Modular Representations of Truncated current Lie algebras
Abstract
In this paper we consider the structure and representation theory of truncated current algebras gm = g[t]/(tm+1) associated to the Lie algebra g of a standard reductive group over a field of positive characteristic. We classify semisimple and nilpotent elements and describe their associated support varieties. Next, we prove various Morita equivalences for reduced enveloping algebras, including a reduction to nilpotent p-characters, analogous to a famous theorem of Friedlander--Parshall. We go on to give precise upper bounds for the dimensions of simple modules for all p-characters, and give lower bounds on these dimensions for homogeneous p-characters. We then develop the theory of baby Verma modules for homogeneous p-characters and, whenever the p-character has standard Levi type, we give a full classification of the simple modules. In particular we classify all simple modules with homogeneous p-characters for gm when g = gln. Finally, we compute the Cartan invariants for the restricted enveloping algebra U0(gm) and show that they can be described by precise formulae depending on decomposition numbers for U0(g).
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