The $\mathrm{CMO}$-Dirichlet problem for elliptic systems in the upper half-space
Abstract
We prove that for any second-order, homogeneous, elliptic system with constant complex coefficients in , the Dirichlet problem in with boundary data in is well-posed under the assumption that is a strong vanishing Carleson measure in in some sense. This solves an open question posed by Martell et al. The proof relies on a quantitative Fatou-type theorem, which not only guarantees the existence of the pointwise nontangential boundary trace for smooth null-solutions satisfying a strong vanishing Carleson measure condition, but also includes a Poisson integral representation formula of solutions along with a characterization of in terms of the traces of solutions of elliptic systems. Moreover, we are able to establish the well-posedness of the Dirichlet problem in for a system as above in the case when the boundary data belongs to , which lines in between and . Analogously, we formulate a new brand of strong Carleson measure conditions and a characterization of in terms of the traces of solutions of elliptic systems.
Cite
@article{arxiv.2206.00318,
title = {The $\mathrm{CMO}$-Dirichlet problem for elliptic systems in the upper half-space},
author = {Mingming Cao},
journal= {arXiv preprint arXiv:2206.00318},
year = {2024}
}