Lp Lq norm estimates of Cauchy transforms on the Dirichlet problem and their applications

Abstract

Denote by Cα(D) the space of the functions f on the unit disk D which are H\"older continuous with the exponent α, and denote by C1, α(D) the space which consists of differentiable functions f such that their derivatives are in the space Cα(D). Let C be the Cauchy transform of Dirichlet problem. In this paper, we obtain the norm estimates of \|C\|Lp Lq, where 3/2<p<2 and q=p/(p-1). As an application, we show that if 3/2<p<2, then u∈ Cμ(D), where μ=2/p-1. We also show that if 2<p<∞, then u∈ C1, (D), where =1-2/p. Finally, for the case p=∞, we show that u is not necessarily in C1, 1(D), but its gradient, i.e., |∇ u| is Lipschitz continuous with respect to the pseudo-hyperbolic metric. This paper is inspired by Chapter 4 of [Astala, Iwaniec, Martin: Elliptic partial differential equations and quasiconformal mappings in the plane, Princeton Mathematical Series, Vol. 48, Princeton University Press, Princeton, NJ, 2009, p. xviii+677] and [Kalaj, Cauchy transform and Poisson's equation, Adv. Math. 231 (2012), 213--242]