Hausdorff dimension and countable Borel equivalence relations

Abstract

We show that if E is a countable Borel equivalence relation on Rn, then there is a closed subset A ⊂ [0,1]n of Hausdorff dimension n so that E A is smooth. More generally, if ≤Q is a locally countable Borel quasi-order on 2ω and g is any gauge function of lower order than the identity, then there is a closed set A so that A is an antichain in ≤Q and Hg(A) > 0.

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