On the conformal dimension of product measures

Abstract

Given a compact set E ⊂ Rd - 1, d ≥ 1, write KE := [0,1] × E ⊂ Rd. A theorem of C. Bishop and J. Tyson states that any set of the form KE is minimal for conformal dimension: if (X,d) is a metric space and f KE (X,d) is a quasisymmetric homeomorphism, then H f(KE) ≥ H KE. We prove that the measure-theoretic analogue of the result is not true. For any d ≥ 2 and 0 ≤ s < d - 1, there exist compact sets E ⊂ Rd - 1 with 0 < Hs(E) < ∞ such that the conformal dimension of , the restriction of the (1 + s)-dimensional Hausdorff measure on KE, is zero. More precisely, for any ε > 0, there exists a quasisymmetric embedding F KE Rd such that H F < ε.