https://orcid.org/0000-0001-7818-5103
References
- Andreatta, M., and Agon, C. (2009). Special issue: Tiling problems in music guest editors' foreword. Journal of Mathematics and Music, 3(2), 63–70. https://doi.org/10.1080/17459730903086140
- Baake, M., and Grimm, U. (2013). Aperiodic order. Vol. 1, Encyclopedia of Mathematics and its Applications, Vol. 149, Cambridge University Press, A mathematical invitation, With a foreword by Roger Penrose.
- Bonner, J. (2017). Islamic geometric patterns. Springer. Their historical development and traditional methods of construction, With a chapter on the use of computer algorithms to generate Islamic geometric patterns by Craig Kaplan, With a foreword by Roger Penrose. MR 3700321.
- Callender, C. (2013). Sturmian canons, Mathematics and computation in music, Lecture Notes in Comput. Sci., Vol. 7937 (pp. 64–75). Springer. MR 3120147.
- Callender, C. (2014). Performing the irrational: Paul Usher's arrangement of Nancarrow's study No. 33, Canon 2: 2. Music Theory Online, 20(1), 1–23. https://doi.org/10.30535/mto.20.1
- Callender, C. (2015). Infinite rhythmic tiling canons. In K. Delp, C. S. Kaplan, D. McKenna, and R. Sarhangi (Eds.), Proceedings of bridges 2015: Mathematics, music, art, architecture, culture (Phoenix, Arizona) (pp. 399–402). Tessellations Publishing. http://archive.bridgesmathart.org/2015/bridges2015-399.html.
- Canright, D. (1990). Fibonacci gamelan rhythms. Journal of the Just Intonation Network, 6(4).
- Carey, N., and Clampitt, D. (1996). Self-similar pitch structures, their duals, and rhythmic analogues. Perspectives of New Music, 34(2), 62–87. https://doi.org/10.2307/833471
- Cromwell, P. R. (2015). Cognitive bias and claims of quasiperiodicity in traditional Islamicpatterns. The Mathematical Intelligencer, 37(4), 30–44. https://doi.org/10.1007/s00283-015-9538-9
- Grünbaum, B., and Shephard, G. C. (2016). Tilings and patterns (2nd ed.). Dover Publications.
- Hall, R. W., and Klingsberg, P. (2006). Asymmetric rhythms and tiling canons. The American Mathematical Monthly, 113(10), 887–896. https://doi.org/10.1080/00029890.2006.11920376
- Kellendonk, J. (2008). Pattern equivariant functions, deformations and equivalence of tiling spaces. Ergodic Theory and Dynamical Systems, 28(4), 1153–1176. https://doi.org/10.1017/S014338570700065X
- Lind, D. A. (1987). Entropies of automorphisms of a topological Markov shift. Proceedings of the American Mathematical Society, 99(3), 589–595. https://doi.org/10.1090/proc/1987-099-03
- Manousakis, S. (2006). Musical L-systems [Master's thesis].
- Mason, S., and Saffle, M. (1994). L-systems, melodies and musical structure. Leonardo Music Journal, 4, 31–38. https://doi.org/10.2307/1513178
- Ong, D. C. (2020). Quasiperiodic music. Journal of Mathematics and the Arts, 14(4), 285–296. https://doi.org/10.1080/17513472.2020.1766339
- Prusinkiewicz, P. (1986). Score generation with L-systems. In Proceedings of the 1986 International Computer Music Conference (pp. 455–457).
- Rahn, J. (2011). A brief guide to the tiling articles. Perspectives of New Music, 49(2), 6–7. https://doi.org/10.2307/833396
- Robinson, Jr., E. A. (2004). Symbolic dynamics and tilings of Rd. In Symbolic dynamicsand its applications, Proc. Sympos. Appl. Math. (Vol. 60, pp. 81–119). American Mathematical Society.
- Sadun, L. (2008). Topology of tiling spaces. University Lecture Series, Vol. 46, American Mathematical Society.
- Shechtman, D., Blech, I., Gratias, D., and Cahn, J. W. (1984). Metallic phase with long-range orientational order and no translational symmetry. Physical Review Letters, 53(20), 1951–1953. https://doi.org/10.1103/PhysRevLett.53.1951
- Skala, M. (n.d.). Notes on notes on the plane. https://northcoastsynthesis.com/news/notes-on-notes-on-the-plane.
- Treviño, R. (2021). The algebraic structure of western meter. In preparation.
- Vuza, D. T. (1991). Supplementary sets and regular complementary unending canons (part one). Perspectives of New Music, 29(2), 22–49. https://doi.org/10.2307/833429
- Vuza, D. T. (1992a). Supplementary sets and regular complementary unending canons (part two). Perspectives of New Music, 30(1), 184–207. https://doi.org/10.2307/833290
- Vuza, D. T. (1992b). Supplementary sets and regular complementary unending canons (part three). Perspectives of New Music, 30(2), 102–124. https://doi.org/10.2307/3090628
- Vuza, D. T. (1993). Supplementary sets and regular complementary unending canons (part four). Perspectives of New Music, 31(1), 270–305. https://doi.org/10.2307/833054
- Worth, P., and Stepney, S. (2005). Growing music: Musical interpretations of L-systems. In F. Rothlauf, J. Branke, S. Cagnoni, D. W. Corne, R. Drechsler, Y. Jin, P. Machado, E. Marchiori, J. Romero, G. D. Smith, and G. Squillero, (Eds.), Applications of evolutionary computing (pp. 545–550). Springer.