"Talk on BGG resolution"의 두 판 사이의 차이

2016년 4월 28일 (목) 01:18 판

characters

let $\lambda\in \mathfrak{h}^*$

$$ \operatorname{ch} M({\lambda})=\frac{e^{\lambda}}{\prod_{\alpha>0}(1-e^{-\alpha})} $$

let $\lambda\in \Lambda^+$

thm (Weyl character formula)

\[ \operatorname{ch}L({\lambda})=\frac{\sum_{w\in W} (-1)^{\ell(w)}e^{w\cdot \lambda}}{\prod_{\alpha>0}(1-e^{-\alpha})} \]

thus we have

$$ \operatorname{ch}L(\lambda)=\sum_{w \in W}(-1)^{\ell(w)}\operatorname{ch} M(w\cdot \lambda) \label{WCF} $$

prop

If $0\to M' \to M \to M \to 0$ is a short exact sequence in $\mathcal{O}$, we have $$ \operatorname{ch}M=\operatorname{ch}M'+\operatorname{ch}M'' $$ or $$ \operatorname{ch}M'-\operatorname{ch}M+\operatorname{ch}M''=0 $$

if we have a long exact sequence, we still get a similar alternating sum = 0
- why? Euler-Poincare mapping : a long exact sequence can be decomposed into short exact sequences.
- then the Euler characteristic of a resolution makes sense
goal : realize the alternating sum \ref{WCF} as an Euler characteristic of a suitable resolution of $L(\lambda)$
The BGG resolution resolves a finite-dimensional simple $\mathfrak{g}$-module $L(\lambda)$ by direct sums of Verma modules indexed by weights "of the same length" in the orbit $W\cdot \lambda$

thm (Bernstein-Gelfand-Gelfand Resolution)

Fix $\lambda\in \Lambda^{+}$. There is an exact sequence of Verma modules $$ 0 \to M({w_0\cdot \lambda})\to \cdots \to \bigoplus_{w\in W, \ell(w)=k}M({w\cdot \lambda})\to \cdots \to M({\lambda})\to L({\lambda})\to 0 $$ where $\ell(w)$ is the length of the Weyl group element $w$, $w_0$ is the Weyl group element of maximal length. Here $\rho$ is half the sum of the positive roots.

example of BGG resolution

$\mathfrak{sl}_2$

$L({\lambda})$ : irreducible highest weight module
- weights $\lambda ,-2+\lambda ,\cdots, -\lambda$
$M({\lambda})$ : Verma modules
- weights $\lambda ,-2+\lambda ,\cdots, -\lambda, -\lambda-2,\cdots$

thm

If $\lambda\in \Lambda^+$, the maximal submodule $N(\lambda)$ of $M(\lambda)$ is the sum of submodules $M(s_i\cdot \lambda)$ for $1\le i \le l$, where $l$ is the rank of $\mathfrak{g}$.

$s_{1}(\lambda+\rho)=-\lambda-\rho$, $s_{1}\cdot \lambda=-\lambda-2\rho$
if we identity $\Lambda = \mathbb{Z} \omega_1$ with $\mathbb{Z}$, then $\rho=1,\alpha=2$
we have

$$L({\lambda})=M({\lambda})/M({-\lambda-2})$$ or \[0\to M({-\lambda-2})\to M({\lambda})\to L({\lambda})\to 0\]

this gives a BGG resolution
character of $L({\lambda})$ = alternating sum of characters of Verma modules

\[\operatorname{ch}{L({\lambda})}=\operatorname{ch}{M({\lambda})}-\operatorname{ch}{M({-\lambda-2})}=\frac{e^{\lambda}}{1-e^{-2}}-\frac{e^{-\lambda-2}}{1-e^{-2}}\]

comparison with Weyl-Kac character formula

\[\operatorname{ch} L({\lambda})=\frac{\sum_{w\in W} (-1)^{\ell(w)}e^{w(\lambda+\rho)}}{e^{\rho}\prod_{\alpha>0}(1-e^{-\alpha})}=\frac{e^{\lambda+1}-e^{-\lambda-1}}{e^{1}(1-e^{-2})}\]

In general, there are more terms involved in a BGG resolution and choosing right homomorphisms is not easy
we take a detour

weak BGG resolution

def

We say that $M \in O$ has a standard filtration (also called a Verma flag) if there is a sequence of submodules

$$0 = M_0 \subset M_1 \subset M_2 \subset \cdots \subset M_n = M$$ for which each $M^i := M_i/M_{i−1}\, (1 \le i \le n)$ is isomorphic to a Verma module.

thm (Weak BGG resolution)

