Mathematics > Logic
[Submitted on 7 May 2004 (v1), last revised 13 Nov 2005 (this version, v2)]
Title:The height of the automorphism tower of a group
View PDFAbstract: For a group G with trivial center there is a natural embedding of G into its automorphism group, so we can look at the latter as an extension of the group. So an increasing continuous sequence of groups, the automorphism tower, is defined, the height is the ordinal where this becomes fixed, arriving to a complete group. We first show that for any kappa=kappa^{aleph_0} there is a group of cardinality kappa with height>kappa^+ (improving the lower bound). Second we show that for many such kappa there is a group of height > 2^kappa, so proving that the upper bound essentially cannot be improved.
Submission history
From: Saharon Shelah's Office [view email] [via SHLHETAL proxy][v1] Fri, 7 May 2004 02:38:30 UTC (69 KB)
[v2] Sun, 13 Nov 2005 21:42:37 UTC (73 KB)
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