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Conjugation of injections by permutations

Published 2010-03-10Version 1

Let X be a countably infinite set, and let f, g, and h be any three injective self-maps of X, each having at least one infinite cycle. (For instance, this holds if f, g, and h are not bijections.) We show that there are permutations a and b of X such that h=afa^{-1}bgb^{-1} if and only if |X\Xf|+|X\Xg|=|X\Xh|. We also prove a version of this statement that holds for infinite sets X that are not necessarily countable. This generalizes results of Droste and Ore about permutations.

Comments: 27 pages, 4 figures

Journal: Semigroup Forum, Volume 81, (2010) 297-324

DOI: 10.1007/s00233-010-9224-3

Categories: math.GR

Subjects: 20M20, 20B30, 20B07

Keywords: permutations, conjugation, injections, countably infinite set, infinite cycle

Tags: journal article

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Conjugation of injections by permutations

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