The Defining Characteristic Case of the Representations of $\mathrm{GL}_{n}$ and $\mathrm{SL}_{n}$ over Principal Ideal Local Rings

Nariel Monteiro

The Defining Characteristic Case of the Representations of GLn and SLn over Principal Ideal Local Rings

Abstract

Let Wr(Fq) be the ring of Witt vectors of length r with residue field Fq of characteristic p. In this paper, we study the defining characteristic case of the representations of GLn and SLn over the principal ideal local rings Wr(Fq) and Fq[t]/tr. Let G be either GLn or SLn and F a perfect field of characteristic p, we prove that for most p the group algebras F[G(Wr(Fq))] and F[G(Fq[t]/tr)] are not stably equivalent of Morita type. Thus, the group algebras F[G(Wr(Fq))] and F[G(Fq[t]/tr)] are not isomorphic in the defining characteristic case.

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