[PPT] - Models of Neutrino Masses in View of the Large 13 Discovery Mu-Chun PowerPoint Presentation

SLIDE 1

Models of Neutrino Masses in View of the Large θ13 Discovery

Mu-Chun Chen, University of California at Irvine

Flavor Physics and CP Violation (FPCP2013), Búzios, Brazil, May 19-24, 2013

SLIDE 2

Where Do We Stand?

Exciting Time in ν Physics: recent hints of large θ13 from T2K, MINOS, Double Chooz, Daya

Bay and RENO

Latest 3 neutrino global analysis (including recent results from reactor experiments):

2

Fogli, Lisi, Marrone, Montanino, Palazzo, Rotunno (2012)

P(νa νb) = ⇤ ⇤ νb|ν, t ⇥⇤ ⇤2 ⇥ sin2 2θ sin2 ⌅∆m2 4E L ⇧

Parameter Best fit 1σ range 2σ range 3σ range δm2/10−5 eV2 (NH or IH) 7.54 7.32 – 7.80 7.15 – 8.00 6.99 – 8.18 sin2 θ12/10−1 (NH or IH) 3.07 2.91 – 3.25 2.75 – 3.42 2.59 – 3.59 ∆m2/10−3 eV2 (NH) 2.43 2.33 – 2.49 2.27 – 2.55 2.19 – 2.62 ∆m2/10−3 eV2 (IH) 2.42 2.31 – 2.49 2.26 – 2.53 2.17 – 2.61 sin2 θ13/10−2 (NH) 2.41 2.16 – 2.66 1.93 – 2.90 1.69 – 3.13 sin2 θ13/10−2 (IH) 2.44 2.19 – 2.67 1.94 – 2.91 1.71 – 3.15 sin2 θ23/10−1 (NH) 3.86 3.65 – 4.10 3.48 – 4.48 3.31 – 6.37 sin2 θ23/10−1 (IH) 3.92 3.70 – 4.31 3.53 – 4.84 ⊕ 5.43 – 6.41 3.35 – 6.63 δ/π (NH) 1.08 0.77 – 1.36 — — δ/π (IH) 1.09 0.83 – 1.47 — —

SLIDE 3

Theoretical Challenges

(i) Absolute mass scale: Why mν << mu,d,e?

seesaw mechanism: most appealing scenario ⇒ Majorana
GUT scale (type-I, II) vs TeV scale (type-III, double seesaw)
TeV scale new physics (extra dimension, U(1)´) ⇒ Dirac or Majorana

(ii) Flavor Structure: Why neutrino mixing large while quark mixing small?

neutrino anarchy: no parametrically small number
near degenerate spectrum, large mixing
predictions strongly depend on choice of statistical measure
still alive and kicking
family symmetry: there’s a structure, expansion parameter (symmetry effect)
mixing result from dynamics of underlying symmetry
for leptons only (normal or inverted)
for quarks and leptons: quark-lepton connection ↔ GUT (normal)
Alternative?
In this talk: assume 3 generations, no LSND/MiniBoone/Reactor Anomaly

3

Hall, Murayama, Weiner (2000); de Gouvea, Murayama (2003) de Gouvea, Murayama (2012)

Planck 2013 Data Release: Neff = 3.26 ± 0.35 ⇒ sterile neutrino marginally consistent

SLIDE 4

Origin of Mass Hierarchy and Mixing

In the SM: 22 physical quantities which seem unrelated
Question arises whether these quantities can be related
No fundamental reason can be found in the framework of SM
less ambitious aim ⇒ reduce the # of parameters by imposing symmetries
SUSY Grand Unified Gauge Symmetry
GUT relates quarks and leptons: quarks & leptons in same GUT multiplets
one set of Yukawa coupling for a given GUT multiplet ⇒ intra-family relations
seesaw mechanism naturally implemented
Family Symmetry
relate Yukawa couplings of different families
inter-family relations ⇒ further reduce the number of parameters

4

eV keV MeV GeV TeV meV

t c u b s d µ ! e

"1 "2 "3 "2 "1 "1 "3 "2 "3 normal hierarchy inverted hierarchy nearly degenerate

Mass spectrum of elementary particles

LMA-MSW solution

⇒ Experimentally testable correlations among physical observables

SLIDE 5

Quarks vs Leptons, CKM vs PMNS

Quark mixings are small
Lepton mixings are large
How to realize this when quarks and leptons are unified??

5

0.12 - 0.17

SLIDE 6

Origin of Flavor Mixing and Mass Hierarchy

Several models have been constructed based on
GUT Symmetry [SU(5), SO(10)] ⊕ Family Symmetry GF
Family Symmetries GF based on continuous groups:
U(1)
SU(2)
SU(3)
Recently, models based on discrete family symmetry groups have been constructed
A4 (tetrahedron)
T´ (double tetrahedron)
S3 (equilateral triangle)
S4 (octahedron, cube)
A5 (icosahedron, dodecahedron)
∆27
Q4

6 u u u d d d e e e s s s t t t b b b ! ! !µ

µ µ

" " " µ µ µ ! ! !"

" "

c c c ! ! !e

e e

SU(2)F SU(10)

GUT Symmetry SU(5), SO(10), ... family symmetry (T′, SU(2), ...)

