On an extremal problem for harmonic maps conformal at a point

Abstract

Let \( D\) denote the unit disc in \( C\). For a domain \(D⊂ C\) and a point \(p∈ D\), let \(MD(p)\) denote the supremum of \(\|df0\|\) over all harmonic maps \(f: D D\) with \(f(0)=p\) whose differential \(df0\) at \(0∈ D\) is conformal. If \(f: D D\) is a conformal diffeomorphism onto \(D\) with \(f(0)=p\), then \(\|df0\| MD(p)\). In a recent paper, the authors proved that equality holds when \(D= D\), and they asked whether equality can hold only when \(D\) is a round disc. We give a negative answer by proving that, among bounded convex pointed domains \(p∈ D⊂ C\) and up to translations, rotations, and reflections, equality holds if and only if, after moving \(p\) to the origin, \(D=F( D)\) where \(F: D C\) is a holomorphic map with \(F(0)=0\) and \(F'(z)=c1+az+λ z2\), where \(c>0\), \(|λ|<1\), and \(|a- aλ|<1-|λ|2\). This family contains strongly convex examples which are not round discs.