English

On higher integrability estimates for elliptic equations with singular coefficients

Analysis of PDEs 2018-04-17 v2

Abstract

In this note we establish existence and uniqueness of weak solutions of linear elliptic equation div[A(x)u]=divF(x)\text{div}[\mathbf{A}(x) \nabla u] = \text{div}{\mathbf{F}(x)}, where the matrix A\mathbf{A} is just measurable and its skew-symmetric part can be unbounded. Global reverse H\"{o}lder's regularity estimates for gradients of weak solutions are also obtained. Most importantly, we show, by providing an example, that boundedness and ellipticity of A\mathbf{A} is not sufficient for higher integrability estimates even when the symmetric part of A\mathbf{A} is the identity matrix. In addition, the example also shows the necessity of the dependence of α\alpha in the H\"{o}lder CαC^\alpha-regularity theory on the \textup{BMO}-semi norm of the skew-symmetric part of A\mathbf{A}. The paper is an extension of classical results obtained by N. G. Meyers (1963) in which the skew-symmetric part of A\mathbf{A} is assumed to be zero.

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Cite

@article{arxiv.1804.03180,
  title  = {On higher integrability estimates for elliptic equations with singular coefficients},
  author = {Juraj Földes and Tuoc Phan},
  journal= {arXiv preprint arXiv:1804.03180},
  year   = {2018}
}

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Submitted

R2 v1 2026-06-23T01:18:27.418Z