A Hardy-Littlewood type Theorem and a Heinz type inequality

Abstract

The main aim of this paper is to investigate the Hardy-Littlewood type Theorem and the Heinz type inequality on functions induced by a differential operator. We first prove a more general Hardy-Littlewood type theorem for the Dirichlet solution of a differential operator which depends on α >0 over the unit ball Bn of Rn with n≥ 2, related to the Lipschitz type space defined by a fast majorant. We find that the case α>0 is completely different from the case α=0. Then a more general Heinz type inequality for the Dirichlet solution of a differential operator will also be established in the case α>n-2.