Classifying invariant σ-ideals with analytic base on good Cantor measure spaces

Abstract

Let X be a zero-dimensional compact metrizable space endowed with a strictly positive continuous Borel σ-additive measure μ which is good in the sense that for any clopen subsets U,V⊂ X with μ(U)<μ(V) there is a clopen set W⊂ V with μ(W)=μ(U). We study σ-ideals with Borel base on X which are invariant under the action of the group Hμ(X) of measure-preserving homeomorphisms of (X,μ), and show that any such σ-ideal I is equal to one of seven σ-ideals: \\, [X]ω, E, M N, M, N, or [X] c. Here [X] is the ideal consisting of subsets of cardiality in X, M is the ideal of meager subsets of X, N=\A⊂ X:μ(A)=0\ is the ideal of null subsets of (X,μ), and E is the σ-ideal generated by closed null subsets of (X,μ).