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Particle Physics. 5 th Handout. Electroweak Theory Divergences: cancellation requires introduce W, introduce Z, introduce Higgs Gauge theories: gauge symmetries bosons, introduction of W+Z; Problems with massive W+Zs the Higgs. http://ppewww.ph.gla.ac.uk/~parkes/teaching/PP/PP.html.
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Particle Physics 5th Handout • Electroweak Theory • Divergences: cancellation requires introduce W, introduce Z, introduce Higgs • Gauge theories: gauge symmetriesbosons, introduction of W+Z; Problems with massive W+Zs the Higgs. http://ppewww.ph.gla.ac.uk/~parkes/teaching/PP/PP.html Chris Parkes
Emag, weak, strong, gravity Distinct characteristics (conservation rules of interaction, coupling strength..) Different aspects of single universal interaction at v. high energy ? Symmetry broken at low mass or energy scales e.g. Electricty & Magnetism Single theory, electromagnetic field One arbitrary constant, c Unification Grand Unification ? (See Feynman Lect. Vol.2 13-8) e- e- S p e- p S` e- Force from B-field Force from E field
Electroweak • Electromagnetic and Weak • Different aspects of single electroweak interaction • Same coupling e • Low energy broken symmetry • Massless , massive W+,W-,Z
Divergences See Perkins, Intro to HEP, 3rd edition chapter 9 • Predicted amplitudes for physical processes finite at all energies, orders of coupling constants • QED arbitrary parameters h,e,m(electron) • Fermi Weak Theory • point-like contact interaction • Elastic Scattering process • Scattered intensity cannot exceed incident intensity • Unitarity limit • Cross-section exceeds wave theory limit • xsec grows as s, • i.e. at some point more particles out than you put in !
Divergences – Add W • Introduce W boson • Propagator – ‘spread’ interaction over finite range • For q2 large, tends to • Cancels s dependence • i.e. well behaved at high energy • BUT diverergences appear in other processes • Need to systematically cancel them W Propagator term W- Coupling strength, propagator
Divergences – Add Z • Divergences with QED diagrams as well as W • Adding Neutral currents solves divergences • Diagrams contribute • to amplitude • Total xsec well behaved
Divergence in Electroweak 1) Electroweak - Cancel all divergences • well behaved theory • Photon and weak couplings related – unification • Same intrinsic coupling strength 2) Works exactly if electron mass=0 • For finite electron mass need to add Higgs boson also (numerical factors neglected)
Unification Conditions (gZ depends on particles at vertex, discuss form later) Predicts mass MW At low energy W interaction strength given by GF Fermi constant
Higher Orders Z W H q t q q Z/W Z/W W W b • Measure neutrino – nucleon scattering • NUTEV expt sin2θW=0.22770.0013(stat)0.0009(syst) MW =78.10.2 GeV/c2 using unification formula BUT measurements (LEP,TeVatron) giveMW =80.390.03 GeV/c2 Why ? Higher order diagrams e.g. Hence, MW sensitive to mass top quark, mass Higgs boson
In Q.M. connection between Global transformations and conserved quantities, e.g. • Translational Invariance Linear momentum conservation • Rotational InvarianceAngular momentum conservation • Translations in timeEnergy conservation Noether’s theorem – Symmetries (invariances) naturally lead to conserved quantities Emmy Noether Gauge Transformations Schrodinger or Dirac eqn of form: So, ψ’ still satisfies eqn of motion no change in observables Physics invariant under Global transformation of this form(known as U(1))
Local Gauge Transform - QED • Now consider local transformation • Add Electromagnetism • Can now be made invariant ! • i.e. invariance under U(1) local transformation electromagnetic field • (Conserved quantity is electric charge) • Interpretation: • Change of phase change in E,p • Exactly compensated by changes in emag. Field • Emag field carries changes away • Virtual photons • To cancel over all space-time range must be • so, photon massless • Phase θ different at every point is space-time • Ψ’ no longer a solution of eqn of motion for free particle
Local Gauge Transform - QCD • This time use colour state of quark • 3 component vector Λin r,g,b, space • Symmetry group is SU(3) • λ are matrices which transform the colour state • 8 basis states • i.e. SU(3) gauge symmetry 8 massless, coloured gluons
Weak Interactions • So QED local gauge QCD • What about weak ? • Need nature of particle also to change • Transform • Symmetry group SU(2) • Λ is a 2 component vector • Τ are the matrix states
Weak Transform Generators of SU(2) T are Pauli matrices: 3 basis states W+,W-,W0 Arrange particles in pairs in generations: Left-handed doublet Right-handed singlet Weak force acts on LH Caveat: RH neutrinos? Weak Isospin space – up and down components e.g.
Electroweak Transform • Combined Electroweak • Symmetry SU(2)xU(1) • Triplet (W,W0) and singlet (B0) of massless ( range) fields • Predicts W+,W-, neutral currents, photon • Explains Fermi theory, cancels divergences • Two problems remain: • W0 same form and strength as W • But not true experimentally • W+,W-,W0 all predicted massless • But heavy, W ~ 80 GeV/c2 , Z ~91 GeV/c2 And gZ depends on particles at vertex
Problem 1: neutral bosons • Clearly ,Z0 related to W0,B0 but how ? • Mixtures • W - weak force • couples left-handed particle states discussed earlier • Z – mixture weak & electromagnetic • Emag part couples to electric charge of particle • Same for LH,RH parts • Weak part couples to weak isospin • i.e. only to RH part of particle • e.g. ν – only weak component of coupling e- - weak part & emag part for charge 1 u - weak part & emag part for charge 2/3 Mixtures give rise to unification condition relate ,W,Z couplings and explain gZ variation with particle type
Problem 2: Masses for W & Z • Gauge invariance leads to zero masses • Need to cancel at infinite range • QED – massless • QCD – massless g • BUT not for (Electro)Weak • Overcome by introducing Higgs Field • Mechanism to: • give particles masses • make theory gauge invariant Higgs boson is the quanta of the Higgs field. Only particle in SM not discovered
Higgs Mechanism http://hepwww.ph.qmw.ac.uk/epp/higgs.html • Cocktail party • People at party ! • Higgs field is NOT empty • An ex-PM arrives • People cluster around her • She acquires mass from the Higgs field • Rumour passes through room • Cluster of people • Excitation of Higgs field – Higgs boson
Higgs Field • Introduce doublet of scalar fields • Vacuum state • Not zero • Emag bowl shaped • Vacuum field 0 • Higgs field, “Mexican Hat”-like • Vacuum expectation value of field, v • Ground state is degenerate • Spontaneous symmetry breaking Redefine all fields wrt physical vacuum Potential Energy not symmetric about this point Symmetry between W and B fields is broken
Higgs Mechanism Predictions • 1) W and Z acquire masses • Masses from interaction of gauge fields with non-zero vac. expectation value, v, of Higgs Field • 2) Neutral spin-zero Higgs bosons H • Quanta of Higgs field from gauge invariance • 3) Particle masses • Particles travel through Higgs field and acquire masses • Fermions/bosons also interact with Higgs boson • Coupling proportional to particle mass H f f Standard Model does not predict Higgs mass, W/Z mass, fermion masses
Electroweak Summary • Electroweak theory provides well-behaved theory without divergences • Gauge invariance leads to introduction of weak force • Higgs Mechanism leads to particle masses • Tests of Theory: • Find Neutral Currents • Discover W,Z bosons • Measure W,Z couplings and masses • Find Higgs Boson ?
