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Ford circle
Kaleidoscopic Symmetries and Self-Similarity of Integral Apollonian Gaskets
Farey Fractions
The Arithmetic of the Spheres
From Poincaré to Whittaker to Ford
The Hyperbolic, the Arithmetic and the Quantum Phase Michel Planat, Haret Rosu
Hofstadter Butterfly and a Hidden Apollonian Gasket
What Do Bloch Electrons in a Magnetic Field Have to Do with Apollonian Packing of Circles?
The Hyperbolic Geometry of Markov's Theorem on Diophantine
APOLLONIAN SUMS 1. Introduction a Descartes Configuration Is a Collection of Four Mutually Tangent Circles
Geometry of Farey-Ford Polygons
Parabolas Infiltrating the Ford Circles
Ford Circles and Spheres
Tale of Two Fractals: the Hofstadter Butterfly and the Integral Apollonian Gaskets
On Cross Sections to the Horocycle and Geodesic Flows on Quotients by Hecke Triangle Groups Diaaeldin Taha
Parabolas Infiltrating the Ford Circles by Suzanne C
A Family of Circles in a Window Ethan Taylor Lightfoot Southern Illinois University Carbondale,
[email protected]
Generation of Fractal Aesthetic Objects with Application in Digital Domain
Ford Circles and Spheres
Top View
A Tale of Two Fractals: the Hofstadter Butterfly and the Integral Apollonian Gaskets
Farey Sequences and Ford Circles Based on Notes from Dana Paquin and from Joshua Zucker and the Julia Robinson Math Festival
Continued Fractions and Hyperbolic Geometry
Observations on Continued Fractions from Ford's Point of View
Markov Spectra for Modular Billiards
The Farey Sequence
K-MOMENTS of DISTANCES BETWEEN CENTERS of FORD CIRCLES 1. Introduction Introduced in 1938 by Lester R. Ford
Rational Approximation Using Farey Sequence : Review
The Geometry of Continued Fractions As Analysed by Considering Möbius
Pythagorean Triplets, Integral Apollonians and the Hofstadter Butterfly
Farey Sequences, Ford Circles and Pick's Theorem
Moments of Distances Between Centres of Ford Spheres
The Farey Sequence and Its Niche(S)
Ford Circle: � the Pattern That Lies Within Caitlyn Kay
Fibonacci Numbers and Ford Circles