The -modular representation of reductive groups over finite local rings of length two
Abstract
Let O2 and O'2 be two distinct finite local rings of length two with residue field of characteristic p. Let G(O2) and G(O'2), be the group of points of any reductive group scheme G over Z such that p is very good for G × Fq. We prove that there exists an isomorphism of group algebra K[G(O2)] K[G(O'2)], where K is a sufficiently large field of characteristic different from p.
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