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'''Superkleismic''' is a [[regular temperament]] defined in the [[7-limit | {{Infobox regtemp | ||
| Title = Superkleismic | |||
| Subgroups = 2.3.5.7, 2.3.5.7.11, 2.3.5.7.11.19 | |||
| Comma basis = [[875/864]], [[1029/1024]] (7-limit); <br>[[100/99]], [[245/242]], [[385/384]] (11-limit); <br>[[100/99]], [[133/132]], [[190/189]], [[385/384]] (L11.19) | |||
| Mapping = 1; 9 10 -3 2 14 | |||
| Edo join 1 = 15 | Edo join 2 = 26 | |||
| Generators = 5/3 | Generators tuning = 878.2 | Optimization method = CWE | |||
| MOS scales = [[3L 1s]], [[4L 3s]], [[4L 7s]], [[11L 4s]], [[15L 11s]] | |||
| Pergen = (P8, ccP4/9) | |||
| Odd limit 1 = 7 | Mistuning 1 = 6.09 | Complexity 1 = 15 | |||
| Odd limit 2 = 2.3.5.7.11.19 21 | Mistuning 2 = 8.85 | Complexity 2 = 26 | |||
}} | |||
'''Superkleismic''' is a [[regular temperament]] defined in the [[7-limit]] such that three [[6/5]] generators reach [[7/4]] (tempering out [[875/864]] ([[S-expression|S5/S6]]), the keema) and such that three [[8/7]] intervals reach [[3/2]] (tempering out [[1029/1024]] ([[S-expression|S7/S8]]), the gamelisma), making it a member of the [[gamelismic clan]] and a [[keemic temperaments|keemic temperament]]; its [[5-limit]] comma is [[1953125/1889568]], the shibboleth comma. It [[extension|extends]] extremely easily to the [[11-limit]] as well, by tempering out [[100/99]] ({{S|10}}) so that two generators reach [[16/11]], which also serves to extend the structure of [[orgone]] in the 2.7.11 subgroup. This implies [[385/384]] and [[441/440]] are tempered out as well, making it a subtemperament of [[portent]]. Furthermore, since in superkleismic, the interval [[21/20]] stands for half [[10/9]] = ([[19/18]])⋅([[20/19]]), we can identify 21/20, 20/19, and 19/18 together to add prime 19, tempering out [[361/360]] ({{S|19}}) and [[400/399]] ({{S|20}}). Superkleismic can also be defined in the [[13-limit]], where two generators are identified with [[13/9]] alongside 16/11, tempering out [[144/143]] and [[325/324]], and extended to 17 to reach the full [[19-limit]], based on the equivalence (8/7)<sup>2</sup> ~ [[17/13]] (natural in slendric) and tempering out [[273/272]] and [[833/832]], in addition to [[120/119]] and [[170/169]]. | |||
See [[ | The minor-third generator of superkleismic is ~6.3 cents sharp of pure 6/5, even wider than the [[kleismic]] minor third (~317 cents), and from this it derives its name. The two mappings unite at [[15edo]]. While not as simple or accurate as kleismic in the 5-limit, it comes into its own as a 7- and 11-limit temperament, approximating both simply and accurately in good tunings. Discarding the harmonics 3 and 5 and concentrating purely on that subgroup gets you orgone. [[41edo]] is a good tuning for superkleismic, with a minor-third generator of 11\41, and [[mos]]ses of 11 ([[4L 7s]]), 15 ([[11L 4s]]), or 26 notes ([[15L 11s]]) are available. | ||
See [[Gamelismic clan #Superkleismic]] for more technical data. | |||
== Interval chain == | == Interval chain == | ||
In the following table, odd harmonics 1–21 are '''bolded'''. | In the following table, odd harmonics and subharmonics 1–21 are '''bolded'''. | ||
