Small, nm-stable compact G-groups
Abstract
We prove that if (H,G) is a small, nm-stable compact G-group, then H is nilpotent-by-finite, and if additionally (H) ≤ ω, then H is abelian-by-finite. Both results are significant steps towards the proof of the conjecture that each small, nm-stable compact G-group is abelian-by-finite. We give examples of small, nm-stable compact G-groups of infinite ordinal -rank, providing counter-examples to the -gap conjecture.
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