Regular completions of Zn-free groups
Abstract
In the present paper we continue studying regular free group actions on Zn-trees. We show that every finitely generated Zn-free group G can be embedded into a finitely generated Zn-free group H acting regularly on the underlying Zn-tree (we call H a regular Zn-completion of G) so that the action of G is preserved. Moreover, if G is effectively represented as a group of Zn-words then the construction of H is effective and H is also effectively represented as a group of Zn-words.
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