There is an exact sequence $$ 0 \to M({w_0\cdot \lambda}) = D_m^{\lambda} \to D_{m-1}^{\lambda} \to \cdots \to D_1^{\lambda} \to D_0^{\lambda}=M(\lambda) \to L(\lambda) \to 0 $$ where $D_{k}^{\lambda}$ has a standard filtration involving exactly once each of the Verma modules $M(w\cdot \lambda)$ with $\ell(w)=k$

strategy to construct a BGG resolution

construct a relative version of standard resoultion $D_k:=U(\mathfrak{g})\otimes_{U(\mathfrak{b})}\Lambda^{k}(\mathfrak{g}/\mathfrak{b})$ for $\lambda=0$
construct a weak BGG resolution $D_k^0:=D_k^{\chi_{0}}$ for $L(0)$ by cutting down to the principal block component of each term
construct a weak BGG resolution $D_k^\lambda : = (D_k^0\otimes L(\lambda))^{\chi_{\lambda}}$ for $L(\lambda)$ (we can also do this by applying the translation functor)
show that it is actually a BGG resolution by computing $\operatorname{Ext}$ between Verma modules

standard resolution of trivial module

free $U(\mathfrak{g})$-modules $U(\mathfrak{g})\otimes_{\mathbb{C}}\Lambda^{k}(\mathfrak{g})$
standard resolution of trivial module in Lie algebra cohomology

$$\cdots \to U(\mathfrak{g})\otimes_{\mathbb{C}}\Lambda^{k}(\mathfrak{g})\to U(\mathfrak{g})\otimes_{\mathbb{C}}\Lambda^{k-1}(\mathfrak{g})\to \cdots \to U(\mathfrak{g})\otimes_{\mathbb{C}}\Lambda^{0}(\mathfrak{g})\to L(0)$$

the sequence of modules $D_k:=U(\mathfrak{g})\otimes_{U(\mathfrak{b})}\Lambda^{k}(\mathfrak{g}/\mathfrak{b})$ is a relative version of the standard resolution
we can describe $D_0$ and $D_m$ explicitly
define $\partial_k : D_k \to D_{k-1}$ as

$$ \begin{align} \partial_k ( u\otimes \xi_1 \wedge \cdots \xi _k): &= \sum_{i=1}^k(-1)^{i+1}(uz_i\otimes \xi_1\wedge \cdots \hat{\xi_i}\wedge \cdots \xi_k)\\ &+\sum_{1\le i<j \le k} (-1)^{i+j}(u \otimes \overline{[z_iz_j]}\wedge \xi_1\wedge \cdots \hat{\xi_i}\wedge \cdots \hat{\xi_j} \cdots \xi_k) \end{align} $$

need to show that it is actually a complex and exact
- see Knapp, Lie Groups, Lie Algebras, and Cohomology IV.6

weights of exterior powers

Q. what are the weights of $\wedge^k (\mathfrak{g}/\mathfrak{b})$ as $\mathfrak{b}$-module? A : sum of $k$ distinct negative roots
let us find Verma modules in a standard filtration of $D_k$

claim

$D_k$ has a standard filtration with Verma subquotients associated to sums of$k$ distinct negative roots.

proof

Let $V$ be a finite-dimensional $U(\mathfrak{b})$-module. Define $M=U(\mathfrak{g})\otimes_{U(\mathfrak{b})} V$.

Find all weights of $M$ and these weights give the Verma subquotients in a standard filtration.

This is the main argument of Proof in Theorem 3.6) ■

claim

$D_k^0$ has a standard filtration

proof

Taking the principal block preserves exactness :

if we apply it to $0\to M' \to M \to M(\mu)\to 0$, $0\to (M')^0 \to M^0 \to (M(\mu))^0 \to 0$.

the Verma quotient becomes either 0 or itself. ■

now we want to find the relevant Verma modules
let $\beta$ be a sum of $k$ distinct negative roots. Which $\beta$ is linked to $0$ or there exsits $w\in W$ such that $w\cdot 0=\beta$?
first each $w$ gives $\beta_w:=w\cdot 0$ which is also a sum of elements in $w \Phi^+ \cap \Phi^-$ and it satisfies

$ \ell(w)=|w \Phi^+ \cap \Phi^-| $

as $|W\cdot 0|=|W|$, each $\beta_w$ is distinct
thus we have found the principal block $D_k^0$ and Verma modules in its standard filtration

tensoring with simple module

based on Remark in 6.2
study $D_k^\lambda : = (D_k^0\otimes L(\lambda))^{\chi_{\lambda}}$
we want to know all Verma modules involved in a standard filtration of $D_k^\lambda$

claim

$D_k^0\otimes L(\lambda)$ has a standard filtration and taking the principal block does no harm in constructing standard filtration.

proof

Use

thm (3.6)

Let $M$ be a finite dimensional $U(\mathfrak{g})$-module. For any $\lambda\in \mathfrak{h}^{*}$, the tensor product $T:=M(\lambda)\otimes M$ has a finite filtration with quotients isomorphic to Verma modules of the form $M(\lambda+\mu)$. Here $\mu$ ranges over the weights of $M$, each occurring $\dim M_{\mu}$ times in the filtration.

claim

$D_k^0\otimes L(\lambda)$ has a standard filtration.

proof

Tensoring with a finite-dimensional representation is an exact functor in BGG category (thm 1.1).

