Standard Model of Particle Physics SS 2012

Lecture: Standard Model of Particle Physics Heidelberg SS 22 Fermi Theory Standard Model of Particle Physics SS 22

2 Standard Model of Particle Physics SS 22

Fermi Theory Unified description of all kind of Beta Decays? nuclear decays muon and pion decay decay of strange hadrons and heavy quarks Description of weak scattering processes? at low energy processes at high energy 3 Standard Model of Particle Physics SS 22

Weak Force Decay of strange particles Nuclear beta decay 4 Standard Model of Particle Physics SS 22

Recap I Lagrangian (independent of energy) G L= ( f Γ f ' ) ( f ' ' Γ f ' ' ' ) 2 most general ansatz for operator Γ: Vector Current: scalar coupling: ψ λ=ψ j V = Axial-vector Current: pseudoscalar coupling: 5 j A = 5 γ ψ λ=ψ Tensor Coupling σ μaν = ψ ( γμ γ ν γ ν γμ ) ψ 5 Standard Model of Particle Physics SS 22

Recap II Vector Current conservation μ μ μ (no helicity flip) u γ u = u L γ u L + u R γ u R Scalar Coupling u u = u R u L + u L u R (helicity flip!) 6 Standard Model of Particle Physics SS 22

Recap II Vector Current conservation μ μ μ (no helicity flip) u γ u = u L γ u L + u R γ u R Scalar Coupling u u = u R u L + u L u R (helicity flip!) What is the difference between helicity and chirality? 7 Standard Model of Particle Physics SS 22

Recap II Vector Current conservation μ μ μ (no helicity flip) u γ u = u L γ u L + u R γ u R Scalar Coupling u u = u R u L + u L u R (helicity flip!) What is the difference between helicity and chirality? What is the difference between helicity and polarisation? 8 Standard Model of Particle Physics SS 22

Recap II Vector Current conservation μ μ μ (no helicity flip) u γ u = u L γ u L + u R γ u R Scalar Coupling u u = u R u L + u L u R (helicity flip!) What is the difference between helicity and chirality? What is the difference between helicity and polarisation? What is the difference between helicity flip and spin flip? 9 Standard Model of Particle Physics SS 22

Recap III Energy dependence electromagnetic interaction: s Standard Model of Particle Physics SS 22

3-Body Decay e.g.: n p e ν p e electron energy: E(e) neutrino energy: E(ν) ν Fermi's Golden rule: 2 dn π dn ( p) dp = 2 f H i ℏ de with: 2 2 H fi = f H i =const 2 dn V 2 2 = p dp p dp ν ν e e Phase space: de 4 4 de 4π ℏ Beta Spectrum: 2 2 2 dn (η) d η = H fi η (ϵ ϵ) d η with: η = pe / m e ϵ = E e / me Standard Model of Particle Physics SS 22

Kurie-Plot (Fermi diagram) dn ( η) 2 2 H fi η = ϵ ϵ Beta decay of 6He 6Li e- ν Note that the neutrino mass was set to zero here! linear function! matrix element independent of energy! 2 Standard Model of Particle Physics SS 22

Mass and Resolution Effects finite neutrino mass limited energy resolution: 3 Standard Model of Particle Physics SS 22

Neutrino-Mass Measurement 4 Standard Model of Particle Physics SS 22

Katrin Experiment Measure Beta-Spectrum in the tritium decay current limit: mν< ev expected limit: mν<~.-.3 ev 5 Standard Model of Particle Physics SS 22

Lifetime in Beta Decay Transition probability depends only on available decay energy E from beta Spectrum: 2 2 2 dn (η) d η = H fi η (ϵ ϵ) d η with η ϵ Decay width 5 ϵ M 5 Lifetime depends on the fifth power of the particle mass (muon decay) Q value (nuclear decay Q ~ Ee + Eν) 6 Standard Model of Particle Physics SS 22

Weak Force Lifetimes in weak decays of order - seconds years Interaction length: Nuclear interaction (Fe): λstrong ~ O() cm Weak interaction (Fe): >> 3 km (neutrino energy dependent) Discovery of muon neutrino (Lederman et al.): only tiny fraction of neutrinos is detected The weak force is really weak! 7 Standard Model of Particle Physics SS 22

Weak scattering processes A constant matrix element (Fermi theory) give an energy dependent cross section of weak scattering processes Reason: phase space! e νe νμ μ σ (νμ e μ ν e ) G 2F s neutrino-electron scattering d u νμ μ σ ( νμ d μ u) G 2F s neutrino-nucleon scattering 8 Standard Model of Particle Physics SS 22

Weak scattering processes I Kinematics: Fixed Target: s=2 E ν M target Scattering cross section should rise linearly with neutrino beam energy linear rise cross section (Fermi theory) beam energy 9 Standard Model of Particle Physics SS 22

Weak scattering processes II Center of mass energies limited in Fixed Target Experiments Trick: invert reaction at colliders: ν e d e u e+ d ν e u Kinematics: target Fixed Target: s=2 E ν Collider: s=4 E e E p coll M target (HERA: electron-proton) from comparison: E target ν 2 E coll e Ep 5 TeV M target 2 Standard Model of Particle Physics SS 22

