A proof of the Muir-Suffridge conjecture for convex maps of the unit ball in Cn

Abstract

We prove (and improve) the Muir-Suffridge conjecture for holomorphic convex maps. Namely, let F: Bn Cn be a univalent map from the unit ball whose image D is convex. Let S⊂ ∂ Bn be the set of points such that z \|F(z)\|=∞. Then we prove that S is either empty, or contains one or two points and F extends as a homeomorphism F: Bn S D. Moreover, S= if D is bounded, S has one point if D has one connected component at ∞ and S has two points if D has two connected components at ∞ and, up to composition with an affine map, F is an extension of the strip map in the plane to higher dimension.