用户: Fyx1123581347/扶磊 Lie 代数/Killing Form

定义 0.1. For any Lie algebra $g$ , the Killing form is defined to be $B : g \times g \to C, B (X, Y) = Tr (a d_{X} a d_{Y} : g \to g)$

Clearly

B (X, Y) = B (Y, X)

. We shall write

B (X, Y)

as

(X, Y)

.

命题 0.2. For all $Z \in g$ , $(a d_{Z} X, Y) + (X, a d_{Z} Y) = 0.$

Notice they may be interpreted as

Z (X, Y) = Z c = 0

.

推论 0.3. If $h$ is an ideal of $g$ , then $h^{⊥} = {x \in g ∣ β (X, Y) = 0, \forall Y \in h}$ is also an ideal of $g$ .

定理 0.4 (Cartan Criterion). Let $g \in gl (V)$ be a sub lie algebra. Suppose for all $X, Y \in g$ , we have $Tr (X Y : V \to V) = 0$ . Then $g$ is sovable.

命题 0.5.

•	$g$ is solvable if and only if $B (g, [g, g]) = 0$ .
•	$g$ is semisimple if and only if $B$ is nondegenerate as a bilinear form.

证明. Suppose $g$ is solvable. Consider the adjoint representation $a d : g \to gl (g)$ . By Lie theorem, there exists a basis of $g$ such that $a d (X) \in gl (g)$ are upper triangular matrices for all $X \in g$ . So $a d ([X, Y]) = a d_{X} a d_{Y} - a d_{Y} a d_{X}$ is strict upper triangular. Thus $B (Z, [X, Y]) = T r (a d_{Z} a d_{[X, Y]}) = 0.$ Conversely, it suffices to show $[g, g]$ is sovable. Consider the restriction of $[g, g]$ under the adjoint representation, whose kernel is $Z (g)$ . That is, we have $0 \to Z (g) \cap [g, g] \to [g, g] \to a d ([g, g]) \to 0$ So we are going to show $a d ([g, g])$ is solvable. This follows from Cartan criterion. (In fact, it suffices that $B ([g, g], [g, g]) = 0$ )

Suppose $g$ is semisimple. If $X \in g$ is such that $B (X, Y) = 0$ for all $Y$ . But $g^{⊥}$ is a solvable ideal: $0 \to Z (g) \cap g^{⊥} \to g^{⊥} \to a d (g^{⊥}) \to 0$ This follows again from Cartan criterion.

Suppose

B

is nondegenerate. Let

a

be an abelian ideal of

g

. Let us prove

a = 0

. Since

B

is nondegenerate, it suffices to show

a \subseteq g^{⊥}

. That is, for

X \in a, Y \in g

,

T r (a d_{X} a d_{Y}; g) = 0.

Notice that

a d_{X} a d_{Y} ∣_{a} = 0

and

a d_{X} a d_{Y} (g) \subset a

. Thus the trace map is zero on

a

and

g / a

.

$□$

推论 0.6. A semisimple lie algebra is a direct product of simple lie algebras.

证明. Simple lie algebra is clearly semisimple. The direct product of simple lie algebras is also semisimple. Now suppose $g$ is semisimple. Let $h$ be an ideal of $g$ , then $h^{⊥}$ is also an ideal. As $B$ is nondegenerate, we have $g = h \oplus h^{⊥} .$ (Once we can prove $B$ is nondegenrate on $h$ ).

Claim:

h \cap h^{⊥}

is solvable. This is because

a d : h \cap h^{⊥} \to gl (g)

has solvable image.

$□$

推论 0.7. If $g$ is semisimple, then $[g, g] = g$ .

