Loop group

For groups of actors involved in re-recording movie dialogue during post-production (commonly known in the entertainment industry as "loop groups"), see Dubbing (filmmaking).

Algebraic structure → Group theory
Group theory

Basic notions

Group homomorphisms

List of group theory topics

Finite groups

Classification of finite simple groups

Lagrange's theorem

Frobenius group

Schur multiplier

Symmetric group S_n

Integers (Z)
Lattice

Modular groups

PSL(2,Z)
SL(2,Z)

Topological / Lie groups

General linear GL(n)

Special linear SL(n)

Orthogonal O(n)

Euclidean E(n)

Special orthogonal SO(n)

Unitary U(n)

Special unitary SU(n)

Symplectic Sp(n)

Infinite dimensional Lie group

O(∞)
SU(∞)
Sp(∞)

Algebraic groups

Elliptic curve

Linear algebraic group

Abelian variety

Group theory → Lie groups
Lie groups

Classical groups

Simple Lie groups

Classical
List of simple Lie groups
A_n B_n C_n D_n
Exceptional
G₂ F₄ E₆ E₇ E₈

Other Lie groups

Lie algebras

Semisimple Lie algebra

Homogeneous spaces

Representation theory

Lie groups in physics

Scientists

Table of Lie groups

In mathematics, a loop group is a group of loops in a topological group G with multiplication defined pointwise.

Definition

In its most general form a loop group is a group of mappings from a manifold $M$ to a topological group $G$ .

More specifically,^[1] let $M = S 1$ , the circle in the complex plane, and let $LG$ denote the space of continuous maps $S 1 \to G$ , i.e.

LG=\{\gamma :S^{1}\to G|\gamma \in C(S^{1},G)\},

equipped with the compact-open topology. An element of $LG$ is called a loop in $G$ . Pointwise multiplication of such loops gives $LG$ the structure of a topological group. Parametrize $S 1$ with $θ$ ,

\gamma :\theta \in S^{1}\mapsto \gamma (\theta )\in G,

and define multiplication in $LG$ by

(\gamma _{1}\gamma _{2})(\theta )\equiv \gamma _{1}(\theta )\gamma _{2}(\theta ).

Associativity follows from associativity in $G$ . The inverse is given by

\gamma ^{{-1}}:\gamma ^{{-1}}(\theta )\equiv \gamma (\theta )^{{-1}},

and the identity by

e:\theta \mapsto e\in G.

The space $LG$ is called the free loop group on $G$ . A loop group is any subgroup of the free loop group $LG$ .

Examples

An important example of a loop group is the group

\Omega G\,

of based loops on $G$ . It is defined to be the kernel of the evaluation map

e_{1}:LG\to G

and hence is a closed normal subgroup of $LG$ . (Here, $e 1$ is the map that sends a loop to its value at $1$ .) Note that we may embed $G$ into $LG$ as the subgroup of constant loops. Consequently, we arrive at a split exact sequence

1\to \Omega G\to LG\to G\to 1

The space $LG$ splits as a semi-direct product,

LG=\Omega G\rtimes G

We may also think of $Ω G$ as the loop space on $G$ . From this point of view, $Ω G$ is a H-space with respect to concatenation of loops. On the face of it, this seems to provide $Ω G$ with two very different product maps. However, it can be shown that concatenation and pointwise multiplication are homotopic. Thus, in terms of the homotopy theory of $Ω G$ , these maps are interchangeable.

Loop groups were used to explain the phenomenon of Bäcklund transforms in soliton equations by Chuu-Lian Terng and Karen Uhlenbeck.^[2]

Notes

↑ Bäuerle & de Kerf 1997
↑ Geometry of Solitons by Chuu-Lian Terng and Karen Uhlenbeck

References

Bäuerle, G.G.A; de Kerf, E.A. (1997). A. van Groesen; E.M. de Jager; A.P.E. Ten Kroode, eds. Finite and infinite dimensional Lie algebras and their application in physics. Studies in mathematical physics. 7. North-Holland. ISBN 978-0-444-82836-1 – via ScienceDirect. (subscription required (help)).
Pressley, Andrew; Segal, Graeme (1986), Loop groups, Oxford Mathematical Monographs. Oxford Science Publications, New York: Oxford University Press, ISBN 0-19-853535-X, MR 0900587

Loop group

Definition

Examples

Notes

References

See also