Category O for Lie superalgebras

Abstract

The authors define a Category O for any quasi-reductive Lie superalgebra g with respect to a triangular decomposition. This much needed approach unifies many important constructions in the existing literature in a rigorous fashion. Our Category O encompasses all highest weight categories for Lie (super)algebras as well as specific examples which may not be highest weight categories. When the decomposition arises from a principal parabolic subalgebra p of g, the Category O exhibits rich homological properties. For one, the authors show that in contrast to the case of a semisimple Lie algebra, the Category O is standardly stratified. Furthermore, the categorical cohomology of O is a finitely generated ring. This provides a first step towards developing a support variety theory for Category O. It is shown that the complexity of modules in Category O is finite with an explicit upper bound given by the dimension of the subspace of the odd degree elements in g. This upgrades results known for gl(m|n) to the more general setting. Our arguments are based on foundational connections between the categorical cohomology and the relative Lie superalgebra cohomology as well as the interplay between Category O for g and the Category O for its corresponding Lie algebra g 0.