Intrinsic uniform structure on median algebras

Abstract

We introduce the median uniformity U m, an intrinsic precompact convex uniform structure on a median algebra. It is Hausdorff under natural assumptions, for instance for finite-rank median algebras. In the Hausdorff case, its uniform completion yields the Minimal Median Compactification (MMC). The induced topology τ m provides a natural higher-rank analogue of the interval topology on linearly ordered sets and of the shadow topology on rank-one median algebras. When all intervals in the median algebra X are finite, the MMC is the unique proper median compactification of (X,τ m); in particular, it coincides with the Roller compactification. We apply this uniform framework to continuous actions of a topological group G by median automorphisms. We show that the MMC is a median G-compactification. In the finite-rank case, the resulting compact G-system is Rosenthal representable and hence dynamically tame.