Motivation: Tri-bimaximal (TBM) neutrino mixing

Discrete gauge anomaly: Araki, Kobayashi, Kubo, Ramos-Sanchez, Ratz, Vaudrevange (2008)

Anomaly-free discrete R-symmetries: simultaneous solutions to mu problem and proton decay problem, naturally small Dirac neutrino mass, M.-C.C, M. Ratz, C. Staudt, P . Vaudrevange, (2012)

SLIDE 7

Tri-bimaximal Neutrino Mixing

Neutrino Oscillation Parameters
Latest Global Fit (3σ)
Tri-bimaximal Mixing Pattern
Leading Order: TBM (from symmetry) + holomorphic Corrections/contributions
Is TBM still a good starting point?

Harrison, Perkins, Scott (1999)

ts sin2 θatm, TBM = 1/2 an

ts sin2 θ⇥,TBM = 1/3

⇤ ⌥ d sin θ13,TBM = 0.

⇧ UMNS =

⇤

1 c23 s23 −s23 c23 ⇥ ⌅

⇤

c13 s13e−iδ 1 −s13eiδ c13 ⇥ ⌅

⇤

c12 s12 −s12 c12 1 ⇥ ⌅

P(νa νb) = ⇤ ⇤ νb|ν, t ⇥⇤ ⇤2 ⇥ sin2 2θ sin2 ⌅∆m2 4E L ⇧

7

Fogli, Lisi, Marrone, Montanino, Palazzo, Rotunno (2012)

sin2 θatm = 0.386 (0.331 − 0.637)

sin2 θ = 0.307 (0.259 − 0.359)

sin2 θ13 = 0.0241 (0.0169 − 0.0313)

SLIDE 8

Tri-bimaximal Neutrino Mixing

8

θ12 θ13 θ23 TBM prediction: arctan √ 0.5

≈ 35.3◦

45◦ Best fit values (±1σ):

33.6+1.1

−1.0

8.93+0.46

−0.48

38.4+1.4

−1.2

Fogli, Lisi, Marrone, Montanino, Palazzo, Rotunno, 2012

SLIDE 9

Non-Abelian Finite Family Symmetry A4

TBM mixing matrix: can be realized with finite group family

symmetry based on A4

A4: even permutations of 4 objects

S: (1234) → (4321) T: (1234) → (2314)

a group of order 12
Invariant group of tetrahedron

9

Ma, Rajasekaran (2001); Babu, Ma, Valle (2003); ...

SLIDE 10

Invariant Group of Tetrahedron T: (1234) → (2314) S: (1234) →(4321)

10

[Animation Credit: Michael Ratz]

SLIDE 11

Non-Abelian Finite Family Symmetry A4

TBM mixing matrix: can be realized with finite group family

symmetry based on A4

A4: even permutations of 4 objects

S: (1234) → (4321) T: (1234) → (2314)

a group of order 12
Invariant group of tetrahedron
Problem: A4 does not give rise to quark mixing

11

Ma, Rajasekaran (2001); Babu, Ma, Valle (2003); ...

SLIDE 12

GUT Compatibility ⇒ SU(5) x T´

Double Tetrahedral Group T´
Symmetries ⇒ 10 parameters in Yukawa sector ⇒ 22 physical observables
neutrino mixing angles from group theory (CG coefficients)
TBM: misalignment of symmetry breaking patterns
neutrino sector: T’ → GTST2 , charged lepton sector: T’ → GT
GUT symmetry ⇒ deviation from TBM related to quark mixing θc
complex CG’s of T´ ⇒ Novel Origin of CP Violation
CP violation in both quark and lepton sectors entirely from group theory
connection between leptogenesis and CPV in neutrino oscillation

12

M.-C.C, K.T. Mahanthappa

Phys. Lett. B652, 34 (2007);
Phys. Lett. B681, 444 (2009)

M.-C.C, K.T. Mahanthappa,

Phys. Lett. B681, 444 (2009)

SLIDE 13

Predictions: a SUSY SU(5) x T´ Model

Charged Fermion Sector: 7 parameters ⇒ 9 masses, 3 angles, 1 phase

Georgi-Jarlskog relations at GUT scale ⇒ Vd,L ≠ I

⇧e

12 ⇧

↵ me mµ ⇧ 1 3 ↵md ms ⇤ 1 3⇧c . the tri-bimaximal mixing pattern

⇧ ⌦ y θc ⇧ ⇤ ⇤⌦ md/ms eiα⌦ mu/mc ⇤ ⇤ ⇤ ⌦ md/ms, wh ling constants. Even though is of the size of the

13

M.-C.C, K.T. Mahanthappa

Phys. Lett. B652, 34 (2007);
Phys. Lett. B681, 444 (2009)

spinorial representations in charged fermion sector ⇒ complex CGs ⇒ CPV in quark and lepton sectors

ly, md ⌃ 3me, y, mµ ⌃ 3ms is

SU(5) ⇒ Md = (Me)T ⇒ corrections to TBM related to θc

quark CP phase: γ = 45.6 degrees

SLIDE 14

Predictions: a SUSY SU(5) x T´ Model

Neutrino Sector:

(2+1 parameters)

Prediction for MNS matrix: (for )
sum rule among absolute masses:

tan2 θ⇤ ⌃ tan2 θ⇤,T BM + 1 2θc cos δ

neutrino mixing angle

1/2

quark mixing angle complex CGs: leptonic Dirac CPV

⌅13 ⌅ ⌅c/3 ⇧ 2

CGs of SU(5) & T´

⇒ connection between leptogenesis & leptonic CPV at low energy

14

normal hierarchy predicted

M.-C.C, K.T. Mahanthappa

Phys. Lett. B652, 34 (2007);
Phys. Lett. B681, 444 (2009)

