Abstract
In this paper we consider extreme points and support points for compact subclasses of normalized biholomorphic mappings of the Euclidean unit ball Bn in ℂn. We consider the class S0(Bn) of biholomorphic mappings on Bn which have parametric representation, i.e., they are the initial elements f(·, 0) of a Loewner chain f(z, t) = etz + … such that {e−tf(·, t)}t⩾0 is a normal family on Bn. We show that if f(·, 0) is an extreme point (respectively a support point) of S0(Bn), then e−tf(·, t) is an extreme point of S0(Bn) for t ⩽ 0 (respectively a support point of S0(Bn) for t ∈ [0,t0] and some t0 > 0). This is a generalization to the n-dimensional case of work due to Pell. Also, we prove analogous results for mappings which belong to S0(Bn) and which are bounded in the norm by a fixed constant. We relate the study of this class to reachable sets in control theory generalizing work of Roth. Finally we consider extreme points and support points for biholomorphic mappings of Bn generated by using extension operators that preserve Loewner chains.
Published Version
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