Mathematics – Logic
Scientific paper
1998-08-21
Mathematics
Logic
10 pages. This is the text of a talk given for the Mathematical Society of Japan at their annual conference in Osaka, Japan on
Scientific paper
The automorphism tower of a group is obtained by computing its automorphism group, the automorphism group of THAT group and so on, iterating transfinitely. Each group maps into the next using inner automorphisms and one takes a direct limit at limit stages. The question is whether the process ever terminates in a fixed point, a group which is isomorphic to its automorphism group by the natural map. In this talk I will prove that every group has a terminating automorphism tower. After this, I will discuss the set-theoretic aspects of the height of the automorphism tower of a group, and sketch my recent proof with Simon Thomas that it is consistent to have a group whose automorphism tower is wildly modified by forcing; indeed, in various models of set theory the automorphism tower of this very same group can be almost arbitrarily specified.
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