On complete reducibility of tensor products of simple modules over simple algebraic groups

Let G be a simply connected simple algebraic group over an al- gebraically closed ﬁeld k of characteristic p > 0. The category of rationalG-modules is not semisimple. We consider the question of when the tensorproduct of two simple G-modules L(λ) and L(μ) is completely reducible. Using some technical results about weakly maximal vectors (i.e. maximal vectors for the action of the Frobenius kernel G1 of G) in tensor products, we obtain a reduction to the case where the highest weights λ and μ are p-restricted. In this case, we also prove that L(λ)⊗L(μ) is completely reducible as a G-module if and only if L(λ) ⊗ L(μ) is completely reducible as a G1 -module.

On complete reducibility of tensor products of simple modules over simple algebraic groups

Multiplicity-free Representations of Algebraic Groups

Cohomology in singular blocks of parabolic category O

Almost cyclic regular semisimple elements in irreducible representations of simple algebraic groups

Multiplicity-free Representations of Algebraic Groups

Almost cyclic regular semisimple elements in irreducible representations of simple algebraic groups

Cohomology in singular blocks of parabolic category O