The Riesz transform, rectifiability, and removability for Lipschitz harmonic functions
Abstract
We show that, given a set E⊂ Rn+1 with finite n-Hausdorff measure Hn, if the n-dimensional Riesz transform RHn|E f(x) = ∫E x-y|x-y|n+1 f(y) dHn(y) is bounded in L2(Hn|E), then E is n-rectifiable. From this result we deduce that a compact set E⊂ Rn+1 with Hn(E)<∞ is removable for Lipschitz harmonic functions if and only if it is purely n-unrectifiable, thus proving the analog of Vitushkin's conjecture in higher dimensions.
0
Turn this paper into a lesson
ArcXiv compiles a structured reading guide from this paper's metadata: plain-English importance, contributions, prerequisite concepts, which sections to read first, flashcards, and a quiz. Grounded in the abstract, never invented.