"Representations of symmetrizable Kac-Moody algebras"의 두 판 사이의 차이

2020년 11월 16일 (월) 10:07 기준 최신판

introduction

Let \(L(A)\) be a symmetrizable Kac-Moody algebra
the category \(\mathcal{O}\)
Integrable modules

the category \(\mathcal{O}\)

\(V\) is an object in \(\mathcal{O}\)

\(V=\oplus_{\lambda\in \mathfrak{h}^{*}}V_{\lambda}\)
\(\dim V_{\lambda}\) is finite for each \(\lambda\in \mathfrak{h}^{*}\)
there exists a finite set \(\lambda_1,\cdots, \lambda_s\in \mathfrak{h}^{*}\) such that each \(\lambda\) with \(V_{\lambda}\neq 0\) satisfies \(\lambda \prec \lambda_i\) for some \(i\in \{1,\cdots, s\}\)

integrable module

An \(L(A)\)-module \(V\) is called integrable if

\[ V=\oplus_{\lambda\in \mathfrak{h}^{*}}V_{\lambda} \] and if \(e_i : V\to V\) and \(f_i : V\to V\) are locally nilpotent for all \(i\)

Thm

Let \(L(A)\) be a symmetrizable Kac-Moody algebra and \(L(\lambda)\) be an irreducible \(L(A)\)-module in the category \(\mathcal{O}\). Then \(L(\lambda)\) is integrable if and only if \(\lambda\) is dominant and integral.

Weyl-Kac character formula

related items

BGG category and BGG resolution

@@ 1번째 줄: / 1번째 줄: @@
 ==introduction==
-* Let $L(A)$ be a symmetrizable Kac-Moody algebra
+* Let <math>L(A)</math> be a symmetrizable Kac-Moody algebra
 * the category <math>\mathcal{O}</math>
 * Integrable modules
-==the category $\mathcal{O}$==
+==the category <math>\mathcal{O}</math>==
-* $V$ is an object in $\mathcal{O}$
+* <math>V</math> is an object in <math>\mathcal{O}</math>
-# $V=\oplus_{\lambda\in \mathfrak{h}^{*}}V_{\lambda}$
+# <math>V=\oplus_{\lambda\in \mathfrak{h}^{*}}V_{\lambda}</math>
-# $\dim V_{\lambda}$ is finite for each $\lambda\in \mathfrak{h}^{*}$
+# <math>\dim V_{\lambda}</math> is finite for each <math>\lambda\in \mathfrak{h}^{*}</math>
-# there exists a finite set $\lambda_1,\cdots, \lambda_s\in \mathfrak{h}^{*}$ such that each $\lambda$ with $V_{\lambda}\neq 0$ satisfies $\lambda \prec \lambda_i$ for some $i\in \{1,\cdots, s\}$
+# there exists a finite set <math>\lambda_1,\cdots, \lambda_s\in \mathfrak{h}^{*}</math> such that each <math>\lambda</math> with <math>V_{\lambda}\neq 0</math> satisfies <math>\lambda \prec \lambda_i</math> for some <math>i\in \{1,\cdots, s\}</math>
 ==integrable module==
-* An $L(A)$-module $V$ is called integrable if
+* An <math>L(A)</math>-module <math>V</math> is called integrable if
-$$
+:<math>
 V=\oplus_{\lambda\in \mathfrak{h}^{*}}V_{\lambda}
-$$
+</math>
-and if $e_i : V\to V$ and $f_i : V\to V$ are locally nilpotent for all $i$
+and if <math>e_i : V\to V</math> and <math>f_i : V\to V</math> are locally nilpotent for all <math>i</math>
 ;Thm
-Let $L(A)$ be a symmetrizable Kac-Moody algebra and $L(\lambda)$ be an irreducible $L(A)$-module in the category $\mathcal{O}$. Then $L(\lambda)$ is integrable if and only if $\lambda$ is dominant and integral.
+Let <math>L(A)</math> be a symmetrizable Kac-Moody algebra and <math>L(\lambda)</math> be an irreducible <math>L(A)</math>-module in the category <math>\mathcal{O}</math>. Then <math>L(\lambda)</math> is integrable if and only if <math>\lambda</math> is dominant and integral.
 * [[Weyl-Kac character formula]]