Abstract commensurability and quasi-isometry classification of hyperbolic surface group amalgams

Abstract

Let XS denote the class of spaces homeomorphic to two closed orientable surfaces of genus greater than one identified to each other along an essential simple closed curve in each surface. Let CS denote the set of fundamental groups of spaces in XS. In this paper, we characterize the abstract commensurability classes within CS in terms of the ratio of the Euler characteristic of the surfaces identified and the topological type of the curves identified. We prove that all groups in CS are quasi-isometric by exhibiting a bilipschitz map between the universal covers of two spaces in XS. In particular, we prove that the universal covers of any two such spaces may be realized as isomorphic cell complexes with finitely many isometry types of hyperbolic polygons as cells. We analyze the abstract commensurability classes within CS: we characterize which classes contain a maximal element within CS; we prove each abstract commensurability class contains a right-angled Coxeter group; and, we construct a common CAT(0) cubical model geometry for each abstract commensurability class.