Lie subgroup

E140811

A Lie subgroup is a subgroup of a Lie group that is itself a Lie group and an embedded submanifold, inheriting compatible smooth and group structures from the ambient Lie group.

All labels observed (1)

Label Occurrences
Lie subgroup canonical 1

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Statements (49)

Predicate Object
instanceOf Lie group
embedded submanifold
mathematical concept
subgroup
characterizedBy being a subgroup that is also an embedded submanifold
having inclusion map that is a smooth group homomorphism and an immersion
having smooth group operations induced from ambient Lie group
correspondsTo Lie subalgebra of the Lie algebra of the ambient Lie group under suitable conditions
definedOn Lie group
example O(n) as a Lie subgroup of GL(n,ℝ)
SO(n) as a Lie subgroup of GL(n,ℝ)
U(n) as a Lie subgroup of GL(n,ℂ)
closed one-parameter subgroup generated by an element of the Lie algebra
maximal torus in a compact Lie group
torus T^n as a Lie subgroup of ℝ^n modulo ℤ^n
field Lie theory
differential geometry
group theory
representation theory
hasCondition must be a subgroup of the underlying abstract group of the Lie group
must be a submanifold with the subspace topology from the ambient Lie group
hasMorphisms smooth group homomorphisms between Lie subgroups
hasProperty closed under group multiplication
closed under taking inverses
contains identity element of ambient Lie group
has finite-dimensional tangent spaces
inherits group structure from ambient Lie group
inherits smooth structure from ambient Lie group
is Hausdorff as a manifold
is a Lie group with the induced smooth structure
is a closed subset of the ambient Lie group when it is an embedded Lie subgroup
is a regular submanifold when embedded
is a subgroup stable under smooth conjugation maps of the ambient Lie group
is an embedded submanifold under standard definition
is an immersed submanifold of the ambient Lie group
is connected if it is a connected submanifold
is locally Euclidean
is second countable as a manifold
is smooth with respect to the ambient smooth structure
may be non-closed as a subset if only immersed
hasTangentSpaceAtIdentity Lie subalgebra of the ambient Lie algebra
is subgroup of a Lie group that is itself a Lie group
relatedTo Lie algebra
Lie subalgebra
usedIn classification of Lie groups
gauge theory in mathematical physics
representation theory of Lie groups
study of homogeneous spaces
symmetry analysis in differential equations

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Referenced by (1)

Full triples — surface form annotated when it differs from this entity's canonical label.

Sophus Lie hasConceptNamedAfter Lie subgroup