JOURNAL ARTICLE
Hurwitz Equivalence in Tuples of Generalized Quaternion Groups and Dihedral Groups
Year: 2008 Journal: The Electronic Journal of Combinatorics Vol: 15 (1) Publisher: Electronic Journal of Combinatorics
Abstract
Let $Q_{2^m}$ be the generalized quaternion group of order $2^m$ and $D_N$ the dihedral group of order $2N$. We classify the orbits in $Q_{2^m}^n$ and $D_{p^m}^n$ ($p$ prime) under the Hurwitz action.
Keywords:
Dihedral group Mathematics Dicyclic group Quaternion Dihedral angle Combinatorics Cyclic group Group (periodic table) Order (exchange) Quaternion group Non-abelian group Prime (order theory) Equivalence (formal languages) Pure mathematics Symmetric group Alternating group Geometry Chemistry Abelian group
Metrics
8
Cited By
0.82
FWCI (Field Weighted Citation Impact)
4
Refs
0.71
Citation Normalized Percentile
Is in top 1%
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Citation History
Topics
Algebraic and Geometric Analysis
Physical Sciences → Mathematics → Applied Mathematics
Finite Group Theory Research
Physical Sciences → Mathematics → Discrete Mathematics and Combinatorics
Mathematics and Applications
Physical Sciences → Mathematics → Geometry and Topology
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