Andrew W. Sale
Published 2012-11-13, updated 2013-10-01Version 2
Determining the length of short conjugators in a group can be considered as an effective version of the conjugacy problem. The conjugacy length function provides a measure for these lengths. We study the behaviour of conjugacy length functions under group extensions, introducing the twisted and restricted conjugacy length functions. We apply these results to show that certain abelian-by-cyclic groups have linear conjugacy length function and certain semidirect products $\Z^d \rtimes \Z^k$ have at most exponential (if $k >1$) or linear (if $k=1$) conjugacy length functions.
Comments: 22 pages; 3 figures. For v2: added a section discussing the distortion functions, fixed minor errors and typos. For v1: some results of this paper also appear in "Short Conjugators in Solvable Groups" arXiv:1112.2721, however the main theme of this paper is new
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