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Classification of indecomposable Abelian (v, 5)-groups
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A. A. Frolov
Veröffentlicht/Copyright:
9. Mai 2008
Abstract
The description of the (v, 3)-groups was given previously, it appears that all such groups are Abelian. It is known that there are non-Abelian (v, 5)-groups. In this paper, a description of the Abelian (v, 5)-groups is given.
Received: 2004-12-12
Revised: 2005-10-25
Published Online: 2008-05-09
Published in Print: 2008-March
© de Gruyter 2008
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- Random polynomials over a finite field
- Random permutations with cycle lengths in a given finite set
- The Kloss convergence principle for products of random variables with values in a compact group and distributions determined by a Markov chain
- On enumeration of labelled connected graphs by the number of cutpoints
- Skew Laurent series rings and the maximum condition on right annihilators
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- Classification of indecomposable Abelian (v, 5)-groups
Artikel in diesem Heft
- Random polynomials over a finite field
- Random permutations with cycle lengths in a given finite set
- The Kloss convergence principle for products of random variables with values in a compact group and distributions determined by a Markov chain
- On enumeration of labelled connected graphs by the number of cutpoints
- Skew Laurent series rings and the maximum condition on right annihilators
- A block algorithm of Lanczos type for solving sparse systems of linear equations
- On complexity of the anti-unification problem
- Classification of indecomposable Abelian (v, 5)-groups
