Euclidean Rhythm with Palindromic Rests

Author:

Mukherjee ParajORCID

Publisher

Springer Nature Switzerland

Reference10 articles.

1. Bjorklund, E.: A metric for measuring the evenness of timing system rep-rate patterns. SNS ASD Tech Note, SNS-NOTECNTRL-100 (2003)

2. Bjorklund, E.: The theory of rep-rate pattern generation in the SNS timing system. SNS ASD Tech Note, SNS-NOTE-CNTRL-99 (2003)

3. Clough, J., Douthett, J., Krantz, R.: Maximally even sets: a discovery in mathematical music theory is found to apply in physics. In: Bridges: Mathematical Connections in Art, Music, and Science, pp. 193-200. Central Plain Book Manufacturing Winfield (2000)

4. Gómez-Martín, F., Taslakian, P., Toussaint, G.: Structural properties of Euclidean rhythms. J. Math. Music 3(1), 1–14 (2009)

5. Harminc, M., Sotdk, R.: Palindromic numbers in arithmetic progressions. Fibonacci Q. 36, 259–261 (1998)

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