U(h)-finite modules and weight modules I: weighting functors, almost-coherent families and category Airr
Abstract
This paper builds upon J. Nilsson's classification of rank one U(h)-free modules by extending the analysis to modules without rank restrictions, focusing on the category A of U(h)-finite g-modules. A deeper investigation of the weighting functor W and its left derived functors, W*, led to the proof that simple U(h)-finite modules of infinite dimension are U(h)-torsion free. Furthermore, it is shown that these modules are U(h)-free if they possess non-integral or singular central characters. It is concluded that the existence of U(h)-torsion-free g-modules is restricted to Lie algebras of types A and C. The concept of an almost-coherent family, which generalizes O. Mathieu's definition of coherent families, is introduced. It is proved that W(M), for a U(h)-torsion-free module M, falls within this class of weight modules. Furthermore, a notion of almost-equivalence is defined to establish a connection between irreducible semi-simple almost-coherent families and O. Mathieu's original classification. Progress is also made in classifying simple modules within the category Airr, which consists of U(h)-finite modules M with the property that W(M) is an irreducible almost-coherent family. A complete classification is achieved for type C, with partial classification for type A. Finally, a conjecture is presented asserting that all simple sl(n+1)-modules in Airr are isomorphic to simple subquotients of exponential tensor modules, and supporting results are proved.
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