 ✓ ◆ MD = @ 2ξ0 + η0 −ξ0 −ξ0 + η00 −ξ0 2ξ0 + η00 −ξ0 + η0 −ξ0 + η00 −ξ0 + η0 2ξ0 1 A ζ0ζ0

0vu

MRR = @ 1 1 1 1 A s0Λ

η00

0 = 0

> 0

SLIDE 15

Numerical Results: Neutrino Sector

For :
Neutrino Masses:
Leptonic CP violation from CG coefficients:

⇧ |UMNS| =   0.838 0.542 0.0583 0.362 0.610 0.705 0.408 0.577 0.707  

prediction for Dirac CP phase: δ = 197 degrees (in standard parametrization) 3 independent parameters in neutrino sector predicted 3 masses and 3 angles: all agree with exp within 1σ

15

DD 0.824259 0.542816 0.161084 0.264063 0.609846 0.747234 0.500867 0.577441 0.644743 * Abs Abs@Vmns DD sin2 θ12 = 0.30 sin2 θ23 = 0.43 sin2 θ13 = 0.026

m1 = 0.0036 eV m2 = 0.0093 eV m3 = 0.051 eV

Two Majorana CPV measures:

S1 ⌘ Im

UMNS, e1U ⇤

MNS, e3

= 0.034

S2 ⌘ Im

UMNS, e2U ⇤

MNS, e3

= 0.029

η00

0 6= 0

ξ0 = 0.051, η0 = 0.23, η00

0 = 0.055

SLIDE 16

Sum Rules: Quark-Lepton Complementarity

QLC-I
QLC-II
testing these sum rules could be a more robust way to distinguish different models

mixing parameters

best fit 3σ range θq

23

2.36o 2.25o - 2.48o θq

12

12.88o 12.75o - 13.01o θq

13

0.21o 0.17o - 0.25o

mixing parameters

best fit 3σ range θe

23

38.4o 35.1o - 52.6o θe

12

33.6o 30.6o - 36.8o θe

13

8.9o 7.5o - 10.2o

Quark Mixing Lepton Mixing

θc + θsol ≅ 45o tan2θsol ≅ tan2θsol,TBM + (θc / 2) * cos δe θq23 + θe23 ≅ 45o

Raidal, ‘04; Smirnov, Minakata, ‘04 Ferrandis, Pakvasa; King; Dutta, Mimura; M.-C.C., Mahanthappa

θe13 ≅ θc / 3√2

(BM) (TBM)

16

measuring leptonic mixing parameters to the precision of those in quark sector

need improved δθ12 measurement

SLIDE 17

Sum Rules: Quark-Lepton Complementarity

QLC-I
QLC-II
testing these sum rules could be a more robust way to distinguish different models

mixing parameters

best fit 3σ range θq

23

2.36o 2.25o - 2.48o θq

12

12.88o 12.75o - 13.01o θq

13

0.21o 0.17o - 0.25o

mixing parameters

best fit 3σ range θe

23

38.4o 35.1o - 52.6o θe

12

33.6o 30.6o - 36.8o θe

13

8.9o 7.5o - 10.2o

Quark Mixing Lepton Mixing

θc + θsol ≅ 45o tan2θsol ≅ tan2θsol,TBM + (θc / 2) * cos δe θq23 + θe23 ≅ 45o

Raidal, ‘04; Smirnov, Minakata, ‘04 Ferrandis, Pakvasa; King; Dutta, Mimura; M.-C.C., Mahanthappa

θe13 ≅ θc / 3√2

(BM) (TBM)

17

measuring leptonic mixing parameters to the precision of those in quark sector

need improved δθ12 measurement

☜ Too small

SLIDE 18

Correlations among other Observables

SUSY GUTs: Lepton flavor violating charged lepton decays
five viable SUSY SO(10) models with dark matter constraints:

18

individual branching

fraction: strong dependence on soft SUSY parameters

correlations between

branching fractions: strong dependence on flavor structure

C.H. Albright, M.-C.C (2008)

SLIDE 19

“Large” Deviations from TBM in A4

Generically: corrections on the order of (θc)2
from charged lepton sector:
through GUT relations
from neutrino sector:
higher order holomorphic contributions in superpotential
Modifying the Neutrino sector: Different symmetry breaking patterns
TBM: misalignment of
A4 → GTST2 and A4 → GT
A4: group of order 12 ⇒ many subgroups
systematic study of breaking into other A4 subgroups: no viable solutions were found
complete breaking of A4 required to generate realistic masses and sizable θ13

19

M.-C.C, J. Huang, J. O’Bryan, A. Wijangco, F. Yu, (2012)

SLIDE 20

“Large” Deviations from TBM in A4

Subgroup preserving VEVs:

20

normal inverted

M.-C.C, J. Huang, J. O’Bryan, A. Wijangco, F. Yu, (2012)

SLIDE 21

“Large” Deviations from TBM in A4

Orthogonal VEV patterns:

21

inverted normal

M.-C.C, J. Huang, J. O’Bryan, A. Wijangco, F. Yu, (2012)

SLIDE 22

“Large” Deviations from TBM in A4

Predictions for Dirac CP phase

22

normal

M.-C.C, J. Huang, J. O’Bryan, A. Wijangco, F. Yu, (2012)

SLIDE 23

Flavor Model Structure: A4 Example

interplay between the symmetry breaking patterns

in two sectors lead to lepton mixing (BM, TBM, ...)

symmetry breaking achieved through flavon VEVs
each sector preserves different residual symmetry
full Lagrangian does not have these residual

symmetries

general approach: include high order terms in

holomorphic superpotential

possible to construct models where higher order

holomorphic superpotential terms vanish to ALL

rders
useful tool: Hilbert basis method
quantum correction?

