Mod 2 Morava K-theory for Frobenius complements of exponent dividing 2^n   9

Malkhaz Bakuradze

arXiv:1101.2538·math.AT·January 14, 2011

Mod 2 Morava K-theory for Frobenius complements of exponent dividing 2^n 9

Malkhaz Bakuradze

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TL;DR

This paper computes the mod 2 Morava K-theory cohomology rings for all finite Frobenius complements of certain exponents, advancing understanding of their algebraic topology.

Contribution

It provides explicit calculations of K(s)*(BG) for a broad class of finite groups with Frobenius complements of specific exponents.

Findings

01

Cohomology rings determined for all such groups

02

Explicit descriptions of K(s)*(BG) provided

03

Enhances understanding of group cohomology in algebraic topology

Abstract

We determine the cohomology rings K(s)*(BG) at 2 for all finite Frobenius complements G of exponent dividing 2n 9.

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Taxonomy

TopicsAlgebraic and Geometric Analysis · Finite Group Theory Research · Advanced Topics in Algebra