On Lipschitz continuity of solutions of hyperbolic Poisson's equation

Abstract

In this paper, we investigate solutions of the hyperbolic Poisson equation hu(x)=(x), where ∈ L∞(Bn, Rn) and \[ hu(x)= (1-|x|2)2 u(x)+2(n-2)(1-|x|2)Σi=1n xi ∂ u∂ xi(x) \] is the hyperbolic Laplace operator in the n-dimensional space Rn for n 2. We show that if n≥ 3 and u∈ C2(Bn,Rn) C(Bn,Rn ) is a solution to the hyperbolic Poisson equation, then it has the representation u=Ph[φ]-G h[] provided that uSn-1=φ and ∫Bn(1-|x|2)n-1 |(x)|\,dτ(x)<∞. Here Ph and Gh denote Poisson and Green integrals with respect to h, respectively. Furthermore, we prove that functions of the form u=Ph[φ]-Gh[] are Lipschitz continuous.