English

Extrapolation of the Dirichlet problem for elliptic equations with complex coefficients

Analysis of PDEs 2020-06-23 v3

Abstract

In this paper, we prove an extrapolation result for complex coefficient divergence form operators that satisfy a strong ellipticity condition known as pp-{\it ellipticity}. Specifically, let Ω\Omega be a chord-arc domain in Rn\mathbb R^n and the operator L=i(Aij(x)j)+Bi(x)i\mathcal L = \partial_{i}\left(A_{ij}(x)\partial_{j}\right) +B_{i}(x)\partial_{i} be elliptic, with Bi(x)Kδ(x)1|B_i(x)| \le K\delta(x)^{-1} for a small KK. Let p_0 = \sup\{p>1: A \,\,\text{is}\,\, \text{p-elliptic}\}. We establish that if the LqL^q Dirichlet problem is solvable for L\mathcal L for some 1<q<p0(n1)(n2)1<q< \frac{p_0(n-1)}{(n-2)}, then the LpL^p Dirichlet problem is solvable for all pp in the range [q,p0(n1)(n2))[q, \frac{p_0(n-1)}{(n-2)}). In particular, if the matrix AA is real, or n=2n=2, the LpL^p Dirichlet problem is solvable for pp in the range [q,)[q, \infty).

Keywords

Cite

@article{arxiv.1909.06132,
  title  = {Extrapolation of the Dirichlet problem for elliptic equations with complex coefficients},
  author = {Martin Dindoš and Jill Pipher},
  journal= {arXiv preprint arXiv:1909.06132},
  year   = {2020}
}

Comments

16 pages. To appear in JFA

R2 v1 2026-06-23T11:14:23.748Z