Scalar chromodynamics explained

In quantum field theory, scalar chromodynamics, also known as scalar quantum chromodynamics or scalar QCD, is a gauge theory consisting of a gauge field coupled to a scalar field. This theory is used experimentally to model the Higgs sector of the Standard Model.

It arises from a coupling of a scalar field to gauge fields. Scalar fields are used to model certain particles in particle physics; the most important example is the Higgs boson. Gauge fields are used to model forces in particle physics: they are force carriers. When applied to the Higgs sector, these are the gauge fields appearing in electroweak theory, described by Glashow–Weinberg–Salam theory.

Matter content and Lagrangian

Matter content

This article discusses the theory on flat spacetime

R^1,3

, commonly known as Minkowski space.

The model consists of a complex vector valued scalar field

\phi

minimally coupled to a gauge field

A_\mu

. Commonly, this is

SU(N)

for some

, though many details hold even when we don't concretely fix

The scalar field can be treated as a function

\phi:R^1,3 → V

, where

(V,\rho,G)

is the data of a representation of

. Then

is a vector space. The 'scalar' refers to how

\phi

transforms (trivially) under the action of the Lorentz group, despite

\phi

being vector valued. For concreteness, the representation is often chosen to be the fundamental representation. For

SU(N)

, this fundamental representation is

C^N

. Another common representation is the adjoint representation. In this representation, varying the Lagrangian below to find the equations of motion gives the Yang–Mills–Higgs equation.

Each component of the gauge field is a function

A_\mu:R^1,3 → ak{g}

where

ak{g}

is the Lie algebra of

from the Lie group–Lie algebra correspondence. From a geometric point of view,

A_\mu

are the components of a principal connection under a global choice of trivialization (which can be made due to the theory being on flat spacetime).

Lagrangian

The Lagrangian density arises from minimally coupling the Klein–Gordon Lagrangian (with a potential) to the Yang–Mills Lagrangian.^[1] Here the scalar field

\phi

is in the fundamental representation of

SU(N)

where

F_\mu\nu

is the gauge field strength, defined as

F_\mu\nu=\partial_\muA_\nu-\partial_\nuA_\mu+ig[A_\mu,A_\nu]

. In geometry this is the curvature form.

D_\mu\phi

is the covariant derivative of

\phi

, defined as

D_\mu\phi=\partial_\mu\phi-ig\rho(A_\mu)\phi.

is the coupling constant.

V(\phi)

is the potential.

is an invariant bilinear form on

ak{g}

, such as the Killing form. It is a typical abuse of notation to label this

as the form often arises as the trace in some representation of

ak{g}

This straightforwardly generalizes to an arbitrary gauge group

, where

\phi

takes values in an arbitrary representation

\rho

equipped with an invariant inner product

\langle ⋅ , ⋅ \rangle

, by replacing

(D_\mu\phi)^\daggerD^\mu\phi\mapsto\langleD_\mu\phi,D^\mu\phi\rangle

Gauge invariance

The model is invariant under gauge transformations, which at the group level is a function

U:R^1,3 → G

, and at the algebra level is a function

\alpha:R^1,3 → ak{g}

At the group level, the transformations of fields is^[2]

\phi(x)\mapstoU(x)\phi(x)

A_\mu(x)\mapstoUA_\muU^-1-

	i
	g

(\partial_\muU)U^-1.

From the geometric viewpoint,

U(x)

is a global change of trivialization. This is why it is a misnomer to call gauge symmetry a symmetry: it is really a redundancy in the description of the system.

Curved spacetime

, but this requires more subtle definitions for many objects appearing in the theory. For example, the scalar field must be viewed as a section of an associated vector bundle with fibre

. This is still true on flat spacetime, but the flatness of the base space allows the section to be viewed as a function

M → V

, which is conceptually simpler.

Higgs mechanism

If the potential is minimized at a non-zero value of

\phi

, this model exhibits the Higgs mechanism. In fact the Higgs boson of the Standard Model is modeled by this theory with the choice

G=SU(2)

; the Higgs boson is also coupled to electromagnetism.

Examples

By concretely choosing a potential

, some familiar theories can be recovered.

Taking

V(\phi)=M^2\phi^\dagger\phi

gives Yang–Mills minimally coupled to a Klein–Gordon field with mass

Taking

V(\phi)=λ(\phi^\dagger\phi)²-

	2\phi
\mu
	H

^\dagger\phi

gives the potential for the Higgs boson in the Standard Model.

Notes and References

Book: Dreiner . Herbi . Harber . Howard . Martin . Stephen . Practical supersymmetry . Cambridge University Press . 2004 .
Book: Peskin . Howard . Schroeder . Daniel . An introduction to quantum field theory . Westview Press . Reprint . 1995 . 978-0201503975 . registration .

Scalar chromodynamics explained

Matter content and Lagrangian

Matter content

Lagrangian

Gauge invariance

Curved spacetime

Higgs mechanism

Examples

See also

Notes and References