Variability regions for the n-th derivative of bounded analytic functions

Abstract

Let H be the class of all analytic self-maps of the open unit disk D. Denote by Hn f(z) the n-th order hyperbolic derivative of f∈ H at z∈ D. For z0∈ D and γ = (γ0, γ1 , … , γn-1) ∈ Dn, let H (γ) = \f ∈ H : f (z0) = γ0,H1f (z0) = γ1,… ,Hn-1f (z0) = γn-1 \. In this paper, we determine the variability region V(z0, γ ) = \ f(n)(z0) : f ∈ H (γ) \, which can be called ``the generalized Schwarz-Pick Lemma of n-th derivative". We then apply the generalized Schwarz-Pick Lemma to establish a n-th order Dieudonn\'e's Lemma, which provides an explicit description of the variability region \h(n)(z0): h∈ H, h(0)=0,h(z0) =w0, h'(z0)=w1,…, h(n-1)(z0)=wn-1\ for given z0, w0, w1,…,wn-1. Moreover, we determine the form of all extremal functions.