Smoothing finite group actions on three-manifolds – John Pardon – ICM2018
Автор: Rio ICM2018
Загружено: 2018-10-17
Просмотров: 2023
Topology
Invited Lecture 6.13
Smoothing finite group actions on three-manifolds
John Pardon
Abstract: There exist continuous finite group actions on three-manifolds which are not smoothable, in the sense that they are not smooth with respect to any smooth structure. For example, Bing constructed an involution of the three-sphere whose fixed set is a wildly embedded two-sphere. However, one can still ask whether every continuous finite group action on a three-manifold can be uniformly approximated by a smooth action. We outline an approach to answering this question in the affirmative, based on the author’s work on the Hilbert–Smith conjecture in dimension three.
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