Pasting together Julia sets: a worked out example of mating.
Milnor, John (2004)
Experimental Mathematics
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Displaying similar documents to “Twisted matings and equipotential gluings”
Pasting together Julia sets: a worked out example of mating.
Questions about Polynomial Matings
Xavier Buff, Adam L. Epstein, Sarah Koch, Daniel Meyer, Kevin Pilgrim, Mary Rees, Tan Lei (2012)
Annales de la faculté des sciences de Toulouse Mathématiques
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We survey known results about polynomial mating, and pose some open problems.
Introduction
Pascale Roesch (2012)
Annales de la faculté des sciences de Toulouse Mathématiques
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Tan Lei and Shishikura’s example of non-mateable degree 3 polynomials without a Levy cycle
Arnaud Chéritat (2012)
Annales de la faculté des sciences de Toulouse Mathématiques
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After giving an introduction to the procedure dubbed and quickly recalling known results about more classical notions of polynomial mating, we show conformally correct pictures of the slow mating of two degree post critically finite polynomials introduced by Shishikura and Tan Lei as an example of a non matable pair of polynomials without a Levy cycle. The pictures show a limit for the Julia sets, which seems to be related to the Julia set of a degree rational map. We give a conjectural...
An algebraic formulation of Thurston’s characterization of rational functions
Kevin M. Pilgrim (2012)
Annales de la faculté des sciences de Toulouse Mathématiques
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Following Douady-Hubbard and Bartholdi-Nekrashevych, we give an algebraic formulation of Thurston’s characterization of rational functions. The techniques developed are applied to the analysis of the dynamics on the set of free homotopy classes of simple closed curves induced by a rational function. The resulting finiteness results yield new information on the global dynamics of the pullback map on Teichmüller space used in the proof of the characterization theorem.
On The Notions of Mating
Carsten Lunde Petersen, Daniel Meyer (2012)
Annales de la faculté des sciences de Toulouse Mathématiques
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The different notions of matings of pairs of equal degree polynomials are introduced and are related to each other as well as known results on matings. The possible obstructions to matings are identified and related. Moreover the relations between the polynomials and their matings are discussed and proved. Finally holomorphic motion properties of slow-mating are proved.