Topological group

This article gives a basic definition in the following area: topological group theory
View other basic definitions in topological group theory |View terms related to topological group theory |View facts related to topological group theory

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

This article defines the notion of group object in the category of topological spaces|View other types of group objects

This is a variation of group|Find other variations of group | Read a survey article on varying group

Definition

Abstract definition

The notion of topological group can be defined in the following equivalent ways:

1. In the language of universal algebra, it is a group equipped with a topology for which all the defining operations of groups are continuous.
2. It is a group object in the category of topological spaces.

Concrete definition

A topological group is a set ${\displaystyle G}$ endowed with the following two structures:

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

such that the following compatibility conditions are satisfied:

Operation	Arity	Condition	Comments
Multiplication or product	2 (so it's a map ${\displaystyle G\times G\to G}$)	continuous as a map from ${\displaystyle G\times G}$ (equipped with the product topology) to ${\displaystyle G}$. In other words, the group multiplication ${\displaystyle (g,h)\mapsto gh}$ is jointly continuous.	Joint continuity is strictly stronger than separate continuity, which would mean continuity in each input holding the other input fixed.
Identity element	0 (it's a constant element ${\displaystyle e\in G}$)	No condition. As such, we may impose the condition that the map from a one-point space to ${\displaystyle G}$ sending the point to the identity element is continuous, but this condition is vacuously true.
Inverse map	1 (so it's a map ${\displaystyle G\to G}$)	continuous as a map from ${\displaystyle G}$ to itself with the equipped topology. In other words, ${\displaystyle g\mapsto g^{-1}}$ is continuous.	Note that because the inverse map is its own inverse (see inverse map is involutive), this is equivalent to it being a self-homeomorphism of ${\displaystyle G}$.

T0 assumption

Some people assume a topological group to be ${\displaystyle T_{0}}$, 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 ${\displaystyle T_{0}}$-topological group. However, the definition above does not include this assumption. Further information: T0 topological group

Definition with symbols

Relation with other structures

Stronger structures

• Lie group

Weaker structures

References

Textbook references

• Topology (2nd edition) by James R. Munkres^{More info}, Page 145, Supplementary Exercises (assumes ${\displaystyle T_{0}}$ in the definition of topological group)