34 APPENDIX: Cycle Count T ables We record the numbers of cycles of various types for the Eulerian tonnetz, the Archimedean tonnetz, and the Tristan-genus tonnetz

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math.CO · 2025-05-13 · unverdicted · novelty 6.0

The tonnetz Levi graph is realized as a {12_3} configuration of Daublebsky von Sterneck type D222, linking music theory to combinatorial geometry.

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Configurations, Tessellations and Tone Networks math.CO · 2025-05-13 · unverdicted · none · ref 52
The tonnetz Levi graph is realized as a {12_3} configuration of Daublebsky von Sterneck type D222, linking music theory to combinatorial geometry.