The sphere complex of a locally finite graph
Abstract
For a locally finite graph , we consider its mapping class group Map() as defined by Algom-Kfir-Bestvina. For these groups, we prove a generalization of the results of Laudenbach and Brendle-Broaddus-Putman, producing a 3-manifold M whose mapping class group surjects onto Map() with kernel a compact abelian group of sphere twists so that the corresponding short exact sequence splits. Along the way we obtain an induced faithful action of Map() on the sphere complex S(M) of M, which is the simplicial complex whose simplices are isotopy classes of finite collections of spheres in M which are pairwise disjoint. When has finite rank, we further show that the action of Map() on a certain natural subcomplex has elements with positive translation length, and also consider a candidate for an Outer space of such a graph. As another application, we prove that for many , Map() is quasi-isometric to a particular subgraph of S(M), following Schaffer-Cohen. We also deduce analogs of the results of Domat-Hoganson-Kwak.
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