English

Boundary value problems for second order elliptic operators with complex coefficients

Analysis of PDEs 2020-09-16 v1

Abstract

The theory of second order complex coefficient operators of the form L=\mboxdivA(x)\mathcal{L}=\mbox{div} A(x)\nabla has recently been developed under the assumption of pp-ellipticity. In particular, if the matrix AA is pp-elliptic, the solutions uu to Lu=0\mathcal{L}u = 0 will satisfy a higher integrability, even though they may not be continuous in the interior. Moreover, these solutions have the property that up/21uWloc1,2|u|^{p/2-1}u \in W^{1,2}_{loc}. These properties of solutions were used by Dindo\v{s}-Pipher to solve the LpL^p Dirichlet problem for pp-elliptic operators whose coefficients satisfy a further regularity condition, a Carleson measure condition that has often appeared in the literature in the study of real, elliptic divergence form operators. This paper contains two main results. First, we establish solvability of the Regularity boundary value problem for this class of operators, in the same range as that of the Dirichlet problem. The Regularity problem, even in the real elliptic setting, is more delicate than the Dirichlet problem because it requires estimates on derivatives of solutions. Second, the Regularity results allow us to extend the previously established range of LpL^p solvability of the Dirichlet problem using a theorem due to Z. Shen for general bounded sublinear operators.

Keywords

Cite

@article{arxiv.1810.10366,
  title  = {Boundary value problems for second order elliptic operators with complex coefficients},
  author = {Martin Dindoš and Jill Pipher},
  journal= {arXiv preprint arXiv:1810.10366},
  year   = {2020}
}

Comments

41 pages. arXiv admin note: text overlap with arXiv:1612.01568

R2 v1 2026-06-23T04:51:14.844Z