https://orcid.org/0000-0002-7942-1283
References
- Bosch, R., & Colley, U. (2012). Figurative mosaics from flexible Truchet tiles. Journal of Mathematics and the Arts, 7(3–4), 122–135. https://doi.org/10.1080/17513472.2013.838830
- Browne, C. (2008). Duotone Truchet-like tilings. Journal of Mathematics and the Arts, 2(4), 189–196. https://doi.org/10.1080/17513470902718252
- Collingwood, P. (1982). The techniques of tablet weaving. Robin and Russ Handweavers, Inc. McMinnville.
- Davis, D. (1997). On a Tiling scheme of M.C. Escher. Electronic Journal of Combinatorics, 1997, 4(2), R23. https://doi.org/10.37236/1338
- Dummit, D. S., & Foote, R. M. (2004). Abstract algebra (3rd ed.). John Wiley and Sons Inc.
- Gilbert, E. N., & Riordan, J. (1961). Symmetry types of periodic sequences. Illinois Journal of Mathematics, 5(4), 657–665. https://doi.org/10.1215/ijm/1255631587
- Graham, R., Knuth, D., & Patashnik, O. (1994). Concrete mathematics: A foundation for computer science (2nd ed.). Addison-Wesley.
- Grünbaum, B., & Shephard, G. C. (1987). Tilings and patterns. Freeman and Co.
- Hall, A., Almeida, P., & Teixeira, R. (2019). Exploring symmetry in rosettes of Truchet tiles. Journal of Mathematics and the Arts, 13(4), https://doi.org/10.1080/17513472.2019.1581963
- Krawczyk, R. J. (2011). Revisiting Truchet tilings. Conference of The International Society of The Arts, Mathematics and Architecture, ISAMA 2011, Columbia College, Chicago, IL.
- Lucas, E. (1961/1891). Théorie des Nombres. Gauthier-Villars. 1891, reprinted by Albert Blanchard.
- MacMahon, P. A. (1892). Applications of a theory of permutations in circular procession to the theory of numbers. The Proceedings of the London Mathematical Society, 23, 305–313.
- Passiouras, S. (2001). Escher tiles: http://www.eschertiles.com.
- Schattschneider, D. (1990). M.C. Escher, visions of symmetry (pp. 44–49). W.H. Freeman.
- Smith, C. S., & Boucher, P. (1987). The tiling patterns of Sebastien Truchet and the topology of structural hierarchy. Leonardo, 20(4), 373–385. https://doi.org/10.2307/1578535
- Truchet, P. S. (1722). Méthode pour faire une infinité de desseins différents, avec des carreaux mi-partis de deux couleurs par une ligne diagonale ou Observations du Père Dominique Douat, religieux Carme de la province de Toulouse. Florentin de Laulne, Claude Jombert, André Cailleau, Paris.
- Washburn, D., & Crowe, D. W. (1988). Symmetries of culture: Theory and practice of plane pattern analysis. Washington University Press.
- West, D. (2001). Introduction to graph theory (2nd ed.). Pearson.