Borovik, A. V. and Khukhro, E. I. and Myasnikov, A. G.
(2003)
*The Andrews-Curtis conjecture and black box groups.*
International Journal of Algebra and Computation, 13
(4).
pp. 415-436.
ISSN 0218-1967

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Item Type: | Article |
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Item Status: | Live Archive |

## Abstract

The paper discusses the Andrews-Curtis graph Î�Îº(G, N) of a normal subgroup N in a group G. The vertices of the graph are Îº-tuples of elements in N which generate N as a normal subgroup; two vertices are connected if one of them can be obtained from another by certain elementary transformations. This object appears naturally in the theory of black box finite groups and in the Andrews-Curtis conjecture in algebraic topology 3. We suggest an approach to the Andrews-Curtis conjecture based on the study of Andrews-Curtis graphs of finite groups, discuss properties of Andrews-Curtis graphs of some classes of finite groups and results of computer experiments with generation of random elements of finite groups by random walks on their Andrews-Curtis graphs.

Keywords: | Algebra, Sets |
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Subjects: | G Mathematical and Computer Sciences > G100 Mathematics |

Divisions: | College of Science > School of Mathematics and Physics |

Related URLs: | |

ID Code: | 15715 |

Deposited On: | 19 Nov 2014 12:00 |

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