Some definitions Every field theory of
particle physics is based on certain symmetries of nature whose existence is deduced from observations. These can be •
local symmetries, which are the symmetries that act independently at each point in
spacetime. Each such symmetry is the basis of a
gauge theory and requires the introduction of its own
gauge bosons. •
global symmetries, which are symmetries whose operations must be simultaneously applied to all points of spacetime. QCD is a non-abelian gauge theory (or
Yang–Mills theory) of the
SU(3) gauge group obtained by taking the
color charge to define a local symmetry. Since the strong interaction does not discriminate between different flavors of quark, QCD has approximate
flavor symmetry, which is broken by the differing masses of the quarks. There are additional global symmetries whose definitions require the notion of
chirality, discrimination between left and right-handed. If the
spin of a particle has a positive
projection on its direction of motion then it is called right-handed; otherwise, it is left-handed. Chirality and handedness are not the same, but become approximately equivalent at high energies. •
Chiral symmetries involve independent transformations of these two types of particle. •
Vector symmetries (also called diagonal symmetries) mean the same transformation is applied on the two chiralities. •
Axial symmetries are those in which one transformation is applied on left-handed particles and the inverse on the right-handed particles.
Additional remarks: duality As mentioned,
asymptotic freedom means that at large energy – this corresponds also to
short distances – there is practically no interaction between the particles. This is in contrast – more precisely one would say
dual– to what one is used to, since usually one connects the absence of interactions with
large distances. However, as already mentioned in the original paper of Franz Wegner, a solid state theorist who introduced 1971 simple gauge invariant lattice models, the high-temperature behaviour of the
original model, e.g. the strong decay of correlations at large distances, corresponds to the low-temperature behaviour of the (usually ordered!)
dual model, namely the asymptotic decay of non-trivial correlations, e.g. short-range deviations from almost perfect arrangements, for short distances. Here, in contrast to Wegner, we have only the dual model, which is that one described in this article.
Symmetry groups The color group SU(3) corresponds to the local symmetry whose gauging gives rise to QCD. The electric charge labels a representation of the local symmetry group U(1), which is gauged to give
QED: this is an
abelian group. If one considers a version of QCD with
Nf flavors of massless quarks, then there is a global (
chiral) flavor symmetry group SUL(
Nf) × SUR(
Nf) × UB(1) × UA(1). The chiral symmetry is
spontaneously broken by the
QCD vacuum to the vector (L+R) SUV(
Nf) with the formation of a
chiral condensate. The vector symmetry, UB(1) corresponds to the baryon number of quarks and is an exact symmetry. The axial symmetry UA(1) is exact in the classical theory, but broken in the quantum theory, an occurrence called an
anomaly. Gluon field configurations called
instantons are closely related to this anomaly. There are two different types of SU(3) symmetry: there is the symmetry that acts on the different colors of quarks, and this is an exact gauge symmetry mediated by the gluons, and there is also a flavor symmetry that rotates different flavors of quarks to each other, or
flavor SU(3). Flavor SU(3) is an approximate symmetry of the vacuum of QCD, and is not a fundamental symmetry at all. It is an accidental consequence of the small mass of the three lightest quarks. In the
QCD vacuum there are vacuum condensates of all the quarks whose mass is less than the QCD scale. This includes the up and down quarks, and to a lesser extent the strange quark, but not any of the others. The vacuum is symmetric under SU(2)
isospin rotations of up and down, and to a lesser extent under rotations of up, down, and strange, or full flavor group SU(3), and the observed particles make isospin and SU(3) multiplets. The approximate flavor symmetries do have associated gauge bosons, observed particles like the rho and the omega, but these particles are nothing like the gluons and they are not massless. They are emergent gauge bosons in an approximate
string description of QCD.
Lagrangian The dynamics of the quarks and gluons are defined by the quantum chromodynamics
Lagrangian. The
gauge invariant QCD Lagrangian is {{Equation box 1 where \psi_i(x) \, is the quark field, a dynamical function of spacetime, in the
fundamental representation of the
SU(3) gauge
group, indexed by i and j running from 1 to 3; \bar \psi_i \, is the
Dirac adjoint of \psi_i \,; D_\mu is the
gauge covariant derivative; the γμ are
Gamma matrices connecting the spinor representation to the vector representation of the
Lorentz group. Herein, the
gauge covariant derivative \left( D_\mu \right)_{ij} = \partial_\mu \delta_{ij} - i g \left( T_a \right)_{ij} \mathcal{A}^a_\mu \,couples the quark field with a coupling strength g \,to the gluon fields via the infinitesimal SU(3) generators T_a \,in the fundamental representation. An explicit representation of these generators is given by T_a = \lambda_a / 2 \,, wherein the \lambda_a \, (a = 1 \ldots 8)\,are the
Gell-Mann matrices. The symbol G^a_{\mu \nu} \, represents the gauge invariant
gluon field strength tensor, analogous to the
electromagnetic field strength tensor,
Fμν, in
quantum electrodynamics. It is given by: show that the effective potential between a quark and its anti-quark in a
meson contains a term that increases in proportion to the distance between the quark and anti-quark (\propto r), which represents some kind of "stiffness" of the interaction between the particle and its anti-particle at large distances, similar to the
entropic elasticity of a
rubber band (see below). This leads to
confinement of the quarks to the interior of hadrons, i.e.
mesons and
nucleons, with typical radii
Rc, corresponding to former "
Bag models" of the hadrons The order of magnitude of the "bag radius" is 1 fm (= 10−15 m). Moreover, the above-mentioned stiffness is quantitatively related to the so-called "area law" behavior of the expectation value of the Wilson loop product
PW of the ordered coupling constants around a closed loop
W; i.e. \,\langle P_W\rangle is proportional to the
area enclosed by the loop. For this behavior the non-abelian behavior of the gauge group is essential. ==Methods==