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This is the formulation of the Standard Model as a gauge theory with the gauge
group SU(3)×SU(2)×U(1) or with a couple of fermion fields and a Higgs field, which
is a and/or a . SU(3) describes Quantum
chromodynamics, SU(2) describes the weak interaction* and U(1) describes hypercharge.
*Technically speaking, the Z boson is described by a field which is really a linear combination of SU(2) and U(1). See electroweak.
There are three families of fermions, each consisting of the representations, (q for left-handed quark), (dc for the left-handed anti
d-quark), (uc for the left handed up antiquark),
(l for the left handed leptons), (1,1)1(ec for the left-handed
positron) and (1,1)0(νc for
the left-handed antineutrino, which is now known to exist. See Neutrino oscillation.).
The Higgs field acquires a VEV, resulting in a spontaneous symmetry breaking from or to U(1)em.
Of course, calling the representations things like is purely a physicist's convention, not a
mathematician's convention, where representations are either labelled by Young tableaux or Dynkin diagrams with numbers on
their vertices, but still, it is standard among high energy physicists.
Since the homotopy group
-
this model predicts no monopoles associated with the electroweak breaking
scale. See Hooft-Polyakov monopole.
The Yukawa
couplings of the scalar Higgs fields with the fermions produces the fermion
masses after the Higgs field acquires a VEV.
See also Grand unified theory.
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