T2: SL_2 Flashcards
Define the conventional basis for sl_2 (C)
H = Id w/negative bottom right
X = 1 top right
Y = 1 bottom left
State the commutator rules for the basis of sl_2 (C)
[H, X] = 2X
[H, Y] = -2Y
[X, Y] = H
How can we decompose an arbitrary representation (ρ, V) of sl_2(C)?
V = ⨁V_α where each V_α is a complex eigenspace for H st. H(v) = αv
Define a weight (in sl_2(C))
The eigenvalue corresponding to H(v) = αv
Define a weight space and weight vector (in sl_2(C))
Each component of V (V_α) is a weight space and any vector in V_α is a weight vector
Consider some vector v in V_α. Where do the actions of H,X,Y send v?
H(v) to V
X(v) to V_α+2
Y(v) to V_α-2
What characterises the highest weight vector and highest weight?
The vector st
X(v) = 0, with v in V_α
α is the highest weight
What characterises the lowest weight vector and lowest weight?
The vector st
Y(v) = 0, with v in V_α
α is the lowest weight
How are the weights of sl_2 characterised?
A string of integers which differ by two and are symmetric about zero between -n and n.
What are the only eigenvectors of X and Y?
The highest and lowest weight vectors respectively, with eigenvalue 0.
What is the only finite dim unitary rep of SL_2(C)
The trivial rep
How do weight vectors v_i and w_j combine for V⊗W given reps V and W
v_i ⊗ w_j ∈ V ⊗ W
is a weight vector in V ⊗ W with weight i+j
Construct the weight vectors and weights of the nth power of the symmetric square Sym^n (C^2)
weight vectors: e1^k e2^n-k
weights: -n to n with 2k − n for each wv
Given a highest weight vector v what subspace of V can we define?
Subspace spanned by vectors v, Y(v), …
What is the highest (and lowest) weight for an irr rep sl2?
dimV = n+1
