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The Steinberg tensor product theorem is a fundamental result in the modular representation theory of reductive algebraic groups. It describes any finite-dimensional simple module of highest weight over such a group as the tensor product of Frobenius twists of simple modules with highest weights the weights appearing in a p-adic decomposition of, thereby reducing the character problem to a a finite collection of weights. In recent years this theorem has been extended to various quasi-reductive supergroup schemes. In this paper, we prove the analogous result for the general linear group scheme GL (X) for any object X in the Verlinde category Verₚ.
Arun S. Kannan (Wed,) studied this question.
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