Strong ergodicity phenomena for Bernoulli shifts of bounded algebraic dimension

Abstract: The algebraic dimension of a Polish permutation group Q ≤ Sym(N) is the smallest n ∈ ω, so that for all A ⊆ N of size n + 1, the orbit of every a ∈ A under the pointwise stabilizer of A \ {a} is finite. We study the Bernoulli shift P R N for various Polish permutation groups P and we provide criteria under which the P -shift is generically ergodic relative to the injective part of the Qshift, when Q has algebraic dimension ≤ n. We use this to show that the sequence of pairwise * -reduction-incomparable equival… Show more