T2: Lie Groups and Lie Algebra Flashcards
Define a linear Lie group
A closed subgroup of GL_n(K).
Let G be a (linear) Lie group. Define the Lie algebra
g = {X ∈ gl_n(C); exp(tX) ∈ G}
Give three properties of the Lie algebra g
- g is a real vector space inside gl_n(K)
- If X ∈ g and if b ∈ G, then bXb^−1 ∈ g
- for X,Y in g: [X,Y] = XY-YX
Give the formal definition of Lie algebra over field F
A F-vector space together with a Lie bracket:
[ , ] = g X g to g
What are the three properties of the Lie bracket?
Bilinear, antisymmetric and satisfies the Jacobi identity.
Under what condition is a Lie algebra abelian?
[X,Y] = 0 for any X,Y in g
Given a Lie algebra g, define a Lie subalgebra h
A subspace h ⊂ g that is closed under the Lie bracket
Define a Lie algebra homomorphism
A map between two Lie algebras st:
ϕ([X, Y ]) = [ϕ(X), ϕ(Y )]
And
ϕ(XY-YX) = [ϕ(X)ϕ(Y) - ϕ(Y)ϕ(X)]
Given a Lie group homomorphism, how can we find a Lie algebra homomorphism?
Differentiating the Lie group hom and setting t = 0
ϕ(exp(tX)) = ??
exp(tφ(X))
Draw the commutative diagram for Lie groups and algebras
check phone
φ(gXg^−1) = ??
ϕ(g) φ(X) ϕ(g^−1)
how can we show φ is a Lie group homomorphism?
- Show it is R-linear
- Show it preserves the bracket.
What are three properties of the Lie bracket?
- Bilinear
- Anti-symmetric
- Satisfies Jacobi
Define the center of the Lie algebra
The element of the Lie algebra Z for which the Lie bracket is zero with any other element.
