Uniformly Lipschitzian group actions on hyperconvex spaces

Andrzej Wi\'snicki; Jacek Wo\'sko

arXiv:1504.00626·math.FA·December 20, 2016

Uniformly Lipschitzian group actions on hyperconvex spaces

Andrzej Wi\'snicki, Jacek Wo\'sko

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Abstract

Suppose that ${T_{a} : a \in G}$ is a group of uniformly $L$ -Lipschitzian mappings with bounded orbits ${T_{a} x : a \in G}$ acting on a hyperconvex metric space $M$ . We show that if $L < 2$ , then the set of common fixed points $F i x G$ is a nonempty H\"older continuous retract of $M$ . As a consequence, it follows that all surjective isometries acting on a bounded hyperconvex space have a common fixed point. A fixed point theorem for $L$ -Lipschitzian involutions and some generalizations to the case of $λ$ -hyperconvex spaces are also given.

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