Classification of some cohomologically C0-stable continuous group actions on metric spaces
Abstract
After Katok, a homeomorphism f M M of a compact metric space is said to be cohomologically C0-stable if its space of real C0-coboundaries is closed in C0(M). Kocsard proved that this is the case if and only if f is periodic. We extend the classification to actions of arbitrary finitely generated groups: an action α: G Homeo(M) is cohomologically C0 - stable if and only if the image α(G) is a finite group. In particular this settles the case of Zk-actions generated by finitely many commuting homeomorphisms. Notably, no amenability assumption is needed: we explain why spectral-gap phenomena for non-amenable actions, which do produce cohomological stability in Hölder, Sobolev and L2 categories, are invisible to the uniform norm. We also discuss the genuinely different smooth category and state a conjecture regarding cohomological C∞-stability of Zk-action by smooth circle diffeomorphisms without periodic orbits, connecting the problem with works of Moser, Fayad-Khanin, Avila-Kocsard and Petković.
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