A weight-formula for all highest weight modules, and a higher order parabolic category O

Abstract

Let g be a complex Kac-Moody algebra, with Cartan subalgebra h. Also fix a weight λ∈h*. For M(λ) V an arbitrary highest weight g-module, we provide a cancellation-free, non-recursive formula for the weights of V. This is novel even in finite type, and is obtained from λ and a collection H=HV of independent sets in the Dynkin diagram of g that are associated to V. Our proofs use and reveal a finite family (for each λ) of "higher order Verma modules" M(λ,H) - these are all of the universal modules for weight-considerations. They (i) generalize and subsume parabolic Verma modules M(λ,J), and (ii) have pairwise distinct weight-sets, which exhaust the weight-sets of all modules M(λ) V. As an application, we explain the sense in which the modules M(λ) of Verma and M(λ,JV) of Lepowsky are respectively the zeroth and first order upper-approximations of every V, and continue to higher order upper-approximations Mk(λ,HV) (and to lower-approximations). We determine every kth order integrability of V. We then introduce the category OH⊂O, which is a higher order parabolic analogue that contains the higher order Verma modules M(λ,H). We show that OH has enough projectives, and also initiate the study of BGG reciprocity, by proving it for all OH over g=sl2 n. Finally, we provide a BGG resolution for our universal modules M(λ,H) in certain cases including all rank-3 g; this yields their Weyl-type character formulas, with the actions of parabolic Weyl semigroups.