Coarse quotients by group actions and the maximal Roe algebra

Abstract

For a discrete metric space (or more generally a large scale space) X and an action of a group G on X by coarse equivalences, we define a type of coarse quotient space XG, which agrees up to coarse equivalence with the orbit space X/G when G is finite. We then restrict our attention to what we call coarsely discontinuous actions and show that for such actions the group G can be recovered as an appropriately defined automorphism group Aut(X/XG) when X satisfies a large scale connectedness condition. We show that for a coarsely discontinuous action of a countable group G on a discrete bounded geometry metric space X there is a relation between the maximal Roe algebras of X and XG, namely that there is a -isomorphism C(XG)/K C(X)/K G, where K is the ideal of compact operators. If X has Property A and G is amenable, then we show that XG has Property A, and thus the maximal Roe algebra and full crossed product can be replaced by the usual Roe algebra and reduced crossed product respectively in the above equation.