Christopher M. Drupieski
Published 2012-04-03, updated 2013-07-20Version 2
Let $G$ be a simply-connected semisimple algebraic group scheme over an algebraically closed field of characteristic $p > 0$. Let $r \geq 1$ and set $q = p^r$. We show that if a rational $G$-module $M$ is projective over the $r$-th Frobenius kernel $G_r$ of $G$, then it is also projective when considered as a module for the finite subgroup $\Gfq$ of $\Fq$-rational points in $G$. This salvages a theorem of Lin and Nakano (\emph{Bull.\ London Math.\ Soc.} 39 (2007) 1019--1028). We also show that the corresponding statement need not hold when the group $G$ is replaced by the unipotent radical $U$ of a Borel subgroup of $G$.
Comments: 7 pages. This version corrects a minor error in the paragraph before, and in the proof of, Theorem 3.3. The error appears in the published version
Journal: Bull. London Math. Soc. (2013) 45 (4): 715-720
On the values of unipotent characters of finite Chevalley groups of type $E_7$ in characteristic 2
Extensions for Finite Chevalley Groups III: Rational and Generic Cohomology
Primitive idempotents of the hyperalgebra for the $r$-th Frobenius kernel of ${\rm SL}(2,k)$
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