On the coarse geometry of the complex of domains

Abstract

The complex of domains D(S) is a geometric tool with a very rich simplicial structure, it contains the curve complex C(S) as a simplicial subcomplex. In this paper we shall regard it as a metric space, endowed with the metric which makes each simplex Euclidean with edges of length 1, and we shall discuss its coarse geometry. We prove that for every subcomplex (S) of D(S) which contains the curve complex C(S), the natural simplicial inclusion C(S) (S) is an isometric embedding and a quasi-isometry. We prove that, except a few cases, the arc complex A(S) is quasi-isometric to the subcomplex P∂(S) of D(S) spanned by the vertices which are peripheral pair of pants, and we prove that the simplicial inclusion P∂(S) D(S) is a quasi-isometric embedding if and only if S has genus 0. We then apply these results to the arc and curve complex AC(S). We give a new proof of the fact that AC(S) is quasi-isometric to C(S), and we discuss the metric properties of the simplicial inclusion A(S) AC(S).