{| class="wikitable center-1 right-2" | {| class="wikitable center-1 right-2" | ||
! # | ! rowspan="2" | # | ||
! Cents* | ! rowspan="2" | Cents* | ||
! Approximate | ! colspan="2" | Approximate ratios | ||
|- | |||
! 11-limit add-19 | |||
! Full 19-limit extension | |||
|- | |- | ||
| 0 | | 0 | ||
| 0. | | 0.0 | ||
| '''1/1''' | | '''1/1''' | ||
| | |||
|- | |- | ||
| 1 | | 1 | ||
| 321. | | 321.8 | ||
| 6/5 | | 6/5 | ||
| | |||
|- | |- | ||
| 2 | | 2 | ||
| 643. | | 643.6 | ||
| | | '''16/11''', 36/25 | ||
| 13/9, 19/13 | |||
|- | |- | ||
| 3 | | 3 | ||
| 965. | | 965.4 | ||
| '''7/4''' | | '''7/4''', 33/19 | ||
| 26/15, 30/17 | |||
|- | |- | ||
| 4 | | 4 | ||
| 87. | | 87.3 | ||
| 21/20, 22/21 | | 20/19, 19/18, 21/20, 22/21 | ||
| 18/17 | |||
|- | |- | ||
| 5 | | 5 | ||
| 409. | | 409.1 | ||
| 14/11 | | 14/11, 19/15, 24/19 | ||
| 34/27 | |||
|- | |- | ||
| 6 | | 6 | ||
| | | 730.9 | ||
| | | '''32/21''', 38/25 | ||
| 20/13, 26/17 | |||
|- | |- | ||
| 7 | | 7 | ||
| | | 1052.7 | ||
| 11/6 | | 11/6 | ||
| 24/13 | |||
|- | |- | ||
| 8 | | 8 | ||
| | | 174.5 | ||
| 10/9, 11/10 | | 10/9, 11/10, 21/19 | ||
| 19/17 | |||
|- | |- | ||
| 9 | | 9 | ||
| | | 496.3 | ||
| '''4/3''' | | '''4/3''', 33/25 | ||
| | |||
|- | |- | ||
| 10 | | 10 | ||
| | | 818.2 | ||
| '''8/5''' | | '''8/5''' | ||
| | |||
|- | |- | ||
| 11 | | 11 | ||
| | | 1140.0 | ||
| 35/18, 48/25, 52/27 | | 35/18, 48/25, 64/33 | ||
| 52/27 | |||
|- | |- | ||
| 12 | | 12 | ||
| | | 261.8 | ||
| 7/6 | | 7/6, 22/19 | ||
| 20/17 | |||
|- | |- | ||
| 13 | | 13 | ||
| | | 583.6 | ||
| 7/5 | | 7/5 | ||
| 24/17 | |||
|- | |- | ||
| 14 | | 14 | ||
| | | 905.4 | ||
| '''32/19''', 42/25, 56/33 | |||
| 22/13 | | 22/13 | ||
|- | |- | ||
| 15 | | 15 | ||
| | | 27.2 | ||
| | | 49/48, 55/54, 56/55, 64/63 | ||
| 40/39 | |||
|- | |- | ||
| 16 | | 16 | ||
| | | 349.1 | ||
| 11/9 | | 11/9 | ||
| '''16/13''' | |||
|- | |- | ||
| 17 | | 17 | ||
| | | 670.9 | ||
| 22/15 | | 22/15, 28/19, 40/27 | ||
| | |||
|- | |- | ||
| 18 | | 18 | ||
| | | 992.7 | ||
| '''16/9''' | | '''16/9''', 44/25 | ||
| | |||
|- | |- | ||
| 19 | | 19 | ||
| | | 114.5 | ||
| | | '''16/15''' | ||
| 14/13 | |||
|- | |- | ||
| 20 | | 20 | ||
| | | 436.3 | ||
| 32/25 | | 32/25 | ||
| 22/17 | |||
|- | |- | ||
| 21 | | 21 | ||
| | | 768.1 | ||
| 14/9 | | 14/9 | ||
| 80/51 | |||
|- | |- | ||
| 22 | | 22 | ||
| | | 1080.0 | ||
| 28/15 | | 28/15 | ||
| '''32/17''' | |||
|- | |||
| 23 | |||
| 201.8 | |||
| 28/25 | |||
| 44/39 | |||
|- | |||
| 24 | |||
| 523.6 | |||
| 49/36 | |||
| | |||
|- | |||
| 25 | |||
| 845.4 | |||
| 44/27 | |||
| 28/17, 64/39 | |||
|- | |||
| 26 | |||
| 1167.2 | |||
| 49/25, 88/45, 160/81 | |||
| 128/65 | |||
|} | |} | ||
<nowiki>*</nowiki> | <nowiki>*</nowiki> In 11-limit add-19 [[CWE]] tuning, octave reduced | ||
== Tunings == | == Tunings == | ||
=== Norm-based tunings === | |||
{| class="wikitable mw-collapsible mw-collapsed" | |||
|+ style="font-size: 105%; white-space: nowrap;" | 7-limit norm-based tunings | |||
|- | |||
! rowspan="2" | | |||
! colspan="3" | Euclidean | |||
|- | |||
! Constrained | |||
! Constrained & skewed | |||
! Destretched | |||
|- | |||
