topological group

C18167
concept

A topological group is a group equipped with a topology such that the group operation and inversion are continuous maps with respect to that topology.

All labels observed (14)

Label Occurrences
topological group canonical 13
connected Lie group 7
discrete group 5

Description generation (CDg)

The one-sentence description above was generated by prompting gpt-5.1 with the class name and this instruction.

Instruction
generate a one-sentence description for a given conceptual class.
# Response Format
Return only the sentence: "Description: [one-sentence description of the conceptional class]"
Input
Class: topological group
Generated description
A topological group is a group equipped with a topology such that the group operation and inversion are continuous maps with respect to that topology.

Instances (30)

Instance Via concept surface
Euclidean group
E(n)
Lie group
modular group PSL(2,Z)
surface form: PSL(2,ℤ)
discrete group
rotation group SO(3)
surface form: SO(3)
SL(2,C) connected Lie group
SU(3) matrix Lie group
Weil group
Kleinian group discrete group
(2,3,7) triangle group Fuchsian group
rotation group SU(2)
surface form: SU(2)
compact Lie group
Fuchsian group discrete group
ISO(n)
special orthogonal group SO(n)
surface form: SO(n)
U(1)
p-adic analytic groups topological group theory concept
Spin(2,d) universal covering group
special unitary group SU(n)
surface form: SU(n)
compact Lie group
general linear group GL(n,R)
surface form: GL(n,ℝ)
general linear group GL(n,C)
surface form: GL(n,ℂ)
special linear group SL(n,C)
surface form: SL(n,ℂ)
connected Lie group
SL(2,ℤ) discrete group
PSL(2,ℝ) connected Lie group
Pauli group discrete group
SL(2,R) connected Lie group
Haar measure concept in topological group theory
Weil–Deligne group
idèle class group
metaplectic group
PSL(2,\mathbb{C})
surface form: PSL(2,ℂ)
connected Lie group