Properties of the Higgs Boson, and its interpretation in Supersymmetry U. Ellwanger, LPT Orsay The quartic Higgs self coupling and Supersymmetry The Next-to-Minimal Supersymmetric Standard Model Higgs signal rates in H γγ, H ZZ/WW, H bb channels Additional Higgs bosons?
The quartic Higgs coupling In the Standard Model, the mexican hat potential of the Higgs field V (H) = m 2 H 2 + λ 2 H 4 allows to express the physical mass M h of the Higgs boson in terms of the known Higgs vacuum expectation value v (given by the Z/W masses) and λ: M 2 h = 2λ2 v 2 Larger M h corresponds to larger λ If we would have known the coupling λ, we could have predicted the Higgs mass M h
Supersymmetry one of the possible solutions of the hierarchy problem contains automatically a candidate for dark matter leads automatically to a grand unification of the gauge couplings Up to now: No sign of Susy partners ( sparticles ) of the standard particles: M u squark, M d squark, M gluino > 1 TeV But: No sign of alternative solutions of the hierarchy problem (compositeness extra excited states; large extra dimensions Kaluza-Klein states...) The Higgs sector in Supersymmetry: At least two Higgs doublets; the quartic Higgs self couplings are related by Supersymmetry to the electroweak gauge couplings, and to Higgshiggsino Yukawa couplings (if they exist)
MSSM: Two SU(2) doublets H u and H d, but no Higgs-higgsino Yukawa coupling; the quartic Higgs self couplings are given by the electroweak gauge couplings upper tree level bound on the lighter Higgs mass M h M Z But: Supersymmetry has to be (softly) broken by scalar mass terms/ trilinear scalar interactions/gaugino mass terms of O ( M Susy ) Radiative corrections involving scales Q < M Susy modify the quartic Higgs self couplings Dominant contributions from top quark/stop 1 /stop 2 mass splittings (with the largest couplings to the Higgs bosons) M h 125 GeV is possible, but only if M Susy is large enough (in agreement with constraints from direct searches) But: rad. corrs. M Susy to the mass terms in the Higgs potential! v M Susy becomes unnatural, little fine tuning problem
The µ problem The Higgs fields H u and H d have fermionic superpartners, the charged and neutral higgsinos ψ u and ψ d Not observed at LEP a mass term µψ u ψ d must be present µ appears also in the Higgs potential µ should be of O(M weak...m Susy ) But: µ is not a soft Susy breaking term; how can it accidentically be of O(M weak...m Susy )???
The NMSSM How to generate fermionic mass terms? introduce a Yukawa coupling to a scalar (here: a gauge singlet S) λsψ u ψ d S has automatically a vev v s of O(M Susy ) generates a higgsino mass term µ eff = λv s of the desired order Additional benefit: An extra quartic coupling λ 2 H 2 u H2 d due to SUSY Larger mass M h > M Z at tree level! M h 125 GeV does not require large (unnatural) radiative corrections!
Now: Three physical scalars, superpositions of H u, H d and S with vevs v u, v d, v s where v 2 u + v2 d = v2 SM, but v u/v d tan β and v s unknown Their masses have to be obtained by diagonalising a 3 3 mass matrix, typically: a mostly SM like eigenstate h SM, a mostly singlet like eigenstate h s, a heavy Higgs H (as in the MSSM) The tree level mass of the mostly SM like h SM is M 2 h SM = M 2 Z cos2 2β + λ 2 (v 2 u + v2 d )sin2 2β ± (... ) ± (... ): From mixing of the mostly SM like scalar h SM with the mostly singlet like scalar h s (dep. on unknown parameters); positive if M hs < M hsm!
The measured Higgs signal rate in H γγ ATLAS (in Higgs production via Vector Boson Fusion, VBF): VBF 0 Local p 2 VBF Observed p 0 VBF Expected p 0 H γγ -1-2 -3 1-4 ATLAS Preliminary Data 2012, s = 8 TeV 1 115 120 125 130 135 140 145 150 Data 2011, Ldt = 20.7 fb s = 7 TeV Ldt = 4.8 fb -1-1 m H [GeV] 1σ 2σ 3σ After combining with Higgs production in gluon fusion: R γγ measured signal rate Standard Model signal rate = 1.65 ± 0.32
CMS H γγ (HIG-13-001-PAS, comb. VBF+ggF) Confirmation of the enhanced γγ rate in the cutbased analysis (r.h.s.), but not in the MVA analysis (l.h.s.)
