Cone and paraboloid points of arbitrary subsets of Euclidean space

Abstract

In this paper we characterise cone points of arbitrary subsets of Euclidean space. Given E ⊂ Rn, x ∈ E is a cone point of E if and only if align* ∫01 βEd,2(B(x,r))2 drr < ∞, align* up to a set of zero d-measure. The coefficients βEd,2 are a variation of the Jones coefficients. This is a high dimensional counterpart of a theorem of Bishop and Jones from 1994. We also prove similar results for α-paraboloid points, which are the C1,α rectifiability counterparts to cone points: x ∈ E is an α-paraboloid point if and only if align* ∫01 βEd,2(B(x,r))2r2α \, drr < ∞ align* up to a set of zero d-measure. Here, βd,2E is another variant of the Jones coefficients, introduced by Azzam and Schul.