⇒ uncertainty in predictions due to Kähler corrections

23

GF Ge Gν

charged lepton sector e.g. Z2 subgroup of A4 neutrino sector e.g. Z3 subgroup of A4 〈Φe〉〈Φν〉

〈 Φe〉∝ (1,0,0) 〈 Φν〉∝ (1,1,1)

e.g. A4

Leurer, Nir, Seiberg (1993); Dudas, Pokorski, Savoy (1995); Dreiner, Thomeier (2003);

Kappl, Ratz, Staudt (2011)

SLIDE 24

Kähler Corrections

Superpotential: holomorphic
Kähler potential: non-holomorphic
Canonical Kähler potential
Correction

24

can be induced by flavon VEVs
important for order parameter ~ θc
can lead to non-trivial mixing

Kcanonical ⊃

Lf† δfg Lg +
Rf† δfg Rg

∆K =

Lf† (∆KL)fg Lg +
Rf† (∆KR)fg Rg

K = Kcanonical + ∆K ,

Wleading = 1 Λ(Φe)gf Lg Rf Hd + 1 Λ Λν (Φν)gf Lg Hu Lf Hu

Weff = (Ye)gf Lg Rf Hd + 1 4κgf Lg Hu Lf Hu

M.-C.C., M. Fallbacher, M. Ratz, C. Staudt (2012)

rder parameter

<flavon vev> / Λ ~ θc

SLIDE 25

Kähler Corrections

Consider infinitesimal change, x :
rotate to canonically normalized L’:

⇒ corrections to neutrino mass matrix

25

K = Kcanonical + ∆K = L† (1 − 2x P) L

e κ · v2

u = 2mν with

L → L′ = (1 − x P) L .

Wν = 1 2(L · Hu)T κν(L · Hu) ' 1 2[(1 + xP)L0 · Hu]T κν[(1 + xP)L0 · Hu] ' 1 2(L0 · Hu)T κνL0 · Hu + x(L0 · Hu)T (P T κν + κνP)L0 · Hu

M.-C.C., M. Fallbacher, M. Ratz, C. Staudt (2012)

SLIDE 26

Kähler Corrections

Consider infinitesimal change, x :
rotate to canonically normalized L’:

⇒ corrections to neutrino mass matrix ⇒ differential equation

same structure as the RG evolutions for neutrino mass operator
analytic understanding of evolution of mixing parameters
size of Kähler corrections can be substantially larger (no loop suppression)

26

S. Antusch, J. Kersten, M. Lindner, M. Ratz (2003)

K = Kcanonical + ∆K = L† (1 − 2x P) L

L → L′ = (1 − x P) L .

mν(x) ≃ mν + x P T mν + x mν P .

dmν dx = P T mν + mν P

M.-C.C., M. Fallbacher, M. Ratz, C. Staudt (2012)

SLIDE 27

Back to A4 Example

Kähler corrections due to flavon field:
quadratic in flavon
such terms cannot be forbidden by any (conventional) symmetry
Kähler corrections once flavon fields attain VEVs
additional parameters diminish predictivity of the scheme
possible to forbid all contributions from RH sector as well as

with additional symmetries in the particular A4 model considered

27

(LΦν)†(LΦν)

r (LΦe)†(LΦe)

and

(LΦν)†(LΦe),

M.-C.C., M. Fallbacher, M. Ratz, C. Staudt (2012)

SLIDE 28

Contributions from Flavon VEVs (1,0,0) and (1,1,1)
five independent “basis” matrices
RG correction: essentially along PIII = diag(0,0,1) direction due to yτ dominance
Kähler corrections can be along different directions than RG

28

PI =   1   ,  

  PII =   1   ,     PIII =   1    

  PIV =   1 1 1 1 1 1   ,  

  PV =   i −i −i i i −i  

Back to A4 Example

M.-C.C., M. Fallbacher, M. Ratz, C. Staudt (2012)

SLIDE 29

Enhanced θ13

consider change due to correction along PV direction
Kähler metric:
Contributions of flavon VEV:
Corrections to the leading order TBM prediction ( )
Complex matrix P ⇒ CP violation induced
for the example considered:

29

rm KL = 1 − 2xP, w

〈Φ〉= (1, 1, 1) υ

ere me π mµ π mτ has to the complex P m

I Due to th

δ ¥ π/2.

with

∆θ13

≃

κV · v2 Λ2 · 3 √ 6 m1 m1 + m3

PV =

  i −i −i i i −i  

M.-C.C., M. Fallbacher, M. Ratz, C. Staudt (2012)

SLIDE 30

An Example: Enhanced θ13

30

0.00 0.02 0.04 0.06 0.08 0.10 2 4 6 8

m1 [eV] ∆θ13 [◦] ∆θ13 an. ∆θ13 num.

