In this partly expository paper, we study the set A of groups of orientation-preserving homeomorphisms of the circle S1 which do not admit non-abelian free subgroups. We use classical results about homeomorphisms of the circle and elementary dynamical methods to derive various new and old results about the groups in A. Of the known results, we include some results from a family of results of Beklaryan and Malyutin, and we also give a new proof of a theorem of Margulis. Our primary new results include a detailed classification of the solvable subgroups of R. Thompson's group T. © 2011 World Scientific Publishing Company.
Bleak, C., Kassabov, M., Matucci, F. (2011). Structure theorems for groups of homeomorphisms of the circle. INTERNATIONAL JOURNAL OF ALGEBRA AND COMPUTATION, 21(6), 1007-1036 [10.1142/S0218196711006571].
Structure theorems for groups of homeomorphisms of the circle
Matucci, F
2011
Abstract
In this partly expository paper, we study the set A of groups of orientation-preserving homeomorphisms of the circle S1 which do not admit non-abelian free subgroups. We use classical results about homeomorphisms of the circle and elementary dynamical methods to derive various new and old results about the groups in A. Of the known results, we include some results from a family of results of Beklaryan and Malyutin, and we also give a new proof of a theorem of Margulis. Our primary new results include a detailed classification of the solvable subgroups of R. Thompson's group T. © 2011 World Scientific Publishing Company.
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