Support points for families of univalent mappings on bounded symmetric domains

Abstract

In this paper we study some extremal problems for the family Sg0(BX) of normalized univalent mappings with g-parametric representation on the unit ball BX of an n-dimensional JB*-triple X with r≥ 2, where r is the rank of X and g is a convex (univalent) function on the unit disc U, which satisfies some natural assumptions. We obtain sharp coefficient bounds for the family Sg0(BX), and examples of bounded support points for various subsets of Sg0(BX). Our results are generalizations to bounded symmetric domains of known recent results related to support points for families of univalent mappings on the Euclidean unit ball Bn and the unit polydisc Un in Cn. Certain questions will be also mentioned. Finally, we point out sharp coefficient bounds and bounded support points for the family Sg0(Bn) and for special compact subsets of Sg0(Bn), in the case n≥ 2.