Coarse geometry of the fire retaining property and group splittings

Abstract

Given a non-decreasing function f N N we define a single player game on (infinite) connected graphs that we call fire retaining. If a graph G admits a winning strategy for any initial configuration (initial fire) then we say that G has the f-retaining property; in this case if f is a polynomial of degree d, we say that G has the polynomial retaining property of degree d. We prove that having the polynomial retaining property of degree d is a quasi-isometry invariant in the class of uniformly locally finite connected graphs. Henceforth, the retaining property defines a quasi-isometric invariant of finitely generated groups. We prove that if a finitely generated group G splits over a quasi-isometrically embedded subgroup of polynomial growth of degree d, then G has polynomial retaining property of degree d-1. Some connections to other work on quasi-isometry invariants of finitely generated groups are discussed and some questions are raised.