Measure-scaling quasi-isometries

Abstract

A measure-scaling quasi-isometry between two connected graphs is a quasi-isometry that is quasi--to-one in a natural sense for some >0. For non-amenable graphs, all quasi-isometries are quasi--to-one for any >0, while for amenable ones there exists at most one possible such . For an amenable graph X, we show that the set of possible forms a subgroup of R>0 that we call the (measure-)scaling group of X. This group is invariant under measure-scaling quasi-isometries. In the context of Cayley graphs, this implies for instance that two uniform lattices in a given locally compact group have same scaling groups. We compute the scaling group in a number of cases. For instance it is all of R>0 for lattices in Carnot groups, SOL or solvable Baumslag Solitar groups, but is a (strict) subgroup Q>0 for lamplighter groups over finitely presented amenable groups.