We construct a natural map from the set [BG,BU(n)] into a set of characters
of the Sylow p-subgroups of G and prove that this natural map is a surjection
for all finite groups G of rank two. We show, furthermore, that this same
natural map is in fact a bijection for two types of finite groups G: those with
periodic cohomology and those of rank two with odd order.Comment: 14 page

Jackson, Michael A.

English

arXiv

AbstractLet Gp be a Sylow p-subgroup of the finite group G and let CharnG(Gp) represent the set of degree n complex characters of Gp that are the restrictions of class functions on G. We construct a natural map ψG:[BG,BU(n)]→∏p||G|CharnG(Gp) and prove that ψG is a surjection for all finite groups G that do not contain a subgroup isomorphic to (Z/p)3 for any prime p. We show, furthermore, that ψG is in fact a bijection for two types of finite groups G: those with periodic cohomology and those of odd order that do not contain a subgroup isomorphic to (Z/p)3 for any prime p

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A quotient of the set [BG,BU(n)] for a finite group G of small rank 

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A Quotient of the Set [BG, BU(n)] for a Finite Group G of Small Rank

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