1Cartan Criterion
2Representations of semisimple lie algebra
Casimir operator
3Semisimplicity

1Cartan Criterion

To prove $g$ is solvable, it suffices to show $[g, g]$ is sovable. By Engel theorem, it suffices to show elements in $[g, g]$ are nilpotent. Let $X \in [g, g]$ and $λ_{1}, \dots, λ_{n}$ be eigenvalues of $X$ (counted with multiplicities). Take basis of $V$ so that the matrix of $X$ is in Jordan form. Let $\overset{ˉ}{D} \in gl (V)$ be the linear transformation such that with respect to the basis have diagonal form as $X$ except has eigenvalues conjugate to those of $X$ . We are going to show $T r (\overset{ˉ}{D} X) = 0$ . Denote $X = i \sum [Y_{i}, Z_{i}]$ with $Y_{i}, Z_{i} \in g$ . Then $T r (\overset{ˉ}{D} X) = i \sum T r (\overset{ˉ}{D} [Y_{i}, Z_{i}]) = - i \sum T r ([Y_{i}, \overset{ˉ}{D}] Z_{i}) .$

Recall for $X, Y, Z \in E n d (V)$ , $T r ([X, Y] Z) + T r (X [Y, Z]) = 0.$ It suffices to show $a d_{\overset{ˉ}{D}}$ is a polynomial of $a d_{X}$ . The Jordan decomposition of $X$ is $X = D + (X - D) .$ The Jordan decomposition of $a d_{X}$ is $a d_{X} = a d_{D} + a d_{X - D}$ (identities in $gl (E n d (V))$ ). Then $a d_{D}$ is a polynomial of $a d_{X}$ . Let us prove $a d_{\overset{ˉ}{D}}$ is a polynomial of $a d_{D}$ .

$a d_{D} (E_{ij}) = (λ_{i} - λ_{j}) E_{ij}$

Take $g \in C [t]$ so that $g (λ_{i} - λ_{j}) = \overset{ˉ}{λ}_{i} - \overset{ˉ}{λ}_{j}$ . We win.

2Representations of semisimple lie algebra

Casimir operator

命题 2.1. Let $V$ be a finite dimensional vector space, $g \subset gl (V)$ subalgebra. Suppose $g$ is semisimple. Then the pairing $B_{V} : g \times g \to C, (X, Y) \mapsto T r (X Y; V)$ is nondegenerate.

证明. We need to show

g^{⊥} = {X ∣ β_{V} (X, Y) = 0, \forall Y \in g} = 0.

To see this, it suffices to show

g^{⊥}

is a solvable ideal.

$□$

Let $g \subset gl (V)$ be a semisimple lie algebra. Let $v_{1}, \dots, v_{n}$ be a basis of $g$ as a vector space, and $v_{1}^{'}, \dots, v_{n}^{'}$ be the dual basis of $g$ with respect to the nondegenrate bilinear map $B_{V}$ . Define the Casmir operator $C_{V} : V \to V$ by $C_{V} = i = 1 \sum n v_{i} v_{i}^{'} .$

命题 2.2.

1.	$C_{V}$ is independent of the choice of the basis.
2.	$C_{V} : V \to V$ is a homomorphism of $g$ -modules.
3.	$T r (C_{V}) = dim V$ .

证明. (1) Let

u_{i}

be another basis and

u_{i}^{'}

the corresponding dual basis.

i = 1 \sum n v_{i} v_{i}^{'} = i = 1 \sum n u_{i} u_{i}^{'} .

Suppose

v_{i} = \sum_{k} a_{ik} u_{k}

,

v_{j}^{'} = \sum_{l} b_{j l} u_{l}^{'}

. We have

δ_{ij} = β_{V} (v_{i}, v_{j}^{'}) = k, l \sum a_{ik} b_{j l} δ_{k, l} = k \sum a_{ik} b_{jk} .

Let

A = (a_{ik})

,

B = (b_{j l})

. Then

A B^{t} = I

.

i = 1 \sum n v_{i} v_{i}^{'} = k, l \sum i \sum a_{ik} b_{i l} u_{k} u_{l}^{'} = k, l \sum δ_{k, l} u_{k} u_{l}^{'} = k \sum u_{k} u_{k}^{'} .

(2)

C_{V} X - X C_{V} = i \sum v_{i} v_{i}^{'} X - j \sum X v_{j} v_{j}^{'} = i \sum v_{i} [v_{i}^{'}, X] + j \sum [v_{j}, X] v_{j}^{'} .

Suppose

[v_{i}^{'}, X] = \sum_{k} a_{ik} v_{k}^{'}

,

[v_{j}, X] = \sum_{j} b_{j l} v_{l}

. By

B ([v_{i}^{'}, X], v_{j}) + B (v_{i}^{'}, [v_{j}, X]) = 0.

