A sharp bound on the Hausdorff dimension of the singular set of a uniform measure

Nimer, A. Dali

doi:10.1007/s00526-017-1206-9

Cited by 5 publications

(4 citation statements)

References 11 publications

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“…For an in-depth introduction, we refer the reader to the exposition of Preiss' theorem by De Lellis [17]. The classi cation of m-uniform measures in R n is as of yet incomplete, but some progress has recently been made by Tolsa [59] and Nimer [47,48]. The deep connections between the existence of densities and recti ability of sets and absolutely continuous measures in Euclidean space, as described above, have been explored in metric spaces beyond R n by several authors; see e.g.…”

Section: Hausdor Densities and Recti Abilitymentioning

confidence: 99%

Multiscale Analysis of 1-rectifiable Measures II: Characterizations

Badger

Schul

2017

Analysis and Geometry in Metric Spaces

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A measure is 1-recti able if there is a countable union of nite length curves whose complement has zero measure. We characterize 1-recti able Radon measures µ in n-dimensional Euclidean space for all n ≥ in terms of positivity of the lower density and niteness of a geometric square function, which loosely speaking, records in an L gauge the extent to which µ admits approximate tangent lines, or has rapidly growing density ratios, along its support. In contrast with the classical theorems of Besicovitch, Morse and Randolph, and Moore, we do not assume an a priori relationship between µ and 1-dimensional Hausdor measure H . We also characterize purely 1-unrecti able Radon measures, i.e. locally nite measures that give measure zero to every nite length curve. Characterizations of this form were originally conjectured to exist by P. Jones. Along the way, we develop an L variant of P. Jones' traveling salesman construction, which is of independent interest.

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Section: Hausdor Densities and Recti Abilitymentioning

confidence: 99%

Multiscale Analysis of 1-rectifiable Measures II: Characterizations

Badger

Schul

2017

Analysis and Geometry in Metric Spaces

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“…Recently Nimer [Nim18] produced many interesting examples. See also [Tol15a], [Nim17] and [Nim19] for other results.…”

Section: Tangent Planesmentioning

confidence: 92%

Rectifiability; a survey

Mattila¹

2021

Preprint

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“…The first example is due to Kowalski and Preiss [14], who showed that the measure H 3 Σ is a 3-flat measure in R 4 , where Σ = {(x 1 , x 2 , x 3 , x 4 ) ∈ R 4 : x 2 1 = x 2 2 + x 2 3 + x 2 4 } is the light cone. In fact, Kowalski and Preiss have completely classified (n − 1)-uniform measures in R n for all values of n: every such measure is either (n−1)-flat or is proportional to H n−1 M where M is an (n − 1)-dimensional algebraic variety in R n which is isometric to Σ × R n n − 1 remains unknown, although recent work of Nimer [24], [25], [26] has improved our understanding and provided new examples. Kirchheim and Preiss [13] proved that the support of a uniform measure in R n is an analytic variety, and Tolsa [29] showed that such supports satisfy the David-Semmes 'weak constant density' condition and hence are uniformly rectifiable.…”

Section: Introductionmentioning

confidence: 99%

On uniform measures in the Heisenberg group

Chousionis

Magnani

Tyson

2020

Advances in Mathematics

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We initiate a classification of uniform measures in the first Heisenberg group H equipped with the Korányi metric dH , that represents the first example of a noncommutative stratified group equipped with a homogeneous distance. We prove that 1-uniform measures are proportional to the spherical 1-Hausdorff measure restricted to an affine horizontal line, while 2-uniform measures are proportional to spherical 2-Hausdorff measure restricted to an affine vertical line. It remains an open question whether 3-uniform measures are proportional to the restriction of spherical 3-Hausdorff measure to an affine vertical plane. We establish this conclusion in case the support of the measure is a vertically ruled surface. Along the way, we derive asymptotic formulas for the measures of small extrinsic balls in (H, dH ) intersected with smooth submanifolds. The coefficients in our power series expansions involve intrinsic notions of curvature associated to smooth curves and surfaces in H.

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A sharp bound on the Hausdorff dimension of the singular set of a uniform measure

Cited by 5 publications

References 11 publications

Multiscale Analysis of 1-rectifiable Measures II: Characterizations

Multiscale Analysis of 1-rectifiable Measures II: Characterizations

Rectifiability; a survey

On uniform measures in the Heisenberg group

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