The comb representation of compact ultrametric spaces

Abstract

We call a comb a map f:I [0,∞), where I is a compact interval, such that \f \ is finite for any . A comb induces a (pseudo)-distance on \f=0\ defined by (s,t) = (s t, s t) f. We describe the completion I of \f=0\ for this metric, which is a compact ultrametric space called comb metric space. Conversely, we prove that any compact, ultrametric space (U,d) without isolated points is isometric to a comb metric space. We show various examples of the comb representation of well-known ultrametric spaces: the Kingman coalescent, infinite sequences of a finite alphabet, the p-adic field and spheres of locally compact real trees. In particular, for a rooted, locally compact real tree defined from its contour process h, the comb isometric to the sphere of radius T centered at the root can be extracted from h as the depths of its excursions away from T.