Coarse structures on groups defined by conjugations
Abstract
For a group G, we denote by G the coarse space on G endowed with the coarse structure with the base \\ (x,y)∈ G× G: y∈ xF \ : F ∈ [G]<ω \, xF = \z-1 xz : z∈ F \. Our goal is to explore interplays between algebraic properties of G and asymptotic properties of G. In particular, we show that asdim \ G = 0 if and only if G / ZG is locally finite, ZG is the center of G. For an infinite group G, the coarse space of subgroups of G is discrete if and only if G is a Dedekind group.
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