Fractal Tilings and developments of doubly-covered squares
スポンサーリンク
概要
- 論文の詳細を見る
By considering a 2 x 2 integer matrix and a digit set, we investigate a tiling problem and also the relationship between a tiling and a development of a doubly-covered square.
著者
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Takeo Fukiko
Department Of Information Sciences Faculty Of Science Ochanomizu University
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Negishi Nobue
Department of Information Sciences, Ochanomizu University
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Kamio Nao
Department of Information Sciences, Ochanomizu University
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Kamio Nao
Department Of Information Sciences Ochanomizu University
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Negishi Nobue
Department Of Information Sciences Ochanomizu University
関連論文
- THE LIMIT SET OF CELLULAR AUTOMATA
- The Absolute Value of an Element of the Complexification of a Simplex Space
- Self Similar Sets aud Quotient Sets of Infinite Sequences
- On a Simplex Homomorphism, II
- On a pole of the resolvent of positive operators
- Some Spectral Properties of Positive, Irreducible Operators in R-space
- On Proper Spaces of Some Positive Operators with the Property (W)
- Julia sets of z^2+c and laminations
- The Hausdorff dimension of generalized Sierpinski carpets
- Fractal Tilings and developments of doubly-covered squares
- On the Peripheral Spectrum of Operators
- On the Sencond Dual of a Simplex Space
- On a simplex homomorphism
- Box-counting Dimension of Graphs of Generalized Takagi Series
- On the Peripheral Point Spectrum of a Simplex Homomorphism