Semi-simple actions of the Higman-Thompson groups Tn on finite-dimensional CAT(0) spaces
Abstract
In this paper, we study isometric actions on finite-dimensional CAT(0) spaces for the Higman-Thompson groups Tn, which are generalizations of Thompson's group T. It is known that every semi-simple action of T on a complete CAT(0) space of finite covering dimension has a global fixed point. After this result, we show that every semi-simple action of Tn on a complete CAT(0) space of finite covering dimension has a global fixed point. In the proof, we regard Tn as ring groups of homeomorphisms of S1 introduced by Kim, Koberda and Lodha, and use general facts on these groups.
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