Dense subsets of boundaries of CAT(0) groups
Abstract
In this paper, we study dense subsets of boundaries of CAT(0) groups. Suppose that a group G acts geometrically on a CAT(0) space X and suppose that there exists an element g0∈ G such that (1) Zg0 is finite, (2) X Fg0 is not connnected, and (3) each component of X Fg0 is convex and not g0-invariant, where Zg0 is the centralizer of g0 and Fg0 is the fixed-point set of g0 in X (that is, Zg0=\h∈ G| g0h=hg0\ and Fg0=\x∈ X| g0x=x\). Then we show that each orbit G α is dense in the boundary ∂ X (i.e.\ ∂ X is minimal) and the set \g∞ | g∈ G, o(g)=∞\ is also dense in the boundary ∂ X. We obtain an application for dense subsets on the boundary of a Coxeter system.
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