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Chern-Simons theory is a 3-dimensional topological quantum field theory of ] which computes ] and ] invariants. It was introduced by ] in an attempt to interpret the ] in terms of a three dimensional ]. It is named so because its ] is nothing but the ]. Chern-Simons theory is a 3-dimensional topological quantum field theory of ] which computes ] and ] invariants. It was introduced by ] in an attempt to interpret the ] in terms of a three dimensional ]. It is named so because its ] is nothing but the integral of the ].


A particular Chern-Simons theory is specified by a choice of ] G known as the gauge group of the theory and also a number referred to as the <i>level</i> of the theory, which is a constant that multiplies the ]. The action is gauge dependent, however the ] of the ] theory is ] when the level is an integer and the gauge ] vanishes on all ] of the 3-dimensional spacetime. A particular Chern-Simons theory is specified by a choice of ] G known as the gauge group of the theory and also a number referred to as the <i>level</i> of the theory, which is a constant that multiplies the ]. The action is gauge dependent, however the ] of the ] theory is ] when the level is an integer and the gauge ] vanishes on all ] of the 3-dimensional spacetime.


==The classical theory==
==Relations with other theories==

===Configurations===

Chern-Simons theories can be defined on any ] M, with or without boundary. As these theories are Schwarz-type topological theories, no ] needs to be introduced on M.

Chern-Simons theory is a gauge theory, which means that a ] configuration in the Chern-Simons theory on M with gauge group G is described by a G ] on M. The ] of this bundle is characterized by a connection ] A which is valued in the Lie algebra g of the Lie group G. In general the connection A is only defined on individual ]es, and the values of A on different patches are related by maps known as ]. These are characterized by the assertion that the ], which is the sum of the ] operator d and the connection A, transforms in the ] of the gauge group G. The ] of the covariant derivative with itself is a g-valued 2-form F called the ] or ] and also transforms in the adjoint representation.

===Dynamics===

The action S of Chern-Simons theory is proportional to the integral of the Chern-Simons 3-form

::<math>S=\frac{k}{4\pi}\int_M Tr(A\wedge dA+\frac{2}{3}A\wedge A\wedge A)</math>

where k is the level of the theory. The classical physics of Chern-Simons theory is independent of the choice of level k.

Classically the system is characterized by its equations of motion which are the extrema of the action with respect to the field A. Explicitly the field equation is

::<math>0=\frac{\delta S}{\delta A}=\frac{k}{4\pi}\star F</math>

where the above star is ].

The classical equations of motion are therefore satisfied if and only if the curvature vanishes everywhere, in which case the connection is said to be flat. Thus the classical solutions to G Chern-Simons theory are the flat connections of G principal bundles on M. Flat connections are determined entirely by holonomies of flat sections around noncontractible cycles on the base M. More precisely, they are in one to one correspondence with maps from the ] of M to the gauge group G.

==Relationships with other theories==


===Topological string theories=== ===Topological string theories===

Revision as of 20:01, 17 August 2006

Chern-Simons theory is a 3-dimensional topological quantum field theory of Schwarz type which computes knot and three-manifold invariants. It was introduced by Edward Witten in an attempt to interpret the Jones polynomial in terms of a three dimensional gauge theory. It is named so because its action is nothing but the integral of the Chern-Simons 3-form.

A particular Chern-Simons theory is specified by a choice of Lie group G known as the gauge group of the theory and also a number referred to as the level of the theory, which is a constant that multiplies the action. The action is gauge dependent, however the partition function of the quantum theory is well-defined when the level is an integer and the gauge field strength vanishes on all boundaries of the 3-dimensional spacetime.

The classical theory

Configurations

Chern-Simons theories can be defined on any topological 3-manifold M, with or without boundary. As these theories are Schwarz-type topological theories, no metric needs to be introduced on M.

Chern-Simons theory is a gauge theory, which means that a classical configuration in the Chern-Simons theory on M with gauge group G is described by a G principle bundle on M. The connection of this bundle is characterized by a connection one-form A which is valued in the Lie algebra g of the Lie group G. In general the connection A is only defined on individual coordinate patches, and the values of A on different patches are related by maps known as gauge transformations. These are characterized by the assertion that the covariant derivative, which is the sum of the exterior derivative operator d and the connection A, transforms in the adjoint representation of the gauge group G. The commutator of the covariant derivative with itself is a g-valued 2-form F called the curvature or field strength and also transforms in the adjoint representation.

Dynamics

The action S of Chern-Simons theory is proportional to the integral of the Chern-Simons 3-form

S = k 4 π M T r ( A d A + 2 3 A A A ) {\displaystyle S={\frac {k}{4\pi }}\int _{M}Tr(A\wedge dA+{\frac {2}{3}}A\wedge A\wedge A)}

where k is the level of the theory. The classical physics of Chern-Simons theory is independent of the choice of level k.

Classically the system is characterized by its equations of motion which are the extrema of the action with respect to the field A. Explicitly the field equation is

0 = δ S δ A = k 4 π F {\displaystyle 0={\frac {\delta S}{\delta A}}={\frac {k}{4\pi }}\star F}

where the above star is Hodge duality.

The classical equations of motion are therefore satisfied if and only if the curvature vanishes everywhere, in which case the connection is said to be flat. Thus the classical solutions to G Chern-Simons theory are the flat connections of G principal bundles on M. Flat connections are determined entirely by holonomies of flat sections around noncontractible cycles on the base M. More precisely, they are in one to one correspondence with maps from the fundamental group of M to the gauge group G.

Relationships with other theories

Topological string theories

In the context of string theory, a U(N) Chern-Simons theory on an oriented Lagrangian 3-submanifold M of a 6-manifold N arises as the string field theory of open strings ending on a D-brane wrapping M in the A-model topological string on N. The B-Model topological open string field theory on the spacefilling worldvolume of a stack of D5-branes is a 6-dimensional variant of Chern-Simons theory known as holomorphic Chern-Simons theory.

WZW and matrix models

Chern-Simons theories are related to many other field theories. For example, if one considers a Chern-Simons theory with gauge group G on a manifold with boundary then all of the 3-dimensional propagating degrees of freedom may be gauged away, leaving a 2-dimensional conformal field theory known as a G Wess-Zumino-Witten model on the boundary. In addition the U(N) and SO(N) Chern-Simons theories at large N is well approximated by matrix models.

Chern-Simons terms in other theories

The Chern-Simons term can also be added to models which aren't topological quantum field theories. In 3D, this gives rise to a massive photon if this term is added to the Yang-Mills action. This term can be induced by integrating over a massive charged Dirac field. It also appears for example in the quantum Hall effect. Ten and eleven dimensional generalizations of Chern-Simons terms appear in the actions of all ten and eleven dimensional supergravity theories.

See also

References

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