On properties of the solutions to the α-harmonic equation

Abstract

The aim of this paper is to establish properties of the solutions to the α-harmonic equations: α(f(z))=∂z[(1-|z|2)-α ∂zf](z)=g(z), where g:ID→C is a continuous function and D denotes the closure of the unit disc D in the complex plane C. We obtain Schwarz type and Schwarz-Pick type inequalities for the solutions to the α-harmonic equation. In particular, for g 0, the solutions to the above equation are called α-harmonic functions. We determine the necessary and sufficient conditions for an analytic function to have the property that f is α-harmonic function for any α-harmonic function f. Furthermore, we discuss the Bergman-type spaces on α-harmonic functions.