The parabola theorem on continued fractions
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Publication:523312
DOI10.1007/s40315-016-0164-0zbMath1364.30006OpenAlexW2283275649MaRDI QIDQ523312
Publication date: 20 April 2017
Published in: Computational Methods and Function Theory (Search for Journal in Brave)
Full work available at URL: http://oro.open.ac.uk/45359/1/cmft15114.pdf
Möbius transformationsconical limit pointscontinued fractionshyperbolic geometryparabola theoremStern-Stolz series
Conformal metrics (hyperbolic, Poincaré, distance functions) (30F45) Continued fractions; complex-analytic aspects (30B70) Convergence and divergence of continued fractions (40A15)
Cites Work
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- Continued fractions. Vol. 1: Convergence theory
- The limiting behavior of sequences of Moebius transformations
- Continued fractions, discrete groups and complex dynamics
- Continued fractions with complex elements
- Two families of twin convergence regions for continued fractions
- The continued fraction as a sequence of linear transformations
- The Seidel, Stern, Stolz and Van Vleck Theorems on continued fractions
- General Convergence of Continued Fractions
- Limiting Structures for Sequences of Linear Fractional Transformations
- Hausdorff dimension of sets of divergence arising from continued fractions
- Conical limit sets and continued fractions
- A General Convergence Criterion for Continued Fractions K(a n /b n )
- A Convergence Theorem for Continued Fractions
- Continued Fractions With Absolutely Convergent Even and Odd Parts
- On value regions of continued fractions
- The geometry of Pringsheim's continued fractions
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