Tangents, rectifiability, and corkscrew domains

Abstract

In a recent paper, Cs\"ornyei and Wilson prove that curves in Euclidean space of σ-finite length have tangents on a set of positive H1-measure. They also show that a higher dimensional analogue of this result is not possible without some additional assumptions. In this note, we show that if ⊂eq Rd+1 has the property that each ball centered on contains two large balls in different components of c and has σ-finite Hd-measure, then it has d-dimensional tangent points in a set of positive Hd-measure. We also give shorter proofs that Semmes surfaces are uniformly rectifiable and, if ⊂eq Rd+1 is an exterior corkscrew domain whose boundary has locally finite Hd-measure, one can find a Lipschitz subdomain intersecting a large portion of the boundary.