$□$

3Semisimplicity

命题 3.1. Let $g$ be a semisimple lie algebra, let $ρ : g \to gl (V)$ be a representation, and $W$ be a subrepresentation. Then there exists a subrepresentation $W^{'}$ such that $V ≃ W \oplus W^{'}$ .

证明. The image $ρ (g)$ is also semisimple. Replace $g$ by $ρ (g)$ , we may assume $g \subset gl (V)$ .

Notice that any $1$ -dimensional representation of a semisimple lie algebra is trivial ( $0$ representation). In fact, the kernel contains $[g, g] = g$ .

Claim: If $W$ is a subrepresentation of $V$ such that $codim (W, V) = 1$ , then there exists a subrepresentation $W^{'}$ of $V$ such that $V = W \oplus W^{'}$ .

Suppose $W$ is irreducible. Let $C_{V} : V \to V$ be the Casmir operator. Recall that $C_{V}$ is a homomorphism of representation. Since $W$ is a subrepresentation of $V$ , we must have $C_{V} (W) \subseteq W$ , as $C_{V} = \sum v_{i} v_{i}^{'}$ . So $C_{V} : W \to W$ is a homomorphism of the representation $W$ . By Schur’s lemma, $C_{V}$ must be a scalar $λ$ . It also induces a homomorphism $C_{V} : V / W \to V / W$ . As $V / W$ is a trivial representation, $C_{V} ∣_{V / W}$ is zero. We have $T r (C_{V}) = dim g \neq = 0$ , so $λ \neq = 0$ . That is, $ker (C_{V}) \cap W = 0$ . This follows from

注 3.2. Invariant subspace of $C_{V}$ is a subrepresentation of $V$ . This shows the importance of Casmir operator.

In general, we prove the claim by induction on

dim V

. For codimension

1

subspace

W

of

V

. If

W

is not irreducible, it contains an irreducible subrepresentation

Z

(e.g. with the minimal dimension). Apply the induction hypothesis to

V / Z

, we can find a subrep

Y

of

V

such that

Y \supset Z

and

V / Z ≃ W / Z \oplus Y / Z .

We have

dim Y / Z = 1

. Thus there exists a subrepresentation

W^{'} \subset Y

such that

Y = Z \oplus W^{'} .

It now follows that

V = W \oplus W^{'} .

注 3.3. $X ⟨ v, ϕ ⟩ = ⟨ X v, ϕ ⟩ + ⟨ v, Xϕ ⟩ .$ We have $Hom_{g} (k, V) = {v \in V ∣ X v = 0, \forall X \in V} .$ It follows that $Ext^{i} (V, W) = Ext^{i} (k, \underline{Hom} (V, W)) .$ (Notice that $\underline{Hom}$ and $\otimes$ have no derived functor) It suffices to show $Ext^{1} (k, V) = 0$ for any $V$ . This is exactly what we have done for the codimension $1$ case.

$□$

命题 3.4. Let $g \subset gl (V)$ be a semisimple lie algebra. For any $X \in gl (V)$ , let $X = X_{s} + X_{n}$ be the Jordan decomposition. For $X \in g$ , we have $X_{s}, X_{n} \in g$ .

证明. Say lie subalgebras with the desired property “good”. Since $g$ is semisimple, $g = [g, g] \subseteq sl (V)$ . In fact, for any representation $ρ \to gl (W)$ of a semisimple lie algebra $g$ , we have $ρ (g) \subseteq sl (W)$ .

For any subrepresentation

W \subseteq V

of

g

, define

S_{W} = {Y \in gl (V) ∣ Y (W) \subseteq W, T r (Y ∣_{W}) = 0} .

Then

S_{W}

is a good subalgebra of

gl (V)

. As

Y_{s}, Y_{n}

are polynomials of

Y

,

W

is invariant under them. In fact, they are Jordan decompositions of

Y ∣_{W}

.

$□$

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用户: Fyx1123581347/扶磊 Lie 代数/Killing Form

1Cartan Criterion

2Representations of semisimple lie algebra

Casimir operator

3Semisimplicity