Cauchy transform and Poisson's equation

Abstract

Let u∈ W2,p0, 1 p ∞ be a solution of the Poisson equation u = h, h∈ Lp, in the unit disk. It is proved that \|∇ u\|Lp ap\|h\|Lp with sharp constant ap for p=1 and p=∞ and that \|∂ u\|Lp bp\|h\|Lp with sharp constant bp for p=1, p=2 and p=∞. In addition is proved that for p>2 ||∂ u||L∞ cp hLp , and ||∇ u||L∞ Cp hLp, with sharp constants cp and Cp. An extension to smooth Jordan domains is given. These problems are equivalent to determining the precise value of Lp norm of Cauchy transform of Dirichlet's problem.