Bi-Lipschitz characteristic of quasiconformal self-mappings of the unit disk satisfying bi-harmonic equation

Abstract

Suppose that f is a K-quasiconformal self-mapping of the unit disk D, which satisfies the following: (1) the biharmonic equation ( f)=g (g∈ C(D)), (2) the boundary condition f= (∈C(T) and T denotes the unit circle), and (3) f(0)=0. The purpose of this paper is to prove that f is Lipschitz continuos, and, further, it is bi-Lipschitz continuous when \|g\|∞ and \|\|∞ are small enough. Moreover, the estimates are asymptotically sharp as K 1, \|g\|∞ 0 and \|\|∞ 0, and thus, such a mapping f behaves almost like a rotation for sufficiently small K, \|g\|∞ and \|\|∞.