Remarks on the construction of Kσ sets associated to trees not satisfying a separation condition

Abstract

Kσ sets involving sticky maps σ have been used in the theory of differentiation of integrals to probabilistically construct Kakeya-type sets that imply certain types of directional maximal operators are unbounded on Lp(R2) for all 1 ≤ p < ∞. We indicate limits to this approach by showing that, given ε > 0 and a natural number N, there exists a tree TN, ε of finite height that is lacunary of order N but such that, for every sticky map σ: Bh(TN, ε) → TN, ε, one has |Kσ ((1,2) × R)| ≥ 1 - ε.