Title: Discrete subgroups of Diff(I) and the extension of Hölder's Theorem
Speaker: Azer Akhmedov
Speaker Info: North Dakota State University
Brief Description:
Special Note:
Abstract:
It is a classical result (essentially due to O.Hölder, from the year 1901) that if G is a subgroup of Homeo(R) such that every nontrivial element acts freely then G is Abelian. A natural question to ask is what if every nontrivial element has at most N fixed points where N is a fixed natural number. In the case of N=1, we do have a complete answer to this question: it has been proved (Solodov, Barbot, Kovacevic, Farb-Franks) that in this case the group is metabelian, in fact, it is isomorphic to a subgroup of the affine group Aff(R).Date: Tuesday, October 19, 2021We answer this question for an arbitrary N assuming some regularity on the action of the group.
The following theorem is from our published paper in 2016.
Theorem 1. Let G be a subgroup of Diff^{1+\epsilon }(I) [of Diff^{2}(I)] such that every nontrivial element of G has at most N fixed points. Then G is solvable [metabelian].
By sharpening the methods, we succeed proving the same and even a stronger claim for subgroups of Diff(I).
Theorem 2. Let G be a subgroup of Diff(I) such that every nontrivial element of G has at most N fixed points. Then G is isomorphic to a subgroup of the affine group Aff(R).
The proof is based on our study of C_0-discrete subgroups of Diff(I) from an earlier work. In the talk, we will briefly mention a few other results that we have obtained as a product of our study of discrete subgroups of Diff(I).