Category O Explained

In the representation theory of semisimple Lie algebras, Category O (or category

l{O}

) is a category whose objects are certain representations of a semisimple Lie algebra and morphisms are homomorphisms of representations.

Introduction

Assume that

ak{g}

is a (usually complex) semisimple Lie algebra with a Cartan subalgebra

ak{h}

\Phi

is a root system and

\Phi⁺

is a system of positive roots. Denote by

ak{g}_\alpha

the root space corresponding to a root

\alpha\in\Phi

and

ak{n}:=oplus
	\alpha\in\Phi⁺

ak{g}_\alpha

a nilpotent subalgebra.

is a

ak{g}

-module and

λ\inak{h}^*

, then

M_λ

is the weight space

M_λ=\{v\inM:\forallh\inak{h}h ⋅ v=λ(h)v\}.

Definition of category O

The objects of category

are

ak{g}

-modules

such that

is finitely generated

	*}
M=oplus
	λ\inak{h

M_λ

is locally

ak{n}

-finite. That is, for each

v\inM

, the

ak{n}

-module generated by

is finite-dimensional.

Morphisms of this category are the

ak{g}

-homomorphisms of these modules.

Basic properties

Each module in a category O has finite-dimensional weight spaces.
Each module in category O is a Noetherian module.
O is an abelian category
O has enough projectives and injectives.
O is closed under taking submodules, quotients and finite direct sums.
Objects in O are

Z(ak{g})

-finite, i.e. if

is an object and

v\inM

, then the subspace

Z(ak{g})v\subseteqM

generated by

under the action of the center of the universal enveloping algebra, is finite-dimensional.

Examples

All finite-dimensional

ak{g}

-modules and their

ak{g}

-homomorphisms are in category O.

Verma modules and generalized Verma modules and their

ak{g}

-homomorphisms are in category O.

Category O Explained

Introduction

Definition of category O

Basic properties

Examples

See also