Conjugacy classes of maximal cyclic subgroups of metacyclic 𝑝-groups

Mariagrazia Bianchi; Rachel D. Camina; Mark L. Lewis

doi:10.17863/cam.91162

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Conjugacy classes of maximal cyclic subgroups of metacyclic 𝑝-groups

Mariagrazia Bianchi Rachel D. Camina Mark L. Lewis

Year: 2022 Journal: Journal of Group Theory Vol: 0 (0) Publisher: De Gruyter

DOI: 10.17863/cam.91162

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Abstract

Abstract In this paper, we set η ⁢ ( G ) \eta(G) to be the number of conjugacy classes of maximal cyclic subgroups of a finite group 𝐺. We compute η ⁢ ( G ) \eta(G) for all metacyclic 𝑝-groups. We show that if 𝐺 is a metacyclic 𝑝-group of order p n p^{n} that is not dihedral, generalized quaternion, or semi-dihedral, then η ⁢ ( G ) ≥ n - 2 \eta(G)\geq n-2 , and we determine when equality holds.

Keywords:

Combinatorics Conjugacy class Mathematics Dihedral group Physics Group (periodic table) Quantum mechanics

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Finite Group Theory Research

Physical Sciences → Mathematics → Discrete Mathematics and Combinatorics

Coding theory and cryptography

Physical Sciences → Computer Science → Artificial Intelligence

Geometric and Algebraic Topology

Physical Sciences → Mathematics → Geometry and Topology

Conjugacy classes of maximal cyclic subgroups of metacyclic 𝑝-groups

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