The scale function for locally compact groups acting on non-positively curved spaces

Abstract

Let G be a totally disconnected, locally compact (t.d.l.c.) group. The scale sG(g) of g ∈ G in the sense of Willis is given by the minimum value of the index |gUg-1:U gUg-1| as U ranges over the compact open subgroups; the theory associated to the scale has been very successful in describing general dynamical features of automorphisms of t.d.l.c. groups. We focus on the case where G acts properly and continuously by isometries on a geodesic space X, where X is complete CAT(0) or proper and Gromov-hyperbolic, and g ∈ G is hyperbolic. In this context, we find geometric descriptions of the parabolic and contraction groups, tidy subgroups, and structures in the G-action that encode the scale, including criteria for g to have scale 1.

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