Nikod\'ym maximal function with restricted directions

Abstract

We study the planar Nikod\'ym maximal operator N;δ associated to a direction set ⊂ S1. We show that the quasi-Assouad dimension s := qA characterises the essential Lp-boundedness of N;δ in the following sense. If s ∈ [12,1], then N;δ is essentially bounded on Lp(R2) for p ≥ 1 + s, and essentially unbounded for p < 1 + s. Here essential boundedness means Lp-boundedness with constant Oε(δ-ε). We also show that the characterisation described above fails for s < 12. More precisely, there exists a set ⊂ S1 with qA = 13 such that N;δ is essentially unbounded on Lp(R2) for all p < 32. As an application, we show there exists a convex domain with affine dimension 16 such that the α-order Bochner-Riesz means converge in L6 for all α>0.