Non-tangential limits and the slope of trajectories of holomorphic semigroups of the unit disc

Abstract

Let ⊂neq C be a simply connected domain, let f: D be a Riemann map and let \zk\⊂ be a compactly divergent sequence. Using Gromov's hyperbolicity theory, we show that \f-1(zk)\ converges non-tangentially to a point of ∂ D if and only if there exists a simply connected domain U⊂neq C such that ⊂ U and contains a tubular hyperbolic neighborhood of a geodesic of U and \zk\ is eventually contained in a smaller tubular hyperbolic neighborhood of the same geodesic. As a consequence we show that if (φt) is a non-elliptic semigroup of holomorphic self-maps of D with K\"onigs function h and h( D) contains a vertical Euclidean sector, then φt(z) converges to the Denjoy-Wolff point non-tangentially for every z∈ D as t +∞. Using new localization results for the hyperbolic distance, we also construct an example of a parabolic semigroup which converges non-tangentially to the Denjoy-Wolff point but oscillating, in the sense that the slope of the trajectories is not a single point.