! Tenney | |||
| CTE: ~5/3 = 878.2017{{c}} | |||
| CWE: ~5/3 = 878.1077{{c}} | |||
| POTE: ~5/3 = 878.0699{{c}} | |||
|} | |||
{| class="wikitable mw-collapsible mw-collapsed" | |||
|+ style="font-size: 105%; white-space: nowrap;" | 11-limit norm-based tunings | |||
|- | |||
! rowspan="2" | | |||
! colspan="3" | Euclidean | |||
|- | |||
! Constrained | |||
! Constrained & skewed | |||
! Destretched | |||
|- | |||
! Tenney | |||
| CTE: ~5/3 = 878.1854{{c}} | |||
| CWE: ~5/3 = 878.1606{{c}} | |||
| POTE: ~5/3 = 878.1534{{c}} | |||
|} | |||
=== Tuning spectrum === | === Tuning spectrum === | ||
{| class="wikitable center- | {| class="wikitable center-all left-4" | ||
|- | |- | ||
! [[Eigenmonzo| | ! Edo<br>generators | ||
! Generator | ! [[Eigenmonzo|Unchanged interval<br>(eigenmonzo)]]* | ||
! Generator (¢) | |||
! Comments | ! Comments | ||
|- | |- | ||
| 6/5 | | | ||
| [[6/5]] | |||
| 315.641 | | 315.641 | ||
| Untempered tuning | |||
|- | |||
| '''[[15edo|4\15]]''' | |||
| | | | ||
| '''320.000''' | |||
| '''Lower bound of 7- through (L11.19) 21-odd-limit diamond monotone''' | |||
|- | |- | ||
| | | | ||
| [[22/21]] | |||
| 320.134 | |||
| | |||
|- | |||
| | |||
| [[11/10]] | |||
| 320.626 | |||
| | |||
|- | |||
| | |||
| [[24/19]] | |||
| 320.888 | |||
| | |||
|- | |||
| | |||
| [[21/20]] | |||
| 321.117 | |||
| 1/4-keema | |||
|- | |- | ||
| | | [[71edo|19\71]] | ||
| | | | ||
| 321.127 | |||
| | | | ||
|- | |- | ||
| | | | ||
| | | [[22/19]] | ||
| 321.150 | |||
| | | | ||
|- | |- | ||
| | | | ||
| [[11/6]] | |||
| 321.338 | | 321.338 | ||
| | | | ||
|- | |- | ||
| 15 | | | ||
| [[22/15]] | |||
| 321.356 | | 321.356 | ||
| | | | ||
|- | |- | ||
| 5 | | | ||
| [[8/5]] | |||
| 321.369 | | 321.369 | ||
| 5-odd-limit minimax | | 5-odd-limit minimax, 1/10-shibboleth comma | ||
|- | |||
| [[56edo|15\56]] | |||
| | |||
| 321.429 | |||
| | |||
|- | |||
| | |||
| [[32/21]] | |||
| 321.537 | |||
| | |||
|- | |||
| | |||
| [[32/19]] | |||
| 321.606 | |||
| | |||
|- | |- | ||
| 16/15 | | [[97edo|26\97]] | ||
| | |||
| 321.649 | |||
| | |||
|- | |||
| | |||
| [[21/19]] | |||
| 321.658 | |||
| | |||
|- | |||
| | |||
| [[16/15]] | |||
| 321.670 | | 321.670 | ||
| 2/19-shibboleth comma | |||
|- | |||
| | | | ||
| | | [[11/9]] | ||
| 321.713 | | 321.713 | ||
| | | | ||
|- | |- | ||
| 7/5 | | | ||
| [[7/5]] | |||
| 321.732 | | 321.732 | ||
| 7 and 11-odd-limit minimax | | 7- and 11- through (L11.19) 21-odd-limit minimax | ||
|- | |- | ||
| 15 | | [[138edo|37\138]] | ||
| | |||
| 321.739 | |||
| 138e val | |||
|- | |||
| | |||
| [[28/19]] | |||
| 321.842 | |||
| | |||
|- | |||
| | |||
| [[28/15]] | |||
| 321.844 | | 321.844 | ||
| | | | ||
|- | |- | ||
| 4/3 | | | ||
| [[19/15]] | |||
| 321.849 | |||
| | |||
|- | |||
| '''[[41edo|11\41]]''' | |||
| | |||
| '''321.951''' | |||
| '''Upper bound of (L11.19) 15- through 21-odd-limit diamond monotone''' | |||
|- | |||
| | |||
| [[4/3]] | |||
| 322.005 | | 322.005 | ||
| 9 | | 9-odd-limit minimax, 1/9-shibboleth comma | ||
|- | |- | ||
| 9 | | | ||
| [[14/9]] | |||
| 322.139 | | 322.139 | ||
| | | | ||
|- | |- | ||
| | | | ||
| 322. | | [[20/19]] | ||
| | | 322.200 | ||
| | |||
|- | |- | ||
