Complexity spectrum: Difference between revisions
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The '''complexity spectrum''' of a [[regular temperament|temperament]] is a sequence of [[odd limit|''q''-odd-limit]] [[interval]]s between the [[unison]] and half an [[octave]] sorted by their [[Tenney-Euclidean metrics|temperamental complexity]], where ''q'' is two less than the next [[prime]] after the [[prime limit]] of the temperament in question. In the case of rank-2 temperaments, the complexity is [[Graham complexity]], but for higher limits we can use the [[Tenney-Euclidean metrics #Octave equivalent TE seminorm|octave-equivalent TE seminorm]], which is proportional to Graham complexity in the rank-2 case, but is also valid for higher limits. | |||
The different flavors of a temperament, so to speak, are shown in its spectrum. A temperament like meantone, which favors 3 over 5, and 5 over 7, has quite a different flavor than miracle, which favors 7, 11/9 and 7/5. | The different flavors of a temperament, so to speak, are shown in its spectrum. A temperament like meantone, which favors 3 over 5, and 5 over 7, has quite a different flavor than miracle, which favors 7, 11/9 and 7/5. | ||
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: 5/4, 4/3, 7/6, 8/7, 7/5, 6/5, 9/7, 12/11, 9/8, 11/8, 11/9, 10/9, 11/10, 14/11 | : 5/4, 4/3, 7/6, 8/7, 7/5, 6/5, 9/7, 12/11, 9/8, 11/8, 11/9, 10/9, 11/10, 14/11 | ||
You can see it favors 5 over 7 and 7 over 11; for how much | You can see it favors 5 over 7 and 7 over 11; for how much we could stick in the actual numerical complexities, but you can see that 9/8 and 10/9 are more complex than some 7 and 11 limit intervals just from the above. | ||
Here's the spectrum for 13-limit [[Werckismic temperaments #History|history]], the temperament tempering out 364/363, 441/440 and 1001/1000 which is part of [[the Archipelago]]: | Here's the spectrum for 13-limit [[Werckismic temperaments #History|history]], the temperament tempering out 364/363, 441/440 and 1001/1000 which is part of [[the Archipelago]]: | ||
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: 11/10, 15/13, 14/11, 4/3, 7/5, 5/4, 11/8, 18/13, 15/11, 13/12, 13/10, 6/5, 8/7, 16/15, 12/11, 13/11, 9/8, 16/13, 15/14, 10/9, 7/6, 11/9, 14/13, 9/7 | : 11/10, 15/13, 14/11, 4/3, 7/5, 5/4, 11/8, 18/13, 15/11, 13/12, 13/10, 6/5, 8/7, 16/15, 12/11, 13/11, 9/8, 16/13, 15/14, 10/9, 7/6, 11/9, 14/13, 9/7 | ||
Even leaving aside the somewhat greater complexity and accuracy, it just | Even leaving aside the somewhat greater complexity and accuracy, it just will not taste the same. | ||
[[Category: | == External links == | ||
* [https://yahootuninggroupsultimatebackup.github.io/tuning-math/topicId_18933.html Yahoo! Tuning Group | ''Spectrum of a temperament''] – [[Gene Ward Smith]]'s original post | |||
[[Category:Complexity]] | |||
[[Category:Terms]] | [[Category:Terms]] | ||
Latest revision as of 10:55, 25 August 2024
The complexity spectrum of a temperament is a sequence of q-odd-limit intervals between the unison and half an octave sorted by their temperamental complexity, where q is two less than the next prime after the prime limit of the temperament in question. In the case of rank-2 temperaments, the complexity is Graham complexity, but for higher limits we can use the octave-equivalent TE seminorm, which is proportional to Graham complexity in the rank-2 case, but is also valid for higher limits.
The different flavors of a temperament, so to speak, are shown in its spectrum. A temperament like meantone, which favors 3 over 5, and 5 over 7, has quite a different flavor than miracle, which favors 7, 11/9 and 7/5.
Here's the spectrum for 11-limit marvel:
- 5/4, 4/3, 7/6, 8/7, 7/5, 6/5, 9/7, 12/11, 9/8, 11/8, 11/9, 10/9, 11/10, 14/11
You can see it favors 5 over 7 and 7 over 11; for how much we could stick in the actual numerical complexities, but you can see that 9/8 and 10/9 are more complex than some 7 and 11 limit intervals just from the above.
Here's the spectrum for 13-limit history, the temperament tempering out 364/363, 441/440 and 1001/1000 which is part of the Archipelago:
- 11/10, 15/13, 14/11, 4/3, 7/5, 5/4, 11/8, 18/13, 15/11, 13/12, 13/10, 6/5, 8/7, 16/15, 12/11, 13/11, 9/8, 16/13, 15/14, 10/9, 7/6, 11/9, 14/13, 9/7
Even leaving aside the somewhat greater complexity and accuracy, it just will not taste the same.
External links
- Yahoo! Tuning Group | Spectrum of a temperament – Gene Ward Smith's original post