Clebsch-Gordan and the theta filtration for modular representations of GL2( Fq)
Abstract
Let p be a prime. We solve two problems in the mod p representation theory of GL2(Fq) where q=pf. We first prove a Clebsch-Gordan decomposition theorem for the tensor product of two mod p representations of GL2(Fq). As an application, we use this to guess the structure of quotients of symmetric power representations of GL2(Fq) by submodules in the theta filtration. We then give a direct proof of this structure showing that such quotients are built out of principal series representations.
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