Rigidity of Generalized Furstenberg Boundaries and Applications to Intermediate Crossed Products

Abstract

We develop a relative boundary theory for actions of discrete groups on compact spaces and use it to derive rigidity results for reduced crossed products. For a discrete group acting on a compact space X and a subgroup H, we construct a universal boundary over X which is minimal as a -system and strongly proximal with respect to H. When Hc is commensurated and the H-action on X is minimal, we show that this universal boundary agrees, in a canonical -equivariant way, with the generalized Furstenberg boundary of (H,X), thereby unifying and extending earlier results on relative boundaries. As an application, we introduce the notion of an X-plump subgroup given a -space X, a generalized version of plumpness tailored to crossed products. Under natural dynamical hypotheses, this leads to new examples of irreducible C*-inclusions. Under additional assumptions, we also show that every intermediate C*-algebra is a crossed product.