The diphoton signal rate in the NMSSM 1) Recall: BR(H γγ) = Γ(H γγ) Γ(H bb) +... (Γ(H bb) gives 58% of the total width for a 125 GeV SM Higgs) Due to the mixing of H u, H d, S it is easily possible that, in the NMSSM, the mostly SM like h SM has a reduced coupling to bb, and hence a reduced width Γ(h SM bb) an enhanced BR(h SM γγ) nearly SM like couplings to the top quark (whose loops induce the coupling to gluons) and to the electroweak gauge bosons the production rates in gluon fusion and/or VBF are hardly reduced The diphoton signal rate is enhanced (U.E. 20)
2) Recall: In the SM, Γ(H γγ) is induced via W-boson (and top quark) loops: Photon XX Higgs h SM W boson t quark Photon In the NMSSM, the singlet S couples to the (charged) higgsinos ψ Hu, ψ Hd : λsψ Hu ψ Hd (recall the generation of the µ term through v s ) If h SM has a S-component, charged higgsinos contribute to the loop and to Γ(h SM γγ) unless λ is small or the higgsinos are heavy
h SM signal rates in other channels (with G. Bélanger, B. Dumont, J. Gunion, S. Kraml) R V V (gg): ZZ/WW signal rate in gluon fusion (relative to the SM) Combining ATLAS + CMS: R V V (gg) 0.91 ± 0.16 R bb (V H): bb signal rate in associate production with a V = Z or W boson Combining ATLAS, CMS, Tevatron: R2 bb (V H) 1.13 ± 0.43 Examples in the parameter space of the NMSSM with universal squark/slepton masses and gaugino masses at the GUT scale (Supergravity motivated sources of Susy breaking, with C. Hugonie) Imposing M hsm 125 GeV, good dark matter relic density The mostly SM like h SM is the next-to-lightest H 2 The mostly singlet like h s is the lightest H 1 (satisfying constraints from LEP, see later) Studies of R γγ 2 (gg), RV V 2 (gg), Rbb 2 (V H) :
R2 V V (gg) RZZ 2 R2 WW against R γγ 2 (gg): 2 1.5 R 2 VV (gg) 1 0.5 1 1.5 2 2.5 3 γγ R 2 (gg) R γγ 2 (gg) can be enhanced by a factor 2 (or larger); both mechanisms 1) and 2) contribute! If R γγ 2 (gg) < 2: R2 V V (gg) RZZ 2 R2 WW is not necessarily enhanced
(V H) against Rγγ 2 (gg): In conflict with the SM-like signal rate h SM bb? R2 bb 1.1 1 0.9 0.8 0.7 R 2 bb (VH) 0.6 0.5 0.4 0.3 0.2 0.1 0 1 1.5 2 2.5 3 γγ R 2 (gg) If R γγ 2 (gg) < 1.5: R2 bb (V H) is not necessarily reduced, the enhancement of Rγγ 2 (gg) results from the additional higgsino loop, not from a reduction of Γ(h SM bb)
If h SM mixes strongly with another mostly singlet-like scalar: The mass of this mostly singlet-like h s should be not too far from M hsm 125 GeV Are there hints for (at least weak bounds on) such a state? Unfortunately: The couplings/signal rates of h s are typically reduced relative to the ones of h SM, but it can still be visible in SM Higgs search channels
If this state has a mass below 114 GeV: Study the bounds on the signal rate ξ 2 in Z Z + h SM at LEP: If ξ 2 (h S ) 0.2: Compatible with the weak bounds ( 2σ excess) around 95 GeV 95% CL limit on ξ 2 1-1 (a) LEP s = 91-2 GeV Observed Expected for background -2 20 40 60 80 0 120 m H (GeV/c 2 ) Or: above 125 GeV? hints?
