Questions about polynomial matings
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Publication:1950988
DOI10.5802/afst.1365zbMath1364.37099OpenAlexW2051659709MaRDI QIDQ1950988
Sarah Koch, Daniel Meyer, Lei Tan, Kevin M. Pilgrim, Mary Rees, Xavier Buff, Adam Lawrence Epstein
Publication date: 28 May 2013
Published in: Annales de la Faculté des Sciences de Toulouse. Mathématiques. Série VI (Search for Journal in Brave)
Full work available at URL: http://afst.cedram.org:80/afst-bin/item?id=AFST_2012_6_21_S5_1149_0
Related Items (8)
Mating of discrete trees and walks in the quarter-plane ⋮ From rubber bands to rational maps: a research report ⋮ Combination Theorems in Groups, Geometry and Dynamics ⋮ On geometrically finite degenerations II: convergence and divergence ⋮ Algorithmic aspects of branched coverings IV/V. Expanding maps ⋮ Tan Lei and Shishikura's example of non-mateable degree 3 polynomials without a Lévy cycle ⋮ Algorithmic aspects of branched coverings ⋮ Thurston's algorithm and rational maps from quadratic polynomial matings
Cites Work
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- Invariant Peano curves of expanding Thurston maps
- The classification of Kleinian surface groups. II: The Ending lamination conjecture
- Mating non-renormalizable quadratic polynomials
- Components of degree two hyperbolic rational maps
- A partial description of parameter space of rational maps of degree two. I
- A proof of Thurston's topological characterization of rational functions
- On Julia sets of postcritically finite branched coverings. II: \(S^1\)-parametrization of Julia sets.
- Captures, matings and regluings
- Tan Lei and Shishikura's example of non-mateable degree 3 polynomials without a Lévy cycle
- Twisted matings and equipotential gluings
- Matings and the other side of the dictionary
- Cannon-Thurston maps for surface groups
- Group invariant Peano curves
- The Medusa algorithm for polynomial matings
- Counting hyperbolic components
- Unmating of rational maps, sufficient criteria and examples
- On pinching deformations of rational maps
- Simultaneous uniformization
- Mating a Siegel disk with the Julia set of a real quadratic polynomial
- Multiple equivalent matings with the aeroplane polynomial
- Matings of quadratic polynomials
- No elliptic limits for quadratic maps
- Geometry and Dynamics of Quadratic Rational Maps
- A Family of Cubic Rational Maps and Matings of Cubic Polynomials
- Mating Siegel quadratic polynomials
- Expanding Thurston Maps
- Convergence of pinching deformations and matings of geometrically finite polynomials
- Pasting Together Julia Sets: A Worked Out Example of Mating
- Constructing rational maps with cluster points using the mating operation
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