κV v2/Λ2 = (0.2)2

M.-C.C., M. Fallbacher, M. Ratz, C. Staudt (2012)

SLIDE 31

Corresponding Change in θ12

31

0.00 0.02 0.04 0.06 0.08 0.10 0.0 0.1 0.2 0.3 0.4

m1 [eV] ∆θ12 [◦]

κV v2/Λ2 = (0.2)2

M.-C.C., M. Fallbacher, M. Ratz, C. Staudt (2012)

SLIDE 32

Corresponding Change in θ23

32

0.00 0.02 0.04 0.06 0.08 0.0 0.1 0.2 0.3 0.4 0.00 0.02 0.04 0.06 0.08 0.10 2.6 2.4 2.2 2.0 1.8 1.6 1.4

m1 [eV] ∆θ23 [◦]

κV v2/Λ2 = (0.2)2

M.-C.C., M. Fallbacher, M. Ratz, C. Staudt (2012)

SLIDE 33

Summary

Fundamental Origin of fermion mass hierarchy and flavor mixing still not known
neutrino masses: evidence of physics beyond the SM
SUSY SU(5) x T′ as a family symmetry
near tri-bimaximal leptonic mixing & realistic CKM matrix
complex CG coefficients in T′: origin of CPV both in quark and lepton sectors
10 model parameters accommodate observed 22 masses, mixing angles and CP phases

for all quarks and leptons

Testable predictions:
interesting leading order sum rules between quark and lepton mixing angles
lepton flavor violating charged lepton decays and correlations among these processes
Possible connection to space-time geometry?
theoretical understanding of Kähler corrections crucial for achieving precision

compatible with experimental accuracy

33

SLIDE 34

Back-up Slides

34

SLIDE 35

Where Do We Stand?

Latest 3 neutrino global analysis include atm, solar, reactor experiments (3σ):
search for absolute mass scale:
end point kinematic of tritium beta decays
WMAP + 2dFRGS + Lyα ∑(mνi) < (0.7-1.2) eV
neutrinoless double beta decay

35

m" e < 2.2 eV (95% CL) Mainz m" µ <170 keV m"# <15.5 MeV

Tritium → He3 + e− + νe KATRIN: increase sensitivity ~ 0.2 eV

current bound: | < m > | < (0.19 − 0.68) eV (CUORICINO, Feb 2008)

(Global Minima) Discovery phase into precision phase for some oscillation parameters Many great discoveries yet to come

P(νa νb) = ⇤ ⇤ νb|ν, t ⇥⇤ ⇤2 ⇥ sin2 2θ sin2 ⌅∆m2 4E L ⇧

current bound: | ⌅m⇧ | ⇥

X

i=1,2,3

miU 2

ie

sin2 θatm = 0.386 (0.331 − 0.637)

sin2 θ = 0.307 (0.259 − 0.359) sin2 θ13 = 0.0241 (0.0169 − 0.0313)

Fogli, Lisi, Marrone, Montanino, Palazzo, Rotunno (2012)

(0.14-0.38) eV (EXO, 2012)

SLIDE 36

Where Do We Stand?

Search for absolute mass scale:
end point kinematic of tritium beta decays
WMAP + 2dFRGS + Lyα ∑(mνi) < (0.36-1.5) eV
very model dependent
neutrinoless double beta decay
uncertainty in nuclear matrix element
Effective number of neutrinos:
WMAP7 + BAO: Neff = 4.34 +0.86-0.88
BBN: Ns < 1.2

36

m" e < 2.2 eV (95% CL) Mainz m" µ <170 keV m"# <15.5 MeV

Tritium → He3 + e− + νe KATRIN: increase sensitivity ~ 0.2 eV

current bound: | < m > | < (0.19 − 0.68) eV (CUORICINO, Feb 2008)

current bound: | ⌅m⇧ | ⇥

X

i=1,2,3

miU 2

ie

Mangano, Serpico, arXiv:1103.1261

Gonzalez-Garcia et al, arXiv:1006.3795 Komatsu et al, arXiv:1001.4538

Planck update

SLIDE 37

Tri-bimaximal Neutrino Mixing from A4

fermion charge assignments:
SM Higgs ~ singlet under A4
operators for neutrino masses:
two scalar (flavon) fields for neutrino sector:
product rules:

37

⇤ ⇧ 1 2 3 ⌅ ⌃

L

⌅ 3, eR ⌅ 1, µR ⌅ 1, ⇧R ⌅ 1

HHLL M ⌃⌅⌥ Λ + ⌃⇥⌥ Λ ⇥ T ⇥ → GT ST 2 :

duct rules:
ξ

⇥ = ξ0Λ ⇧ ⌥ 1 1 1 ⌃ ⌦ ⌦ ⌦

⇧

T ⇥ − invariant:

⌅ ∼ 3, ⇥ ∼ 1

η
= uΛ

L =

A4 A4

3 ⊗ 3 = 1 ⊕ 1′ ⊕ 1′′ ⊕ 3s ⊕ 3a ,

Altarelli, Feruglio (2005)

SLIDE 38

Tri-bimaximal Neutrino Mixing from A4

Neutrino Masses: triplet flavon contribution
Neutrino Masses: singlet flavon contribution
resulting mass matrix:

38

3S = 1 3   2α1β1 − α2β3 − α3β2 2α3β3 − α1β2 − α2β1 2α2β2 − α1β3 − α3β1   1 = α1β1 + α2β3 + α3β2 1 = α1β1 + α2β3 + α3β2

Mν = λv2 Mx      2ξ0 + u −ξ0 −ξ0 −ξ0 2ξ0 u − ξ0 −ξ0 u − ξ0 2ξ0     

V T

ν MνVν = diag(u + 3ξ0, u, −u + 3ξ0) v2 u

Mx , UTBM =

⇧

⇧ ⇧ ⇤ ⌥ 2/3 1/ √ 3 − ⌥ 1/6 1/ √ 3 −1/ √ 2 − ⌥ 1/6 1/ √ 3 1/ √ 2 ⇥ ⌃ ⌃ ⌃ ⌅

Form diagonalizable:

- no adjustable parameters
- neutrino mixing from CG coefficients!

