English

Cauchy transform and Poisson's equation

Complex Variables 2010-03-22 v1

Abstract

Let uW02,pu\in W^{2,p}_0, 1p1\le p\le \infty be a solution of the Poisson equation Δu=h\Delta u = h, hLph\in L^p, in the unit disk. It is proved that uLpaphLp\|\nabla u\|_{L^p} \le a_p\|h\|_{L^p} with sharp constant apa_p for p=1p=1 and p=p=\infty and that uLpbphLp\|\partial u\|_{L^p} \le b_p\|h\|_{L^p} with sharp constant bpb_p for p=1p=1, p=2p=2 and p=p=\infty. In addition is proved that for p>2p>2 uLcphLp||\partial u||_{L^\infty}\le c_p\Vert h\Vert_{L^p} , and uLCphLp,||\nabla u||_{L^\infty}\le C_p\Vert h\Vert_{L^p}, with sharp constants cpc_p and CpC_p. An extension to smooth Jordan domains is given. These problems are equivalent to determining the precise value of LpL^p norm of {\it Cauchy transform of Dirichlet's problem}.

Keywords

Cite

@article{arxiv.1003.3822,
  title  = {Cauchy transform and Poisson's equation},
  author = {David Kalaj},
  journal= {arXiv preprint arXiv:1003.3822},
  year   = {2010}
}
R2 v1 2026-06-21T14:59:57.516Z