The paper studies free actions of amenable groups on compact metrizable spaces and introduces several key dynamical properties:
Uniform Rokhlin Property (URP): For any finite set K ⊂ G and ε > 0, there exists a "castle" (a collection of pairwise disjoint towers) with (K, ε)-invariant shapes that covers most of the space.
Comparison: The dynamical subequivalence relation (a topological version of measure containment) can be upgraded to a combinatorial subequivalence.
Property FCSB (free covers with staggered boundaries): For any finite set F ⊂ G and any marker set V, there exists a collection of F-free open sets whose boundaries and remainder set are small in the type semigroup.
Property FCSB in measure: A measure-theoretic version of property FCSB.
The main results are:
The proofs use a combination of techniques from dynamical systems, operator algebras, and combinatorics, avoiding the use of Euclidean geometry or signal analysis.
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