%0 Journal Article
%A Gallardo GutiĆ©rrez, Eva A.
%A Nieminen, Pekka J.
%T The Linear Fractional Model Theorem and Aleksandrov-Clark measures
%D 2015
%@ 0024-6107
%U https://hdl.handle.net/20.500.14352/34941
%X A remarkable result by Denjoy and Wolff states that every analytic self-map. of the open unit disc D of the complex plane, except an elliptic automorphism, has an attractive fixed point to which the sequence of iterates {phi(n)}(n >= 1) converges uniformly on compact sets: if there is no fixed point in D, then there is a unique boundary fixed point that does the job, called the Denjoy-Wolff point. This point provides a classification of the analytic self-maps of D into four types: maps with interior fixed point, hyperbolic maps, parabolic automorphism maps and parabolic non-automorphism maps. We determine the convergence of the Aleksandrov-Clark measures associated to maps falling in each group of such classification
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