| 7/6 | | | ||
| [[7/6]] | |||
| 322.239 | | 322.239 | ||
| | | | ||
|- | |- | ||
| | | [[67edo|18\67]] | ||
| | |||
| | | | ||
| 322.388 | |||
| 67ch val | |||
|- | |- | ||
| | | | ||
| [[10/9]] | |||
| 322.800 | |||
| 1/8-shibboleth comma | |||
|- | |- | ||
| | | | ||
| [[7/4]] | |||
| 322.942 | |||
| 1/3-keema | |||
|- | |- | ||
| | | '''[[26edo|7\26]]''' | ||
| | | | ||
| '''323.077''' | |||
| '''Upper bound of 7-, 9-, and 11-odd-limit diamond monotone''' | |||
|- | |- | ||
| | | | ||
| 323. | | [[19/18]] | ||
| 323.401 | |||
| | | | ||
|- | |- | ||
| 14/11 | | | ||
| [[14/11]] | |||
| 323.502 | | 323.502 | ||
| | | | ||
|- | |- | ||
| | | | ||
| | | [[16/11]] | ||
| 324.341 | | 324.341 | ||
| | | | ||
|} | |} | ||
<nowiki>*</nowiki> besides the octave | |||
[[Category: | [[Category:Superkleismic| ]] <!-- main article --> | ||
[[Category: | [[Category:Rank-2 temperaments]] | ||
[[Category:Gamelismic clan]] | [[Category:Gamelismic clan]] | ||
[[Category:Keemic temperaments]] | [[Category:Keemic temperaments]] | ||
[[Category:Octagar temperaments]] | |||
Latest revision as of 19:43, 2 March 2026
| Superkleismic |
100/99, 245/242, 385/384 (11-limit);
100/99, 133/132, 190/189, 385/384 (L11.19)
2.3.5.7.11.19 21-odd-limit: 8.85 ¢
2.3.5.7.11.19 21-odd-limit: 26 notes
Superkleismic is a regular temperament defined in the 7-limit such that three 6/5 generators reach 7/4 (tempering out 875/864 (S5/S6), the keema) and such that three 8/7 intervals reach 3/2 (tempering out 1029/1024 (S7/S8), the gamelisma), making it a member of the gamelismic clan and a keemic temperament; its 5-limit comma is 1953125/1889568, the shibboleth comma. It extends extremely easily to the 11-limit as well, by tempering out 100/99 (S10) so that two generators reach 16/11, which also serves to extend the structure of orgone in the 2.7.11 subgroup. This implies 385/384 and 441/440 are tempered out as well, making it a subtemperament of portent. Furthermore, since in superkleismic, the interval 21/20 stands for half 10/9 = (19/18)⋅(20/19), we can identify 21/20, 20/19, and 19/18 together to add prime 19, tempering out 361/360 (S19) and 400/399 (S20). Superkleismic can also be defined in the 13-limit, where two generators are identified with 13/9 alongside 16/11, tempering out 144/143 and 325/324, and extended to 17 to reach the full 19-limit, based on the equivalence (8/7)2 ~ 17/13 (natural in slendric) and tempering out 273/272 and 833/832, in addition to 120/119 and 170/169.
The minor-third generator of superkleismic is ~6.3 cents sharp of pure 6/5, even wider than the kleismic minor third (~317 cents), and from this it derives its name. The two mappings unite at 15edo. While not as simple or accurate as kleismic in the 5-limit, it comes into its own as a 7- and 11-limit temperament, approximating both simply and accurately in good tunings. Discarding the harmonics 3 and 5 and concentrating purely on that subgroup gets you orgone. 41edo is a good tuning for superkleismic, with a minor-third generator of 11\41, and mosses of 11 (4L 7s), 15 (11L 4s), or 26 notes (15L 11s) are available.
See Gamelismic clan #Superkleismic for more technical data.
