Abstract
A free product sixth-group (FPS-group) is, roughly speaking, a free product of groups with a number of additional defining relators, where, if two of these relators have a subword in common, then the length of this subword is less than one sixth of the lengths of either of the two relators.Britton [1,2] has proved a general algebraic result for FPS-groups and has used this result in a discussion of the word problem for such groups.
Publisher
Cambridge University Press (CUP)
Cited by
14 articles.
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1. Small cancellation theory over Burnside groups;Advances in Mathematics;2019-09
2. Model-theoretic and algorithmic questions in group theory;Journal of Soviet Mathematics;1985-11
3. Cohomology and finite subgroups of small cancellation quotients of free products;Mathematical Proceedings of the Cambridge Philosophical Society;1985-03
4. Real elements in small cancellation groups;Mathematische Annalen;1974-12
5. References;Noneuclidean Tesselations and Their Groups;1974