of the observed value. Then, the lightest right-handed neutrino mass is restricted in the range of $M_1 =[1.5,\,6.5] \times 10^{13}$ GeV. We find the correlation between the predictive $Y_B$ and the Dirac CP phase $\delta_{CP}$. Only two predictive $\delta_{CP}$ ranges, $[0^\circ,80^\circ]$ (${\rm Re}\,[\tau]>0$) and $[280^\circ,360^\circ]$ (${\rm Re}\,[\tau]<0$) are consistent with the BAU.
H. Okada, Y. Shimizu, M. Tanimoto, et. al.
Tue, 1 Jun 21
13/72
Comments: 30 pages, 14 figures, 7 tables