A characterization of orthogonal convergence in simply connected domains
Abstract
Let D be the unit disc in C and let f: D C be a Riemann map, =f( D). We give a necessary and sufficient condition in terms of hyperbolic distance and horocycles which assures that a compactly divergent sequence \zn\⊂ has the property that \f-1(zn)\ converges orthogonally to a point of ∂ D. We also give some applications of this to the slope problem for continuous semigroups of holomorphic self-maps of D.
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