A K\"ahler potential on the unit ball with constant differential norm

Abstract

Let Bn be the unit ball in Cn and Hn be the homogeneous Siegel domain of the second kind which is biholomorphic to Bn. We show that the K\"ahler potential of Hn is unique up to the automorphisms among K\"ahler potentials whose differentials have constant norms. As an application, we consider a domain in Cn, which is biholomorphic to Bn. We show that if is affine homogeneous, then it is affine equivalent to Hn. Assume next that its canonical potential with respect to the K\"ahler--Einstein metric has a differential with a constant norm. If the biholomorphism between and Bn is a restriction of a M\"obius transformation, then the map is affine equivalent to a Cayley transform.