The \(K(n)\)-Euler characteristic of extraspecial \(p\)-groups
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Publication:1840474
DOI10.1016/S0022-4049(99)00102-4zbMath0964.55007MaRDI QIDQ1840474
Publication date: 13 July 2001
Published in: Journal of Pure and Applied Algebra (Search for Journal in Brave)
Cohomology of groups (20J06) Generalized (extraordinary) homology and cohomology theories in algebraic topology (55N20)
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- The mod p cohomology rings of the nonabelian split metacyclic p-groups
- The mod p cohomology algebra of the group \(M(p^ n)\)
- Complex \(K\)-theory of \(B\text{SL}_ 3({\mathbb{Z}{}})\)
- The mod 2 cohomology rings of extra-special 2-groups and the spinor groups
- The varieties of the mod p cohomology rings of extra special p-groups for an odd prime p
- The Morava K-Theories of Some Classifying Spaces
- The Cohomology of Extraspecial Groups
- The mod-p cohomology rings of some p-groups
- Corrigendum: ‘the Cohomology of Extraspecial groups’
- Morava 𝐾-theories and finite groups
- The mod p cohomology group of extra-special p-group of order p5 and of exponent p2
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