Recall: H γγ at CMS (1303.4571): Additional 2σ excess around M H 136 GeV (MVA analysis, l.h.s.) or: confirmation of the enhanced γγ rate of the 125 GeV Higgs in cutbased analysis, r.h.s.; still: 1σ excess around M H 136 GeV
Recall: H γγ at ATLAS (ATLAS-CONF-2013-012): VBF 0 Local p 2 VBF Observed p 0 VBF Expected p 0 H γγ -1-2 -3 1-4 ATLAS Preliminary Data 2012, s = 8 TeV 1 115 120 125 130 135 140 145 150 Data 2011, Ldt = 20.7 fb s = 7 TeV Ldt = 4.8 fb -1-1 m H [GeV] 1σ 2σ 3σ small additional excess around M H 137 GeV
Tevatron V H bb (1303.6346): (Fits to the measured signal rate relative to the SM) σ/sm 4 3.5 3 2.5 Tevatron Run II, L int fb -1 SM Higgs combination Observed σ ± 1 s.d. H x 1.5 (m H =125 GeV/c 2 ) σ ± 2 s.d. H x 1.0 (m H =125 GeV/c 2 ) 2 1.5 1 SM=1 0.5 0 0 120 140 160 180 200 m H (GeV/c 2 ) small additional excess around M H 140 GeV (low mass resolution)
CMS V H bb (HIG-12-044-PAS): small additional excess for M H > 130 GeV (low mass resolution)
(σ H x Br(H WW))/SM 9 8 7 6 5 4 3 2 1 Tevatron V H WW (1303.6346): Tevatron Run II, L int fb -1 SM H W + W - combination SM=1 Observed ± 1 s.d. ± 2 s.d. σ H x 1.5 (m H =125 GeV/c 2 ) σ H x 1.0 (m H =125 GeV/c 2 ) 0 0 1 120 130 140 150 160 170 180 190 200 m H (GeV/c 2 ) small additional excess around M H 140 GeV (low mass resolution)
ATLAS V H WW (ATLAS-CONF-2013-012): 0 Local p 3 2 1-1 -2 ATLAS Preliminary (*) H WW lνlν Obs. Exp. m H = 125 GeV -1 s = 7 TeV: Ldt = 4.6 fb -1 s = 8 TeV: Ldt = 20.7 fb ±1 σ ±2 σ 0σ 1σ 2σ -3 3σ -4-5 4σ -6 120 130 140 150 160 170 180 190 200 [GeV] m H small additional excess for M H > 135 GeV (low mass resolution)
But: only upper bounds < 0.2 SM on the signal rate of an additional 137 GeV Higgs boson in H ZZ, H ττ (ATLAS, CMS) Still: at least 6 ( 1 σ) excesses ( look elsewhere effect ) hinting for an additional 137 GeV Higgs Possibly the h s of the NMSSM! (G. Belanger, U.E., J.F. Gunion, Y. Jiang, S. Kraml, 1208.4952) Keep on looking!
What about the heavy state H (both in the MSSM and NMSSM)? Nearly degenerate with a CP-odd state A and a charged Higgs H ± Nearly decoupled from electroweak gauge bosons Z, W, but couples to top and bottom quarks Recall: m b = h b v d where v d is unknown in Susy If v d is small (tan β = v u vd large, possibly up to 60), h b is much larger than in the SM! The couplings of H, A and H ± to b quarks can be strongly enhanced Constraints from b physics (typically: M H ± M A > 300 GeV) Constraints from associate production of H, A with b quarks at the LHC (notably in the H/A ττ channel):
Constraints from CMS-PAS-HIG-12-050:
Note: m max h refers to a specific choice of stop masses in the MSSM From M 2 h SM = M 2 Z cos2 2β + λ 2 (v 2 u + v2 d )sin2 2β ±...: expect large tan β in the MSSM in order to maximise cos 2 2β (no λ 2 (v 2 u + v2 d )sin2 2β term!) expect small tan β 2 in the NMSSM in order to maximise sin 2 2β! No constraints on the NMSSM (at present...)
Conclusions Given M hsm 125 GeV, the NMSSM is the most natural SUSY extension of the SM: scale invariant SUSY interactions, no need for very large top/stop mass splittings in order to explain the SM like Higgs mass, but gauge coupling unification and a good dark matter candidate as in the MSSM Nearly SM like Higgs signal rates are part of the parameter space of all Susy extensions of the SM, but an enhanced γγ signal rate of h SM can be a hint for the NMSSM Additional below-the-sm signals in Higgs searches at low mass ( < 200 GeV) can be a hint for the NMSSM