Morava K-Theories of p-Groups with Cyclic Maximal Subgroups and Other Related Groups |
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Authors: | Maurizio Brunetti |
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Institution: | (1) Dipartimento di Matematica e Applicazioni, Università di Napoli, Via Claudio 21, I-80125 Naples, Italy |
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Abstract: | Let P be a non-Abelian finite p-group, p odd, with cyclic maximal subgroups, and let K(n)*(–) denote the nth Morava K-theory at p. In this paper we determine the algebras K(n)*(BP) and K(n)*(BG) for all groups G with Sylow p-subgroups isomorphic to P, giving further evidence for the fact that Morava K-theory as an invariant of finite groups, is finer than ordinary modp cohomology.
Mathematics Subject Classifications (2000): 55N20, 55N22. |
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Keywords: | Morava K-theory classifying spaces |
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