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Automorphism groups over a hyperimaginary
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- Kim Byunghan
- Department of Mathematics, Yonsei University
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- Lee Hyoyoon
- Department of Mathematics, Yonsei University
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Description
<p>In this paper we study the Lascar group over a hyperimaginary 𝒆. We verify that various results about the group over a real set still hold when the set is replaced by 𝒆. First of all, there is no written proof in the available literature that the group over 𝒆 is a topological group. We present an expository style proof of the fact, which even simplifies existing proofs for the real case. We further extend a result that the orbit equivalence relation under a closed subgroup of the Lascar group is type-definable. On the one hand, we correct errors appeared in the book written by the first author and produce a counterexample. On the other hand, we extend Newelski's theorem that ‘a G-compact theory over a set has a uniform bound for the Lascar distances’ to the hyperimaginary context. Lastly, we supply a partial positive answer to a question about the kernel of a canonical projection between relativized Lascar groups, which is even a new result in the real context.</p>
Journal
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- Journal of the Mathematical Society of Japan
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Journal of the Mathematical Society of Japan 75 (1), 21-49, 2023
The Mathematical Society of Japan