Altarelli, Feruglio (2005)

SLIDE 39

Tri-bimaximal Neutrino Mixing from A4

charged lepton sector -- without quarks
operators for charged lepton masses
scalar sector: flavon triplet for charged lepton masses
resulting charged lepton mass matrix = diagonal
leptonic mixing matrix = tri-bimaximal
seesaw realization with three RH neutrinos (N1, N2, N3) ~ 3

39

(⌃)1eR(1) + (⌃)1µR(1) + (⌃)1⇧R(1)

 1 = α1β1 + α2β3 + α3β2 1 = α3β3 + α1β2 + α2β1 1 = α2β2 + α1β3 + α3β1

T ⇥ → GT :

⇒

φ
= φ0Λ

     1     

VMNS = V †

e,LVν = I · UT BM = UT BM

A4

Altarelli, Feruglio (2005)

SLIDE 40

The Model

Symmetry: SUSY SU(5) x T′
Particle Content
additional symmetry:
predictive model: only 11 operators allowed up to at least dim-7
vacuum misalignment: neutrino sector vs charged fermion sector
mass hierarchy: lighter generation masses allowed only at higher dim
forbids Higgsino mediated proton decay

40

tional Z12 ×Z

12 sym

a 10(Q, uc, ec)L anda 5(dc, ◆)L parameter ⌃ = eiπ/6.

T3 Ta F N H5 H0

5

∆45 φ φ0 ψ ψ0 ζ ζ0 ξ η η00 S SU(5) 10 10 5 1 5 5 45 1 1 1 1 1 1 1 1 1 1 T 0 1 2 3 3 1 1 10 3 3 20 2 100 10 3 1 100 1 Z12 ω5 ω2 ω5 ω7 ω2 ω2 ω5 ω3 ω2 ω6 ω9 ω9 ω3 ω10 ω10 ω10 ω10 Z0

12

ω ω4 ω8 ω5 ω10 ω10 ω3 ω3 ω6 ω7 ω8 ω2 ω11 1 1 1 ω2

SLIDE 41

Neutrino Sector

Operators:
symmetry breaking
resulting mass matrices

T ⇥ → GT ST 2 :

= ⇧ ⌥ 1 1 1 ⌃ 0Λ ⇧ ⌃ T ⇥ − invariant:

⇤η⌅ = η0Λ

MRR = @ 1 1 1 1 A s0Λ

nly vector representations

⇒ all CG are real

41

⇧S⌃ = S0

 Wν = λ1NNS + 1 Λ3  H5FNζζ0 ✓ λ2ξ + λ3η + λ4η00 ◆

 ✓ ◆ MD = @ 2ξ0 + η0 −ξ0 −ξ0 + η00 −ξ0 2ξ0 + η00 −ξ0 + η0 −ξ0 + η00 −ξ0 + η0 2ξ0 1 A ζ0ζ0

0vu

hη00i = η00

0Λ

: diagonalized by TBM; ⇒ deviation from TBM η00

0 = 0

η00

0 6= 0

Mν = MDM 1

RRM T D

Mν

[Note: m2 → (1,1,1) unchanged]

SLIDE 42

Up Quark Sector

Operators:
top mass: allowed by T′
lighter family acquire masses thru operators with higher dimensionality
dynamical origin of mass hierarchy
symmetry breaking:
Mass matrix:
WT T

= ytH5T3T3 + 1 Λ2 H5  ytsT3Taψζ + ycTaTbφ2

+ 1

Λ3 yuH5TaTbφ⇥3 

no contributions to

elements involving 1st family; true to all levels

both vector and spinorial reps involved ⇒ complex CG

T → GT

⌥

⌥
⌦ =

⇧ ⌥ 1 ⌃ ⌦0Λ , ↵ = 1 ⇥ ↵0Λ ,

⇥

dim-6

T ⇥ → GT ST 2 :

φ⇥

= φ

0Λ

⇧ ⌥ 1 1 1 ⌃ ⌦ ⌦ ⌦

⌃

dim-7

Mu = ⌅

⌃

iφ⇥3

1i 2 φ⇥3 1i 2 φ⇥3

φ⇥3

0 + (1 i 2)φ2

y⇥ψ0ζ0 y⇥ψ0ζ0 1 ⇧ ⌥ ytvu ,

42

SLIDE 43

Down Quark & Charged Lepton Sectors

operators:
generation of b-quark mass: breaking of T′ : dynamical origin for hierarchy between

mb and mt

lighter family acquire masses thru operators with higher dimensionality
symmetry breaking:
mass matrix:
consider 2nd, 3rd families only: TBM exact
Georgi-Jarlskog relations:

T ⇥ → GT :

⌥

⌥
⌦ =

⇧ ⌥ 1 ⌃ ⌦0Λ , ↵ = 1 ⇥ ↵0Λ ,

⇥

T ⇥ → nothing:

⌥

ψ⇥

= ψ

0Λ

⇧ ⌥ 1 1 ⌃

⇥
⇥

complex CG

ly, md ⌃ 3me, y, mµ ⌃ 3ms is

corrections to TBM

43



WT F

= 1 Λ2 ybH⇥

5FT3φζ + 1

Λ3  ys∆45FTaφψζ⇥ + ydH50FTaφ2ψ⇥



✓ ◆

  Md =   (1 + i)⌅0⇧⇥ −(1 − i)⌅0⇧⇥ ⇧0⇥ ⌅0⇧⇥ ⌅0⇧⇥   ydvd⌅0  

  Me =   −(1 − i)⌅0⇧⇥ ⌅0⇧⇥ (1 + i)⌅0⇧⇥ −3⇧0⇥ ⌅0⇧⇥   ydvd⌅0

T ⇥ ⌅ GS :

