Author:
Burns R.G.,Herfort W.N.,Kam S.-M.,Macedońska O.,Zalesskii P.A.
Abstract
Motivated by a well-known conjecture of Andrews and Curtis, we consider the question as to how in a given n-generator group G, a given set of n “annihilators” of G, that is, with normal closure all of G, can be transformed by standard moves into a generating n-tuple. The recalcitrance of G is defined to be the least number of elementary standard moves (”elementary M-transformations”) by means of which every annihilating n-tuple of G can be transformed into a generating n-tuple. We show that in the classes of finite and soluble groups, having zero recalcitrance is equivalent to nilpotence, and that a large class of 2-generator soluble groups has recalcitrance at most 3. Some examples and remarks are included.
Publisher
Cambridge University Press (CUP)
Cited by
4 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献
1. On Andrews–Curtis conjectures for soluble groups;International Journal of Algebra and Computation;2018-02
2. Recalcitrance in groups II;Journal of Group Theory;2012-01-01
3. Recalcitrance in groups – CORRIGENDUM;Bulletin of the Australian Mathematical Society;2008-06
4. BREADTH-FIRST SEARCH AND THE ANDREWS–CURTIS CONJECTURE;International Journal of Algebra and Computation;2003-02