Abstract
A criterion for existence of a fixed point for an affine action of a given group on a compact convex space is presented. From this we derive that a discrete countable group is amenable if and only if there exists an invariant probability measure for any action of the group on a Hilbert cube. Amenable properties of the group of all isometries of the Urysohn universal homogeneous metric space are also discussed.
Citation
Semeon A. Bogatyi. Vitaly V. Fedorchuk. "Schauder's fixed point and amenability of a group." Topol. Methods Nonlinear Anal. 29 (2) 383 - 401, 2007.
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