Infinitesimal generators associated with semigroups of linear fractional maps

Abstract

We characterize the infinitesimal generator of a semigroup of linear fractional self-maps of the unit ball in Cn, n≥ 1. For the case n=1 we also completely describe the associated Koenigs function and we solve the embedding problem from a dynamical point of view, proving, among other things, that a generic semigroup of holomorphic self-maps of the unit disc is a semigroup of linear fractional maps if and only if it contains a linear fractional map for some positive time.

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