Symmetries and regularity for holomorphic maps between balls

Abstract

Let f: Bn BN be a holomorphic map. We study subgroups f ⊂eq Aut( Bn) and Tf ⊂eq Aut( BN). When f is proper, we show both these groups are Lie subgroups. When f contains the center of U(n), we show that f is spherically equivalent to a polynomial. When f is minimal we show that there is a homomorphism :f Tf such that f is equivariant with respect to . To do so, we characterize minimality via the triviality of a third group Hf. We relate properties of Ker() to older results on invariant proper maps between balls. When f is proper but completely non-rational, we show that either both f and Tf are finite or both are noncompact.