Higgs inflation in minimal supersymmetric SU(5) GUT

1. Higgs inflation in minimal supersymmetric SU(5) GUT Nobuchika Okada University of Alabama, Tuscaloosa, AL In collaboration withMasato Arai & Shinsuke Kawai arXiv:1107.4767, to be published in Phys. Rev. D. Related work in collaboration withMansoor Ur Rehman & Qaisar Shafi Miami 2011 @ Fort Lauderdale, Dec. 15-20, 2011

2. The Standard Big-Bang Cosmology The success of the Standard Big-Bang Cosmology Hubble expansion Hubble’s law: expansion of the Universe Cosmic Microwave Background (CMB) 2.725K radiation, Planck distribution Big-Bang nucleosynthesis Success in synthesizing light nuclei in the early Universe

3. General theory of relativity Homogeneous & isotropic universe  Friedmann-Robertson-Walker metric (k=0) Einstein equations: Perfect fluid: Expansion law: Continuity equation: w=1/3 : radiation w=0 : matter

4. Brief thermal history of the Universe T Big-bang Hot & dense thermal state all particles are in thermal equilibrium Radiation dominated era decoupling of some particles (example: Dark Matter) ~1 MeV (10^10 K) w=1/3 Big-bang nucleosynthesis Equal epoch (radiation density = matter density) ~1 eV Matter dominated era ~ 0.1 eV Recombination  origin of CMB ~0.0001 eV Present w=0

5. Problems of Big-Bang Cosmology Big-Bang Cosmology: Decelerating expansion w=1/3 : radiation w=0 : matter Flatness problem Fine-tuning of density parameter is necessary Horizon problem Observed CMB is isotropic nevertheless two regions have never contacted with each other Origin of density fluctuation need the seed of density fluctuation for the large scale structure formation of the Universe

6. Basic Idea of Inflationary Universe Suppose the existence of a stage in the early universe with Accelerating Expansion ``Inflation’’ Simple example: de Sitter space Positive cosmological constant (vacuum energy) Expansion law: Continuity equation:

7. Exponential expansion (Inflation) solves flatness problem  spatial curvature flattened horizon problem  small causal region expanded Simple model of inflation  scalar field called ``inflaton’’ Quantum fluctuation of inflaton  origin of primordial density fluctuation

8. Simple inflation model The picture we seek…. Inflation before Big-Bang  Big-bang cosmology Slow-roll inflation A scalar field (inflaton) slowly-rolling down to its potential minimum Slow-roll 1. Inflation at slow-roll era 2. End of Inflation 3. Coherent oscillations 4. Decays to Standard Model particles 5. Reheating  Big-Bang Cosmology End of inflation Oscillations & decay

9. Primordial density fluctuation Slow-roll During inlaftion era, quantum fluctuation of inflaton is enlarged by inflation End of inflation Oscillations & decay Inflaton fluctuation  curvature fluctuation  structure formation, CMB anisotropy Inflaton fluctuation  inflaton potential, initial condition CMB anisotropy  precision measurement by observation

10. CMB Observations: Wilkinson Microwave Anisotropy Probe (WMAP) The observational cosmology is now a precision science

11. Inflationary Predictions VS. WMAP inflationary scenario Slow-roll parameters These are very small during inflation End of inflation  Number of e-foldings N > 50-60 is necessary to solve horizon & flatness problem

12. Inflationary Predictions VS. WMAP (cont’d) Conditions to fix parameters in inflation model Power spectrum WMAP 7yr e-foldings = 50 -60 By these conditions, the slow-roll parameters are fixed Spectral index: Predictions Tensor-to-scalar ratio:

13. Example models We calculate the slow-roll parameters for each model and find predictions Model 1: Model 2: N=60 Model 2 WMAP 7yr contours Model 1

14. Inflation models with non-minimal gravitational coupling It is generally possible to add the non-minimal gravitational coupling to Einstein-Hilbert action Let us consider the model 2 with the non-minimal coupling In Jordan frame In Einstein frame

15. In Einstein frame for a large inflaton VEV =const V

16. Predictions of non-minimal phi^4 model N. O.,Rehman & Shafi Phys. Rev. D 82, 043502 (2010)

17. N. O.,Rehman & Shafi Phys. Rev. D 82, 043502 (2010) Minimal model

18. Higgs Inflation Bezrukov & Shaposhnikov, PLB 659 (2008) 703; JHEP 07 (2009) 089 Replace phi H Analysis beyond tree-level (RGE improved effective potential) De Simone, Hertzberg & Wilczek, PLB 678 (2009)1 Barvinsky et al., JCAP 0912 (2009) 003

19. Realization of the non-minimal inflation model in supersymmetric model The Standard Model of elementary particle physics The best theory we know so far in describing elementary particle physics @ E=O(100 GeV) Quarks & leptons Gauge interactions QCD, weak, E&M Higgs  masses of particles

20. However, Experimental results which cannot be explained by the SM ex) neutrino masses & mixings non-baryonic dark matter,… Theoretical problems ex) The gauge hierarchy problem (stability of EW scale) Origin of electroweak symmetry breaking Fermion mass hierarchy, etc. We need to extend the SM, New Physics beyond the SM E ~ 1 TeV or higher

21. New Physics beyond the Standard Model takes place at high energies Remember: inflation occurs at very high energies We need to consider inflation scenario in the context of physics beyond the Standard Model Supersymmetric theory is one of the promising candidate of new physics beyond the Standard Model  Inflation model in the context of SUSY (Supergravity)

22. Minimal Supersymmetric Standard Model (MSSM) SUSY version of SM quark, lepton (1/2) squark, slepton (0) gauge boson (1) gaugino (1/2) Higgs (0) Higgsino (1/2) Superpartners SM particles SUSY Grand Unification is strongly supported by measurement of Standard Model gauge couplings Gauge coupling unification @

23. The Minimal SUSY SU(5) GUT Particle contents Standard Gauge Interactions are unified into SU(5) GUT gauge interaction All quarks & leptons in the MSSM are unified into 5*+10 Higgs fields in the MSSM are included New Higgs field to break SU(5) to the SM

24. Arai, Kawai & N.O., To appear in PRD Higgs inflation in the minimal SUSY SU(5) GUT Supergravity Lagrangian in superconformal framework Compensating multiplet: Minimal SUSY SU(5) model (Higgs sector)

25. We are interested in a special direction of the scalar potential SU(5) SM

26. Normalized by reduced Planck scale S is almost constant

28. Phi^4 inflation model with non-minimal coupling! * This structure has been first pointed out by Ferrara, Kallosh, Linde, Marrani & Van Proeyen (PRD 82 (2010) 045003, PRD 83 (2011) 025008) in the context of Next-to-MSSM

29. We also examined quantum corrections, but their effects are found to be negligible Predictions

30. Summary We study the inflationary scenario in the context of the minimal SUSY SU(5) GUT We have found that the inflation model with non-minimal gravitational coupling is naturally implemented in the minimal SUSYT SU(5) GUT with an appropriate Kahler potential The predicted cosmological parameters are consistent (almost best fit) with WMAP 7yr data In the near future, on-going Planck satellite experiment will provide us more precise data which can discriminate different inflation models

31. Extension to other GUT models is possible which includes SU(5) as a subgroup (Example) SO(10) model In the near future, on-going Planck satellite experiment will provide us more precise data which can discriminate different inflation models

32. Planck satellite experiment is on-going and plans to release the data in 2013 ? ? ?

33. Thank you very much for your attention!