Structure of sets which are well approximated by zero sets of harmonic polynomials

Badger, Matthew; Engelstein, Max; Toro, Tatiana

doi:10.2140/apde.2017.10.1455

Cited by 21 publications

(31 citation statements)

References 40 publications

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“…In connection to our structure theorem (Theorem 1.2), we would also like to address a recent article [16] that studies the structure of a set that can be approximated by the nodal sets of harmonic polynomials. We believe that our nodal/singular set can also be analysed by their approach, as our solution after adjusting the break (i.e., u þ À jðzÞu À ) can be approximated by homogeneous harmonic polynomials (Lemma 3.3 and Lemma 5.8) at each vanishing point.…”

Section: à ámentioning

confidence: 99%

Nodal sets for broken quasilinear partial differential equations with Dini coefficients

Kim

2021

Communications in Partial Differential Equations

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This paper is concerned with the nodal set of weak solutions to a broken quasilinear partial differential equation,where a þ and a À are uniformly elliptic, Dini continuous coefficient matrices, subject to a strong correlation that a þ and a À are a multiple of some scalar function to each other. Under such a structural condition, we develop an iteration argument to achieve higher-order approximation of solutions at a singular point, which is also new for standard elliptic PDEs below H€ older regime, and as a result, we establish a structure theorem for singular sets. We also estimate the Hausdorff measure of nodal sets, provided that the vanishing order of given solution is bounded throughout its nodal set, via an approach that extends the classical argument to certain solutions with discontinuous gradient. Besides, we also prove Lipschitz regularity of solutions and continuous differentiability of their nodal set around regular points.

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Section: à ámentioning

confidence: 99%

Nodal sets for broken quasilinear partial differential equations with Dini coefficients

Kim

2021

Communications in Partial Differential Equations

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“…The proof of Theorem 1 uses tools from the theory of non-tangentially accessible domains (NTA) introduced by Jerison and Kenig [37], the monotonicity formula of Alt, Caffarelli, and Friedman [2], the theory of tangent measures introduced by Preiss [56], and the blow up techniques for harmonic measures at infinity for unbounded NTA domains due to Kenig and Toro [40,41]. For additional results along these lines see [11][12][13][14]29].…”

Section: Two Phase Casementioning

confidence: 99%

Geometric Measure Theory–Recent Applications

Toro¹

2019

Notices Amer. Math. Soc.

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Geometric Measure Theory (GMT) provides a framework to address questions in very different areas of mathematics, including calculus of variations, geometric analysis, potential theory, free boundary regularity, harmonic analysis, and theoretical computer science. Progress in different branches of GMT has led to the emergence of new challenges, making it a very vibrant area of research. In this note we will provide a historic background to some of the

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“…(i) There exist d 0 ≥ 1 depending on at most n and the NTA constants of Ω + and Ω − such that ∂Ω is locally bilaterally well approximated (in a Reifenberg sense) by zero sets of harmonic polynomials p : [BET17] (also see [BL15]). In fact, we proved in [BET17] that (ii) and (iii) hold on any closed set satisfying the bilateral approximation in (i).…”

Section: Introductionmentioning

confidence: 99%

Regularity of the singular set in a two-phase problem for harmonic measure with Hölder data

2020

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In non-variational two-phase free boundary problems for harmonic measure, we examine how the relationship between the interior and exterior harmonic measures of a domain Ω ⊂ R n influences the geometry of its boundary. This type of free boundary problem was initially studied by Kenig and Toro in 2006 and was further examined in a series of separate and joint investigations by several authors. The focus of the present paper is on the singular set in the free boundary, where the boundary looks infinitesimally like zero sets of homogeneous harmonic polynomials of degree at least 2. We prove that if the Radon-Nikodym derivative of the exterior harmonic measure with respect to the interior harmonic measure has a Hölder continuous logarithm, then the free boundary admits unique geometric blowups at every singular point and the singular set can be covered by countably many C 1,β submanifolds of dimension at most n − 3. This result is partly obtained by adapting tools such as Garofalo and Petrosyan's Weiss type monotonicity formula and an epiperimetric inequality for harmonic functions from the variational to the non-variational setting.

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Structure of sets which are well approximated by zero sets of harmonic polynomials

Cited by 21 publications

References 40 publications

Nodal sets for broken quasilinear partial differential equations with Dini coefficients

Nodal sets for broken quasilinear partial differential equations with Dini coefficients

Geometric Measure Theory–Recent Applications

Regularity of the singular set in a two-phase problem for harmonic measure with Hölder data

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