1

1. GRUENBAUM, Brnako; SHEPHARD, G.C. Tilings and Patterns. New York : W.H. Freeman, c1987. ix, Chapter 10 : Aperiodic tilings. ISBN 0716711931.

2. GLASSNER, Andrew. Andrew Glassner’s Notebook. IEEE Computer Graphics. 1998, no.7/8, s. 79-86.

3. GLASSNER, Andrew. Andrew Glassner's notebook : recreational computer graphics. San Francisco, Calif. : Morgan Kaufmann, c1999. Chapter 12 : Aperiodic tiling. ISBN 1558605983

4. GARDNER, Martin. Mathematical games. Scientific American. 1977, vol. 236, s. 110-121.

5. Dr.Matrix programming challenge. [online]. Last-Modified: Sat, 16 Dec 2000 [cit. 2001-01-06]. Dostupný z WWW: <http://scientium.com/drmatrix/progchal.htm>.

6. DE BRUJIN, N. G. Algebraic theory of Penrose's nonperiodic tilings of the plane I. In Proceedings of the royal netherlads academy of sciences . ser. a . mathematical sciences, vol. 43. Amsterdam : North Holland publ, 1981, s. 39-66.

7. KARI, Jarko. A small aperiodic set of Wang Tiles. Discrete Mathematics. 1996, vol. 160, s. 259-264.

8. GOODMAN-STRAUSS, C. Aperiodic Hierarchical Tilings. In RIVIER, N. (ed.). NATO-ASI Foams, Emulsions, and Cellular Materials [online]. 1999 [cit. 2001-01-06] ,s. 481-496. Dostupný z WWW: <http://comp.uark.edu/~cgstraus/papers/index.html>

9. GOODMAN-STRAUSS, C. An aperiodic pair of tiles in Eⁿ for all n >= 3 [online]. 1999 [cit. 2001-01-06]. Dostupný z WWW: <http://comp.uark.edu/~cgstraus/papers/index.html>

10. GOODMAN-STRAUSS, C. Matching rules and substitution tilings [online]. 1996 [cit. 2001-01-06]. Dostupný z WWW: <http://comp.uark.edu/~cgstraus/papers/index.html>

11. GOODMAN-STRAUSS, C. Open Questions in Tilings [online]. Fayetteville (Arakansas,USA) : University of Arkansas, 2000 [cit. 2001-01-06]. Dostupný z WWW: <http://comp.uark.edu/~cgstraus/papers/index.html>

12. GOODMAN-STRAUSS, C. Dodecafoam and substitution tilings [online]. Fayetteville (Arakansas,USA) : University of Arkansas, 2000 [cit. 2001-01-06]. Dostupný z WWW: <http://comp.uark.edu/~cgstraus/papers/index.html>

13. REINSCH, M. W. Lattice representations of Penrose tilings of the plane [online]. Berkley : University of California, 1999 [cit. 2001-01-06]. Dostupný z WWW: < http://www.arxiv.org/abs/math-ph/9911024>

14. GRIMM, U. Aperiodic Tilings on the Computer [online]. Chemnitz : Technical university Chemnitz, 1999 [cit. 2001-01-06]. Dostupný z WWW: <http://www.arxiv.org/abs/cond-mat/9903010>

15. VIDAL, J. Generalized Rauzy tilings [online]. Paris : Universites Pierre et Marie Curie, 2000 [cit. 2001-01-06]. Dostupný z WWW: <http://www.arxiv.org/abs/cond-mat/0009277>

16. STEINHARDT, Paul J. A New Paradigm for the Structure of Quasicrystals [online]. Princeton : Princeton University, Last-Modified: Thu, 25 Mar 1999 [cit. 2001-01-06]. Dostupný z WWW: <http://feynman.princeton.edu/~steinh/quasi/>

17. BAAKE, M. A guide to mathematical quasicrystals [online]. Tuebingen : Fakulaet fuer physik, 1999 [cit. 2001-01-06]. Dostupný z WWW: <http://www.arxiv.org/abs/math-ph/9901014>