Interval chain
In the following table, odd harmonics and subharmonics 1–21 are bolded.
| # | Cents* | Approximate ratios | |
|---|---|---|---|
| 11-limit add-19 | Full 19-limit extension | ||
| 0 | 0.0 | 1/1 | |
| 1 | 321.8 | 6/5 | |
| 2 | 643.6 | 16/11, 36/25 | 13/9, 19/13 |
| 3 | 965.4 | 7/4, 33/19 | 26/15, 30/17 |
| 4 | 87.3 | 20/19, 19/18, 21/20, 22/21 | 18/17 |
| 5 | 409.1 | 14/11, 19/15, 24/19 | 34/27 |
| 6 | 730.9 | 32/21, 38/25 | 20/13, 26/17 |
| 7 | 1052.7 | 11/6 | 24/13 |
| 8 | 174.5 | 10/9, 11/10, 21/19 | 19/17 |
| 9 | 496.3 | 4/3, 33/25 | |
| 10 | 818.2 | 8/5 | |
| 11 | 1140.0 | 35/18, 48/25, 64/33 | 52/27 |
| 12 | 261.8 | 7/6, 22/19 | 20/17 |
| 13 | 583.6 | 7/5 | 24/17 |
| 14 | 905.4 | 32/19, 42/25, 56/33 | 22/13 |
| 15 | 27.2 | 49/48, 55/54, 56/55, 64/63 | 40/39 |
| 16 | 349.1 | 11/9 | 16/13 |
| 17 | 670.9 | 22/15, 28/19, 40/27 | |
| 18 | 992.7 | 16/9, 44/25 | |
| 19 | 114.5 | 16/15 | 14/13 |
| 20 | 436.3 | 32/25 | 22/17 |
| 21 | 768.1 | 14/9 | 80/51 |
| 22 | 1080.0 | 28/15 | 32/17 |
| 23 | 201.8 | 28/25 | 44/39 |
| 24 | 523.6 | 49/36 | |
| 25 | 845.4 | 44/27 | 28/17, 64/39 |
| 26 | 1167.2 | 49/25, 88/45, 160/81 | 128/65 |
* In 11-limit add-19 CWE tuning, octave reduced
Tunings
Norm-based tunings
| Euclidean | |||
|---|---|---|---|
| Constrained | Constrained & skewed | Destretched | |
| Tenney | CTE: ~5/3 = 878.2017 ¢ | CWE: ~5/3 = 878.1077 ¢ | POTE: ~5/3 = 878.0699 ¢ |
| Euclidean | |||
|---|---|---|---|
| Constrained | Constrained & skewed | Destretched | |
| Tenney | CTE: ~5/3 = 878.1854 ¢ | CWE: ~5/3 = 878.1606 ¢ | POTE: ~5/3 = 878.1534 ¢ |
Tuning spectrum
| Edo generators |
Unchanged interval (eigenmonzo)* |
Generator (¢) | Comments |
|---|---|---|---|
| 6/5 | 315.641 | Untempered tuning | |
| 4\15 | 320.000 | Lower bound of 7- through (L11.19) 21-odd-limit diamond monotone | |
| 22/21 | 320.134 | ||
| 11/10 | 320.626 | ||
| 24/19 | 320.888 | ||
| 21/20 | 321.117 | 1/4-keema | |
| 19\71 | 321.127 | ||
| 22/19 | 321.150 | ||
| 11/6 | 321.338 | ||
| 22/15 | 321.356 | ||
| 8/5 | 321.369 | 5-odd-limit minimax, 1/10-shibboleth comma | |
| 15\56 | 321.429 | ||
| 32/21 | 321.537 | ||
| 32/19 | 321.606 | ||
| 26\97 | 321.649 | ||
| 21/19 | 321.658 | ||
| 16/15 | 321.670 | 2/19-shibboleth comma | |
| 11/9 | 321.713 | ||
| 7/5 | 321.732 | 7- and 11- through (L11.19) 21-odd-limit minimax | |
| 37\138 | 321.739 | 138e val | |
| 28/19 | 321.842 | ||
| 28/15 | 321.844 | ||
| 19/15 | 321.849 | ||
| 11\41 | 321.951 | Upper bound of (L11.19) 15- through 21-odd-limit diamond monotone | |
| 4/3 | 322.005 | 9-odd-limit minimax, 1/9-shibboleth comma | |
| 14/9 | 322.139 | ||
| 20/19 | 322.200 | ||
| 7/6 | 322.239 | ||
| 18\67 | 322.388 | 67ch val | |
| 10/9 | 322.800 | 1/8-shibboleth comma | |
| 7/4 | 322.942 | 1/3-keema | |
| 7\26 | 323.077 | Upper bound of 7-, 9-, and 11-odd-limit diamond monotone | |
| 19/18 | 323.401 | ||
| 14/11 | 323.502 | ||
| 16/11 | 324.341 |
* besides the octave