Electron-Proton Collider HERA Ee = 26.7 GeV Ep= 92 GeV 2 Standard Model of Particle Physics SS 22

Lorentz Invariant Kinematics of Deep Inelastic Scattering Process The virtuality of the exchanged photon is given by: p' θ Q 2 = q 2 = ( p p ') 2 p positron 4 sin / 2 q Relative energy loss (inelasticity): y = ν E Elektron neutrino qp = pp W-boson xp P proton relative fraction of parton momentum: q2 Q2 x = = 2q P sy with cms energy: s = 2pP 22 Standard Model of Particle Physics SS 22

Charged Current Event at H neutrino hadronic jet proton (92 GeV) positron (26.7 GeV) neutrino + e d ν e u 23 Standard Model of Particle Physics SS 22

Weak scattering processes III HERA beam energy translated into Fixed target linear rise cross section (Fermi theory) H expected from W-propagator GF g 2 2 M W +Q 2 beam energy Breakdown of Fermi theory at high energies s/2 ~ GeV 24 Standard Model of Particle Physics SS 22

Lorentz Structure of Weak Process? Lagrangian (independent of energy) G L= ( f Γ f ' ) ( f ' ' Γ f ' ' ' ) 2 most general ansatz for operator Γ: Vector Current: j V = scalar coupling: ψ λ=ψ (Fermi s proposal): Axial-vector Current: pseudoscalar coupling: 5 j A = 5 γ ψ λ=ψ Tensor Coupling σ μaν = ψ ( γμ γ ν γ ν γμ ) ψ 25 Standard Model of Particle Physics SS 22

Test of Lorentz Structure? Different transitions in weak decays: n p e ν Fermi transition Gamov Teller transition +/2 p spin +/2 n e ν no spin flip (ΔJ=) electron and neutrino in singlet state 26 -/2 p { spin +/2 n + { + + e ν spin flip (ΔJ=,) electron and neutrino in triplet state Standard Model of Particle Physics SS 22

Test of Lorentz Structure? Different transitions in weak decays: n p e ν Fermi transition Gamov Teller transition +/2 p spin +/2 n e ν no spin flip (ΔJ=) electron and neutrino in singlet state Note: -/2 p { spin +/2 n + { + + e ν spin flip (ΔJ=,) electron and neutrino in triplet state spin flip helicity flip 27 Standard Model of Particle Physics SS 22

Test of Lorentz Structure? Fermi transition Gamov Teller transition vector Momentum coupling axialvector Momentum coupling? + Spin helicity * n scalar Momentum coupling - e- ν- - n p - - + e- ν- p tensor Momentum coupling + * * n? Spin helicity helicity - + p + Spin + Spin helicity - - e- ν- * n 28 - p - - e- ν- Standard Model of Particle Physics SS 22

Test of Lorentz Structure? Fermi transition Gamov Teller transition vector Momentum coupling axialvector Momentum coupling? + Spin helicity * n - p + Spin helicity - + e- ν- * n - p - + e- ν- Both, Fermi transitions and Gamov Teller transitions observed in weak interactions Vector and axialvector currents conserve helicities! 29 Standard Model of Particle Physics SS 22

Test of Lorentz Structure? Scalar and tensor (pseudoscalar) couplings flip helicity! Have to measure spin-orientation of decay leptons! scalar Momentum coupling? + Spin helicity tensor Momentum coupling * - n p + Spin helicity - - e- ν- * n 3 - p - - e- ν- Standard Model of Particle Physics SS 22

The End 3 Standard Model of Particle Physics SS 22

Gamma Matrices II = = i 2 i = i i 5 = 3 = (in other representations g5 is diagonal ) 32 Standard Model of Particle Physics SS 22

Spinors of Helicity States u R = p, = / 2 u L = p, = / 2 v L = p, = / 2 v R = p, = / 2 fermions: (u) (u2) (v) (v2) u R = E m p E m u L = E m p E m ur vl anti-fermions: p v R = E +m E +m p E +m v L = E +m ( ) limit p ( ) 33 ul vr Standard Model of Particle Physics SS 22

Chirality Operator limit m ur ~ v L ~ operator: 5 = i 2 3 = right chirality left chirality 5 ur = u R 5 v L = v L ul ~ vr ~ 5 u L = u L 5 v R = v R = eigenvalues ± left-handed (chiral) particles: - right-handed (chiral) particles: + note: a right-handed chiral anti-particle has a left-handed helicity 34 Standard Model of Particle Physics SS 22

Projection Operator definition: ± 5 = 2 in the limit of E infinity fermions + anti-fermions Π ur = ur ul = u L ul = ur = v L = vl vr = vr vr = vl = projection: =R =L (right-handed (chiral) state) (left-handed (chiral) state) reformulate Dirac Equation: i R =m L i L =m R note: massive fermions must have left-handed and right handed components 35 Standard Model of Particle Physics SS 22

Vector and Axial Currents Vector Current: j V = R R, L L in QED: j V = (conservation of currents) Axial-vector Current: 5 j A = note: 5 = 5 Left (right)-handed Current: j L = j R = relations: j L = / 2 j V j A weak interaction (V-A theory): j R = / 2 j V j A 36 Standard Model of Particle Physics SS 22

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