Udayan B. Darji, Márton Elekes, Kende Kalina, Viktor Kiss, Zoltán Vidnyánszky
Published 2018-08-16Version 1
In order to understand the structure of the "typical" element of an automorphism group, one has to study how large the conjugacy classes of the group are. For the case when typical is meant in the sense of Baire category, Truss proved that there is a co-meagre conjugacy class in Aut(Q, <), the automorphism group of the rational numbers. Following Dougherty and Mycielski we investigate the measure theoretic dual of this problem, using Christensen's notion of Haar null sets. We give a complete description of the size of the conjugacy classes of Aut(Q, <) with respect to this notion. In particular, we show that there exist continuum many non-Haar null conjugacy classes, illustrating that the random behaviour is quite different from the typical one in the sense of Baire category.
Comments: Most of this work previously appeared in the first version of the paper arXiv:1705.07593 which was split into 3 articles, including arXiv:1808.06121
The structure of random automorphisms
On the automorphism group of the universal homogeneous meet-tree
An automorphism group of an omega-stable structure that is not locally (OB)
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