Rectifiability and tangents in a rough Riemannian setting
Abstract
Characterizing rectifiability of Radon measures in Euclidean space has led to fundamental contributions to geometric measure theory. Conditions involving existence of principal values of certain singular integrals mattila1995rectifiable and the existence of densities with respect to Euclidean balls preiss1987geometry have given rise to major breakthroughs. We study similar questions in a rough elliptic setting where Euclidean balls B(a,r) are replaced by ellipses B(a,r) whose eccentricity and principal axes depend on a. Given : Rn GL(n,R), consider the family of ellipses B(a,r) = a + (a) B(0,r). We characterize m-rectifiability in terms of the almost everywhere existence of the densities θm(a)(μ,a) = r 0 μ(B(a,r))rm ∈ (0, ∞). We characterize m-rectifiable measures in terms of the existence of the principal values-- and even under the weaker assumptions that ε 0 ∫B(a,ε R) B(a, ε r) (a)-1(y-a)|(a)-1(y-a)|m+1 d μ(y) = 0 ∀ 0 < r < R when 0 < θm*(μ,a) < ∞ almost everywhere. We apply the second result to characterize (n-1)-rectifiable measures in Rn in terms of the behavior of the gradient of the single layer potential to the PDE LA u = - div(A ∇ u) under weak continuity assumptions on A.
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