In other words, $0\to N\to M \to M(\lambda)\to 0$ implies $0\to N\otimes L(\lambda)\to M\otimes L(\lambda) \to M(\lambda)\otimes L(\lambda)\to 0$

One can use this fact to construct a standard filtration on $D_k^0 \otimes L(\lambda)$ from a standard filtration of $D_k^0$. ■

first, find all Verma modules involved in a standard filtration of $D_k^0\otimes L(\lambda)$ : those associated to $w\cdot 0 + \mu$
then determine which Verma modules are linked to $w\cdot \lambda$ : Ans. $\mu = w\lambda$
as $\lambda$ is the highest weight in $L(\lambda)$ and thus with weight multiplicity 1, we also know that the Verma modules appear only once

extensions of Verma modules

$\mu, \lambda\in \mathfrak{h}^{*}$
$\mu \uparrow \lambda$ if $\mu = \lambda$ or there is a root $\alpha$ such that $\mu=s_{\alpha}\cdot \lambda < \lambda $
we say $\mu$ is strongly linked to $\lambda$ if $\mu = \lambda$ or there exist root $\alpha_1,\cdots, \alpha_r\in \Phi^+$ such that $\mu=(s_{\alpha_1}\cdots s_{\alpha_r})\cdot \lambda \uparrow (s_{\alpha_2}\cdots s_{\alpha_r})\cdot \lambda \uparrow ( s_{\alpha_r})\cdot \lambda \uparrow \cdots \uparrow \lambda $

def (Bruhat ordering)

Define a partial order on the elements of $W$ as follows :

The vertex set is the set of elements of the Coxeter group and the edge set consists of directed edges $(u, v)$ whenever $u = t v$ for some reflection $t$ and $\ell(u) < \ell(v)$.

example : http://groupprops.subwiki.org/wiki/File:Bruhatons3.png

thm

Let $\lambda\in \mathfrak{h}^{*}$.

(a) If $\operatorname{Ext}_{\mathcal{O}}(M(\mu),M(\lambda))\neq 0$ for $\mu\in \mathfrak{h}^{*}$, then $\mu \uparrow \lambda$ but $\mu \neq \lambda$

(b) Let $\lambda\in \Lambda^{+}$ and $w,w'\in W$. If $\operatorname{Ext}_{\mathcal{O}}(M(w'\cdot\lambda),M(w\cdot\lambda))\neq 0$, then $w<w'$ in the Bruhat ordering. In particular, $\ell(w)<\ell(w')$.

Now use induction on the length of standard filtration
if we have $0\to \oplus M_{w\cdot \lambda}\to D_k^{\lambda} \to M(w'\cdot \lambda) \to 0$, then as $\operatorname{Ext}\left(M(w'\cdot \lambda ),\oplus M(w\cdot \lambda)\right)$ is zero since it is additive. Then we obtain a split extension.

memo

proof of Thm 3.6 uses the following (we don't need this for our goal)

thm Tensor Identity (56p)

Let $M$ be a $U(\mathfrak{g})$-module and $L$ a $U(\mathfrak{b})$-module. Then $$ (U(\mathfrak{g})\otimes_{U(\mathfrak{b})}L)\otimes M \cong U(\mathfrak{g})\otimes_{U(\mathfrak{b})}(L \otimes M) $$

prop (3.7)

Let $M\in \mathcal{O}$ have a standard filtration. If $\lambda$ is maximal among the weights of $M$, then $M$ has a submodule isomorphic to $M(\lambda)$ and $M/M(\lambda)$ has a standard filtration.

overview

principal block : filtering through central characters
- is a block a $U(\mathfrak{g})$-submodule? yes
- how to check that it preserves the exactness : any homomorphism between modules belonging to different blocks will be zero
- how to describe $\chi_{\lambda}$? use the twisted Harish-Chandra homomorphism $\psi : Z(\mathfrak{g})\to S(\mathfrak{h})$. we have

$$ \chi_{\lambda}(z)=(\lambda+\rho)(\psi(z)),\quad z\in Z(\mathfrak{g}) $$

- see 26p for an example of $\chi_{\lambda}$ in type $A_1$
combinatorial results
- longest elements satisfies $w_0\cdot 0 = -2\rho$ (related to diagram automorphism)
- consider the set of sum of k distinct roots. Which elements are linked to $0$?
- Bruhat ordering
Bruhat ordering and strong linkage relation
- let $\lambda \in \Lambda^+$ (which is regular for the dot-action of $W$)
- $w'\cdot \lambda< w \cdot \lambda $ translates into $w < w'$ in the Bruhat ordering
strong linkage relation and extension of Verma modules
for exterior powers, see Lie Algebras of Finite and Affine Type by Carter