Periodicity in the cohomology of finite general linear groups via q-divided powers
Abstract
We show that n 0 Ht( GLn( Fq), F) canonically admits the structure of a module over the q-divided power algebra (assuming q is invertible in F), and that, as such, it is free and (for q ≠ 2) generated in degrees t. As a corollary, we show that the cohomology of a finitely generated VI-module in non-describing characteristic is eventually periodic in n. We apply this to obtain a new result on the cohomology of unipotent Specht modules.
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