Variation of Loewner chains, extreme and support points in the class S0 in higher dimensions
Abstract
We introduce a family of natural normalized Loewner chains in the unit ball, which we call "ger\"aumig"---spacious---which allow to construct, by means of suitable variations, other normalized Loewner chains which coincide with the given ones from a certain time on. We apply our construction to the study of support points, extreme points and time- M-reachable functions in the class S0 of mappings admitting parametric representation.
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