⇧⌅⌃ = ⌅0 , ⇧⌅⇥⌃ = ⌅⇥

ybvd⌦0 ybvd⌦0

⇧⌅⇥⌃ = ⌅⇥

0Λ

SLIDE 44

Model Predictions

Charged Fermion Sector (7 parameters)
model parameters:

Vcb Vub

Georgi-Jarlskog relations ⇒ Vd,L ≠ I SU(5) ⇒ Md = (Me)T ⇒ corrections to TBM related to θc ⇧e

12 ⇧

↵ me mµ ⇧ 1 3 ↵md ms ⇤ 1 3⇧c . the tri-bimaximal mixing pattern

⇧ ⌦ y θc ⇧ ⇤ ⇤⌦ md/ms eiα⌦ mu/mc ⇤ ⇤ ⇤ ⌦ md/ms, wh ling constants. Even though is of the size of the

44

ybvd⌦0

b ⇤ φ0ψ⇥

0/ζ0 = 0.00304

c ⇤ ψ0ζ⇥

0/ζ0 = 0.0172

k ⇤ y⇥ψ0ζ0 = 0.0266 h ⇤ φ2

0 = 0.00426

g ⇤ φ⇥3

0 = 1.45 ⇥ 105

7 parameters in charged fermion sector

n yt/ sin β = 1.25 ≃ ybφ0ζ0/ cos β ≃ 0.011, tan β = 10

SLIDE 45

Numerical Results

Experimentally:
CKM Matrix and Quark CPV measures:

c c

mu : mc : mt = θ7.5

c

: θ3.7

c

: 1 . md : ms : mb = θ4.6

c

: θ2.7

c

: 1 ,

|VCKM| = ⇤ ⇧ 0.974 0.227 0.00412 0.227 0.973 0.0412 0.00718 0.0408 0.999 ⌅ ⌃

β ≡ arg −VcdV ⇥

cb

VtdV ⇥

tb

⇥ = 23.6o, sin 2β = 0.734 ,

α ⌅ arg VtdV ∗

tb

VudV ∗

ub

⇥ = 110o , γ ⌅ arg VudV ∗

ub

VcdV ∗

cb

⇥ = δq = 45.6o , J ⌅ Im(VudVcbV ∗

ubV ∗ cs) = 2.69 ⇤ 10−5 ,

= 0 798

⌅ A = 0.798 ρ = 0.299 η = 0.306

45

CPV entirely from CG coefficients

Direct measurements @ 3σ (CKMFitter, ICHEP2012)

predicting: 9 masses, 3 mixing angles, 1 CP Phase; all agree with exp within 3σ

Recent LHCb result on gamma angle:

New results push the combined best- fit value to a lower value of rB.

value for gamma going down!

sin 2β = 0.691+0.060

0.047

γ (degree) = 66+36

30

α (degree) = 89+21

13

SLIDE 46

Model Predictions

Neutrino Sector (3 parameters)
with

Georgi-Jarlskog relations ⇒ Vd,L ≠ I SU(5) ⇒ Md = (Me)T ⇒ corrections to TBM related to θc

UMNS = V †

e,LUTBM =

⇤

1 −θc/3 ∗ θc/3 1 ∗ ∗ ∗ 1 ⇥ ⌅

⇤

⇧ 2/3 1/ √ 3 − ⇧ 1/6 1/ √ 3 −1/ √ 2 − ⇧ 1/6 1/ √ 3 1/ √ 2 ⇥ ⌅ (1)

tan2 θ⇤ ⌃ tan2 θ⇤,T BM + 1 2θc cos δ

neutrino mixing angle

1/2

quark mixing angle CG: leptonic Dirac CPV

⌅13 ⌅ ⌅c/3 ⇧ 2

CGs of SU(5) & T´

46

⇧ ⌦ y θc ⇧ ⇤ ⇤⌦ md/ms eiα⌦ mu/mc ⇤ ⇤ ⇤ ⌦ md/ms, wh ling constants. Even though is of the size of the

⇧e

12 ⇧

↵ me mµ ⇧ 1 3 ↵md ms ⇤ 1 3⇧c . the tri-bimaximal mixing pattern

η00

0 = 0 ξ0 = 0.0791 , η0 = 0.1707 , s0Λ = 1012 GeV |m1| = 0.00134 eV, |m2| = 0.00882 eV, |m3| = 0.0504 eV

S0

SLIDE 47

Model Predictions

Neutrino Sector (3 parameters)
with
sum rules that exist in case are modified

UMNS = V †

e,LUTBM =

⇤

1 −θc/3 ∗ θc/3 1 ∗ ∗ ∗ 1 ⇥ ⌅

⇤

⇧ 2/3 1/ √ 3 − ⇧ 1/6 1/ √ 3 −1/ √ 2 − ⇧ 1/6 1/ √ 3 1/ √ 2 ⇥ ⌅ (1)

