Geometric models and asymptotic dimension for infinite-type surface mapping class groups

Abstract

Let S be an infinite-type surface and let G ≤ Map(S) be a locally bounded Polish subgroup. We construct a metric graph M of simple arcs and curves on S preserved by the action of G and for which the vertex orbit map G V(M) is a coarse equivalence; if G is boundedly generated, then M is a Cayley--Abels--Rosendal graph for G and the orbit map is a quasi-isometry. In particular, if S contains a non-displaceable subsurface and G ≥ PMapc(S) is boundedly generated or G ∈ \PMapc(S), PMap(S), Map(S) \ and is locally bounded, then asdim M = asdim G = ∞. This result completes the classification of the asymptotic dimension of stable boundedly generated infinite-type surface mapping class groups begun by Grant--Rafi--Verberne.