Asymptotic behavior of orbits of holomorphic semigroups

Abstract

Let (φt) be a holomorphic semigroup of the unit disc (i.e., the flow of a semicomplete holomorphic vector field) without fixed points in the unit disc and let be the starlike at infinity domain image of the Koenigs function of (φt). In this paper we completely characterize the type of convergence of the orbits of (φt) to the Denjoy-Wolff point in terms of the shape of . In particular we prove that the convergence is non-tangential if and only if the domain is `quasi-symmetric with respect to vertical axes'. We also prove that such conditions are equivalent to the curve [0,∞) t φt(z) being a quasi-geodesic in the sense of Gromov. Also, we characterize the tangential convergence in terms of the shape of .