Characterizations of convergence by a given set of angles in simply connected domains
Abstract
Let be a simply connected domain and f:D , where D is the unit disk, be a corresponding Riemann map. Let zn⊂ be a sequence with no accumulation points inside . In the present article, we give necessary and sufficient conditions in terms of hyperbolic geometry which certify that f-1(zn) converges to a point of ∂ D by a certain angle θ or by a certain set of angles [θ1, θ2].
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