Burnside problem for measure preserving groups of toral homeomorphisms and for 2-groups of toral homeomorphisms
Abstract
A group G is said to be periodic if for any g∈ G there exists a positive integer n with gn=id. We prove that a finitely generated periodic group of homeomorphisms on the 2-torus that preserves a measure μ is finite. Moreover if the group consists in homeomorphisms isotopic to the identity, then it is abelian and acts freely on T2. In the Appendix, we show that every finitely generated 2-group of toral homeomorphisms is finite.
0
Turn this paper into a lesson
ArcXiv compiles a structured reading guide from this paper's metadata: plain-English importance, contributions, prerequisite concepts, which sections to read first, flashcards, and a quiz. Grounded in the abstract, never invented.