On ideals in the semilattice of coarse equivalence classes of metrics

Abstract

For a Hausdorff topology on the set of ideals of the semilattice M(X) of coarse equivalence classes of metrics on a set X, the space I(M(X)) of ideals is the closure of the set of principal ideals, thus allowing to view non-principal ideals as generalizations of coarse equivalence classes of metrics. Some ideals arise from coarse structures on X. We define a map Φ from I(M(X)) to the set CS(X) of coarse structures on X, and a map Ψ backwards, and show that ΨΦ is the identity map, thus allowing to identify coarse structures with some ideals of M(X). We show that there are ideals that do not come from CS(X). For any ideal F we define the generalized uniform Roe algebra as the direct limit C*-algebra of the uniform Roe algebras for the equivalence classes of metrics in the ideal, and show that it coincides with the uniform Roe algebra of Φ(F).