English

Littlest Seesaw

High Energy Physics - Phenomenology 2016-03-23 v2

Abstract

We propose the Littlest Seesaw (LS) model consisting of just two right-handed neutrinos, where one of them, dominantly responsible for the atmospheric neutrino mass, has couplings to (νe,νμ,ντ)(\nu_e,\nu_{\mu},\nu_{\tau}) proportional to (0,1,1)(0,1,1), while the subdominant right-handed neutrino, mainly responsible for the solar neutrino mass, has couplings to (νe,νμ,ντ)(\nu_e,\nu_{\mu},\nu_{\tau}) proportional to (1,n,n2)(1,n,n-2). This constrained sequential dominance (CSD) model preserves the first column of the tri-bimaximal (TB) mixing matrix (TM1) and has a reactor angle θ13(n1)23m2m3\theta_{13} \sim (n-1) \frac{\sqrt{2}}{3} \frac{m_2}{m_3}. This is a generalisation of CSD (n=1n=1) which led to TB mixing and arises almost as easily if n1n\geq 1 is a real number. We derive exact analytic formulas for the neutrino masses, lepton mixing angles and CP phases in terms of the four input parameters and discuss exact sum rules. We show how CSD (n=3n=3) may arise from vacuum alignment due to residual symmetries of S4S_4. We propose a benchmark model based on S4×Z3×Z3S_4\times Z_3\times Z'_3, which fixes n=3n=3 and the leptogenesis phase η=2π/3\eta = 2\pi/3, leaving only two inputs mam_a and mb=meem_b=m_{ee} describing Δm312\Delta m^2_{31}, Δm212\Delta m^2_{21} and UPMNSU_{PMNS}. The LS model predicts a normal mass hierarchy with a massless neutrino m1=0m_1=0 and TM1 atmospheric sum rules. The benchmark LS model additionally predicts: solar angle θ12=34\theta_{12}=34^\circ, reactor angle θ13=8.7\theta_{13}=8.7^\circ, atmospheric angle θ23=46\theta_{23}=46^\circ, and Dirac phase δCP=87\delta_{CP}=-87^{\circ}.

Keywords

Cite

@article{arxiv.1512.07531,
  title  = {Littlest Seesaw},
  author = {Stephen F. King},
  journal= {arXiv preprint arXiv:1512.07531},
  year   = {2016}
}

Comments

35 pages, 2 figures, published in JHEP

R2 v1 2026-06-22T12:16:52.206Z