The Heinz type inequality, Bloch type theorem and Lipschitz characteristic of polyharmonic mappings

Abstract

Suppose that f satisfies the following: (1) the polyharmonic equation mf=(m-1 f)=m (m∈ C(Bn,Rn)), (2) the boundary conditions 0f=0,1f=1,~…,~m-1f=m-1 on Sn-1 (j∈ C(Sn-1,Rn) for j∈\0,1,…,m-1\ and Sn-1 denotes the boundary of the unit ball Bn), and (3) f(0)=0, where n≥3 and m≥1 are integers. Initially, we prove a Schwarz type lemma and use it to obtain a Heinz type inequality of mappings satisfying the polyharmonic equation with the above Dirichlet boundary value conditions. Furthermore, we establish a Bloch type theorem of mappings satisfying the above polyharmonic equation, which gives an answer to an open problem in CP-Hi. Additionally, we show that if f is a K-quasiconformal self-mapping of Bn satisfying the above polyharmonic equation, then f is Lipschitz continuous, and the Lipschitz constant is asymptotically sharp as K 1+ and \|j\|∞ 0+ for j∈\1,…,m\.