18. PETERSON, Ivar. Coloring Penrose Tiles [online]. Washington : Science Service, 1999 [cit. 2001-01-06]. Dostupný z WWW: <http://www.sciencenews.org/sn_arc99/5_15_99/mathland.htm>

19. PETERSON, Ivar. Tiling with Polyominoes [online]. Washington : Science Service, 1999 [cit. 2001-01-06]. Dostupný z WWW: <http://www.sciencenews.org/sn_arc99/9_25_99/mathland.htm>

20. WEBER, S. Introduction to Quasicrystals [online]. Tsukuba : National Institute for Research in Inorganic Materials, since 4/4/1999 [cit. 2001-01-06]. Dostupný z WWW: <http://www.nirim.go.jp/~weber/qc.html>

21. CASPAR, L. D.; FONTANO, E. Five-fold symmetry in crystalline quasicrystal lattices [online]. Panama City (Florida, USA) : Florida state uviversity, December 1996 [cit. 2001-01-06]. Dostupný z WWW: <http://www.sb.fsu.edu/~caspar/201/>

22. KOVAŘÍK, Martin. Generátor ornamentů. 2000. 67 s. Diplomová práce na Masarykově universitě Brno fakulta informatiky.

23. HAVLÍNOVÁ, Zdeňka. Generátor mozaiky. 2000. 35s. Diplomová práce na Vysokém učení technickém Brno fakulta elektrotechniky a informatiky, ústav informatiky.

24. JABLAN, Slavik. Symmetry and ornament [online]. Belgrade : Mathematical Institute, 1995 [cit. 2001-01-06]. Dostupný z WWW: <http://www.math.muni.cz/EMIS/monographs/jablan/>

25. ROBLES, C. Tilings [online]. Vancouver : Department of Mathematics The University of British Columbia, Last-Modified: Tue, 08 Sep 1998 [cit. 2001-01-06]. Dostupný z WWW: <http://www.math.ubc.ca/~robles/tiling/>.

26. CAHFFIN, B. Aperiodic Tiling in Three Dimensions [online]. Williamstown : Williams College Department of Computer Science, Last-Modified: Tue, 28 Apr 1998 [cit. 2001-01-06]. Dostupný z WWW: <http://www.cs.williams.edu/~98bcc/tiling/index.html>.

27. DURAND, E. QuasiTiler 3.0 [online]. Minneapolis : The Geometry Center University of Minnesota, 1994, Last-Modified: Fri, 11 Dec 1998 [cit. 2001-01-06]. Dostupný z WWW: <http://www.geom.umn.edu/apps/quasitiler/>.

28. LEWIS, A. D. Some Planar Tilings [online]. Kingston : Department of Mathematics & Statistics Queen's University, Last Updated: Sunday, 31-Oct-1999 [cit. 2001-01-06]. Dostupný z WWW: <http://penelope.mast.queensu.ca/~andrew/qc>.

29. Penrose Tilings (Science U) [online]. St. Paul (Minnesota,USA) : Geometry Technologies, Page last updated Wed Jul 28 16:36:32 CDT 1999 [cit. 2001-01-06]. Dostupný z WWW: <http://www.scienceu.com/geometry/articles/tiling/penrose.html>.

30. Penrose tilings [online]. Durham (North Carolina,USA) : Duke university, Last-Modified: Thu, 27 Jul 2000 [cit. 2001-01-06]. Dostupný z WWW: <http://freespeech.org/optigone/sites/penrose/>

31. EPPSTEIN, David. The Geometry Junkyard [online]. Irvine : University of California, Last update: 05 Jan 2001 [cit. 2001-01-06]. Dostupný z WWW: <http://www.ics.uci.edu/~eppstein/junkyard/>

32. WRIGHT D. J. Dynamical Systems and Fractals: Lecture notes[online]. Stillwater : Oklahoma State University, 1996 [cit. 2001-01-06]. Dostupný z WWW: <http://www.math.okstate.edu/mathdept/dynamics/lecnotes/lecnotes.html1>