Kathryn Mann
Published 2011-03-25, updated 2012-06-06Version 2
Let G be a group acting on the plane by orientation-preserving homeomorphisms. We show that if for some k>0 there is a ball of radius r > k/\sqrt{3} such that each point x in the ball satisfies |gx -hx| < k for all g, h in G, and the action of G satisfies a nonwandering hypothesis, then the action has a global fixed point. In particular, any group of measure-preserving orientation preserving homeomorphisms of the plane with uniformly bounded orbits has a global fixed point. The constant k/\sqrt{3} is sharp. We also show that a group acting on the plane with orbits bounded as above is left orderable.
Comments: v2 reflects published version. Added argument in section 2, results unchanged
Journal: Algebraic & Geometric Topology 12 (2012) 421-433
Wandering domains with nearly bounded orbits
Groups acting distally and minimally on $\mathbb S^2$ and $\mathbb {RP}^2$
Global fixed points for nilpotent actions on the torus
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