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Fractal tilings derived from complex bases

Published online by Cambridge University Press:  01 August 2016

Sara Hagey
Affiliation:
Department of Mathematics and Computer Science, University of Akron, Akron, OH 44325-4002, USA. e-mails: [email protected], [email protected]
Judith Palagallo
Affiliation:
Department of Mathematics and Computer Science, University of Akron, Akron, OH 44325-4002, USA. e-mails: [email protected], [email protected]

Extract

Tilings have appeared in human activities since prehistoric times. The mathematical theory of tilings contains a rich supply of interesting and sometimes surprising facts as well as many challenging problems. A vast literature exists on the subject of tiling, and almost every imaginable variant of the question ‘How can a space be tiled by replicas of a set?’ has been discussed. Figure 1 shows a tiling of a portion of the plane where each tile is of the same size and shape and has a fractal boundary.

Type
Articles
Copyright
Copyright © The Mathematical Association 2001

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References

1. Mandelbrot, B. B. Fractals: form, chance and dimension. Freeman (1977).Google Scholar
2. Barnsley, M. F. Fractals everywhere, Academic Press (1993).Google Scholar
3. Darst, Richard Palagallo, J. A. and Price, T. E. Fractal tilings in the plane, Mathematics Magazine 71 (1998) pp. 1223.Google Scholar
4. Knuth, D. E. The art of computer programming, Vol. 2: seminumerical algorithms, Addison-Wesley (1981).Google Scholar
5. Katai, I. and Szabo, J. Canonical number systems for complex integers, Acta Sci. Math. (Szeged) 37 (1975) pp. 255260.Google Scholar
6. Gilbert, W. J. Fractal geometry derived from complex bases, The Mathematical Intelligencer 4 (1982) pp. 7886.Google Scholar
7. Lagarias, J. C. and Wang, Y. Integral self-affine tiles in Part II: lattice tilings, J. Fourier Analysis and Applications 3 (1997) pp. 83101.Google Scholar
8. Wang, Y. Self-affine tiles, Advances in wavelets, Lau, K. S. ed., Springer (1998) pp. 261285.Google Scholar