Topological group: Difference between revisions

Revision as of 08:18, 6 September 2007

This article describes a compatible combination of two structures: group and topological space

Definition

Symbol-free definition

A topological group is a set endowed with the following two structures:

The structure of a group, viz a binary operation called multiplication or product, a unary operation called the inverse map, and a constant called the identity element satisfying the conditions for a group
The structure of a topological space

such that the following compatibility conditions are satisfied:

The inverse map is a continuous map from the group to itself (as a topological space map)
The group multiplication map is a jointly continuous map i.e. a continuous map from the Cartesian product of the group with itself, to the group (where the Cartesian product is given the product topology).

Some people assume a topological group to be $T_{0}$ , that is, that there is no pair of points with each in the closure of the other. This is not a very restrictive assumption, because if we quotient out a topological group by the closure of the identity element, we do get a $T_{0}$ -topological group. Further information: T0 topological group

Definition with symbols

A topological group is a set $G$ endowed with two structures:

The structure of a group viz a multiplication $*$ and an inverse map $g \mapsto g^{- 1}$ and an identtiy element $e$ .
The structure of a topological space viz a topology $τ$

such that:

$g \mapsto g^{- 1}$ is a continuous map with respect to $τ$ .
$(g, h) \mapsto g * h$ is a jointly continuous map viz it is a continuous map from $G \times G$ with the product topology, to $G$ .

Relation with other structures

Stronger structures

Algebraic group over a topological field
Lie group

Weaker structures

@@ Line 15: / Line 15: @@
 * The group multiplication map is a [[jointly continuous map]] i.e. a continuous map from the Cartesian product of the group with itself, to the group (where the Cartesian product is given the product topology).
+Some people assume a topological group to be <math>T_0</math>, that is, that there is no pair of points with each in the closure of the other. This is not a very restrictive assumption, because if we quotient out a topological group by the closure of the identity element, we do get a <math>T_0</math>-topological group. {{further|[[T0 topological group]]}}
 ===Definition with symbols===