Maximal operators and decoupling for (p) Cantor measures

Abstract

For 2≤ p<∞, α'>2/p, and δ>0, we construct Cantor-type measures on R supported on sets of Hausdorff dimension α<α' for which the associated maximal operator is bounded from Lpδ (R) to Lp(R). Maximal theorems for fractal measures on the line were previously obtained by Laba and Pramanik. The result here is weaker in that we are not able to obtain Lp estimates; on the other hand, our approach allows Cantor measures that are self-similar, have arbitrarily low dimension α>0, and have no Fourier decay. The proof is based on a decoupling inequality similar to that of Laba and Wang.