47

η00

0 6= 0

Uν

new contribution does not change the eigenvector corresponds to m2 η00

0 = 0

S0 = 1012 GeV

ξ0 = 0.051, η0 = 0.23, η00

0 = 0.055

< D

MatrixForm=

0.808875

0.57735

0.111303

0.308046 -0.57735 -0.756158
0.500829 -0.57735

0.644854 0, << D DD.vecnu 0.539098 DD Abs @Vmns DD

sin θ

MNS

13

' θc 3 p 2 + θν

13 + κθc

3

: contributions from η00

0 6= 0

+ θν

13 ,

+ κ + κ0

,

+ κ

: related to deviation of θ23 from π/4

tan2 θ ' 1 2 + ✓1 2 + κ0 ◆ θc cos δ

SLIDE 48

Numerical Results: Neutrino Sector

Diagonalization matrix for charged leptons:
MNS Matrix
Neutrino Masses:
Leptonic CP violation from CG coefficients:

⇧ |UMNS| =   0.838 0.542 0.0583 0.362 0.610 0.705 0.408 0.577 0.707  

prediction for Dirac CP phase: δ = 197 degrees (in standard parametrization) 3 independent parameters in neutrino sector predicted 3 masses and 3 angles: all agree with exp within 1σ

48

  0.997ei177o 0.0823ei131o 1.31 ⇤ 10−5e−i45o 0.0823ei41.8o 0.997ei176o 0.000149e−i3.58o 1.14 ⇤ 10−6 0.000149 1   DD 0.824259 0.542816 0.161084 0.264063 0.609846 0.747234 0.500867 0.577441 0.644743 * Abs Abs@Vmns DD

sin2 θ12 = 0.30 sin2 θ23 = 0.43 sin2 θ13 = 0.026

m1 = 0.0036 eV m2 = 0.0093 eV m3 = 0.051 eV

Two Majorana CPV measures:

S1 ⌘ Im

UMNS, e1U ⇤

MNS, e3

= 0.034

S2 ⌘ Im

UMNS, e2U ⇤

MNS, e3

= 0.029

SLIDE 49

“Large” Deviations from TBM in A4

Consider VEV patterns for triplet flavon in neutrino sector
to satisfy all constraints on two squared masses and mixing angles

⇒additional non-trivial singlets (1’, 1’’) contributions in RH neutrino sector

49

M.-C.C, J. Huang, J. O’Bryan, A. Wijangco, F. Yu, (2012)

SLIDE 50

Back to A4 Example

Kähler corrections due to flavon field:
linear in flavon:
possible to forbid these terms with additional symmetries

50

∆Klinear =

i ∈{a,s}
κ(i)

Φν

Λ ∆K(i)

L† (L⊗Φν)3i + κ(i) Φe

Λ ∆K(i)

L† (L⊗Φe)3i

+ κξ

Λ ∆KξL†L+h.c.

M.-C.C., M. Fallbacher, M. Ratz, C. Staudt (2012)

SLIDE 51

Back to A4 Example

Kähler corrections due to flavon field 𝜓 :
six possible contractions:

51

∆K ⊃

6

X

i=1

κ(i) ∆K(i)

(Lχ)†

X(Lχ)X + h.c.

∆K(1)

(Lχ)†

1(Lχ)1

= (L†

1 χ† 1 + L† 2 χ† 3 + L† 3 χ† 2)(L1 χ1 + L2 χ3 + L3 χ2) ,

(3.4a) ∆K(2)

(Lχ)†

10(Lχ)10

= (L†

3 χ† 3 + L† 1 χ† 2 + L† 2 χ† 1)(L3 χ3 + L1 χ2 + L2 χ1) ,

(3.4b) ∆K(3)

(Lχ)†

100(Lχ)100

= (L†

2 χ† 2 + L† 1 χ† 3 + L† 3 χ† 1)(L2 χ2 + L1 χ3 + L3 χ1) ,

(3.4c ∆K(4)

(Lχ)†

31(Lχ)31

= (L†

1 χ† 1 + ω2 L† 2 χ† 3 + ω L† 3 χ† 2)(L1 χ1 + ω L2 χ3 + ω2 L3 χ2)

+ (L†

3 χ† 3 + ω2 L† 1 χ† 2 + ω L† 2 χ† 1)(L3 χ3 + ω L1 χ2 + ω2 L2 χ1)

+ (L†

2 χ† 2 + ω2 L† 1 χ† 3 + ω L† 3 χ† 1)(L2 χ2 + ω L1 χ3 + ω2 L3 χ1)(3.4d)

∆K(5)

(Lχ)†

32(Lχ)32

= (L†

1 χ† 1 + ω L† 2 χ† 3 + ω2 L† 3 χ† 2)(L1 χ1 + ω2 L2 χ3 + ω L3 χ2)

+ (L†

3 χ† 3 + ω L† 1 χ† 2 + ω2 L† 2 χ† 1)(L3 χ3 + ω2 L1 χ2 + ω L2 χ1)

+ (L†

2 χ† 2 + ω L† 1 χ† 3 + ω2 L† 3 χ† 1)(L2 χ2 + ω2 L1 χ3 + ω L3 χ1)(3.4e

∆K(6)

(Lχ)†

31(Lχ)32

= (L†

1 χ† 1 + ω2 L† 2 χ† 3 + ω L† 3 χ† 2)(L1 χ1 + ω2 L2 χ3 + ω L3 χ2)

+ (L†

3 χ† 3 + ω2 L† 1 χ† 2 + ω L† 2 χ† 1)(L3 χ3 + ω2 L1 χ2 + ω L2 χ1)

+ (L†

2 χ† 2 + ω2 L† 1 χ† 3 + ω L† 3 χ† 1)(L2 χ2 + ω2 L1 χ3 + ω L3 χ1)

M.-C.C., M. Fallbacher, M. Ratz, C. Staudt (2012)