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The 13-prime-limit | {{Prime limit navigation|13}} | ||
The '''13-limit''' or 13-prime-limit consists of [[just intonation]] [[interval]]s such that the highest [[prime factor]] in all [[ratio]]s is 13. Thus, [[40/39]] would be within the 13-limit, since 40 is {{nowrap|2 × 2 × 2 × 5}} and 39 is {{nowrap|3 × 13}}, but [[34/33]] would not, since 34 is {{nowrap|2 × 17}}, and [[17-limit|17]] is a prime number higher than 13. The 13-limit is the 6th [[prime limit]] and is a superset of the [[11-limit]] and a subset of the [[17-limit]]. | |||
The 13- | The 13-limit is a [[rank and codimension|rank-6]] system, and can be modeled in a 5-dimensional [[lattice]], with the primes 3, 5, 7, 11, and 13 represented by each dimension. The prime 2 does not appear in the typical 13-limit lattice because [[octave equivalence]] is presumed. If octave equivalence is not presumed, a sixth dimension is needed. | ||
[[ | These things are contained by the 13-limit, but not the 11-limit: | ||
* The [[13-odd-limit|13-]] and [[15-odd-limit]]; | |||
* Mode 7 and 8 of the harmonic or subharmonic series. | |||
== Edo approximation == | |||
[[Edo]]s which represent 13-limit intervals better ([[monotonicity limit]] ≥ 13 and decreasing [[TE error]]): {{EDOs| 15, 17c, 19, 26, 27e, 29, 31, 41, 46, 53, 58, 72, 87, 103, 111, 121, 130, 183, 190, 198, 224, 270, 494 }} and so on. For a more comprehensive list, see [[Sequence of equal temperaments by error]]. | |||
Here is a list of edos which tunes the 13-limit well relative to their size ({{nowrap|[[TE relative error]] < 5.5%}}): {{EDOs| 31, 41, 46, 53, 58, 72, 87, 94, 103, 111, 121, 130, 140, 152f, 159, 183, 190, 198, 212, 217, 224, 270, 282, 296, 301, 311, 320, 328, 342f, 354, 364, 369f, 373, 383, 400, 414, 422, 431, 441, 460, 472, 494 }}, and so on. | |||
'''Note''': [[Wart notation]] is used to specify the [[val]] chosen for the edo. In the above list, "27e" means taking the second closest approximation of harmonic 11. | |||
== Intervals == | == Intervals == | ||
Here are all the 15-odd-limit intervals of 13: | Here are all the 15-odd-limit intervals of 13: | ||
{| class="wikitable" | {| class="wikitable" | ||
|- | |- | ||
|14/13 | ! Ratio | ||
|128.298 | ! Cents value | ||
|3uz2 | ! colspan="2" | [[Color name]] | ||
|thuzo 2nd | ! Name | ||
|tridecimal | |- | ||
| 14/13 | |||
| 128.298 | |||
| 3uz2 | |||
| thuzo 2nd | |||
| tridecimal supraminor second | |||
|- | |- | ||
|13/12 | | 13/12 | ||
|138.573 | | 138.573 | ||
|3o2 | | 3o2 | ||
|tho 2nd | | tho 2nd | ||
|tridecimal subneutral second | | tridecimal subneutral second | ||
|- | |- | ||
|15/13 | | 15/13 | ||
|247.741 | | 247.741 | ||
|3uy2 | | 3uy2 | ||
|thuyo 2nd | | thuyo 2nd | ||
|tridecimal | | tridecimal semifourth | ||
|- | |- | ||
|13/11 | | 13/11 | ||
|289.210 | | 289.210 | ||
|3o1u3 | | 3o1u3 | ||
|tholu 3rd | | tholu 3rd | ||
|tridecimal minor third | | tridecimal minor third | ||
|- | |- | ||
|16/13 | | 16/13 | ||
|359.472 | | 359.472 | ||
|3u3 | | 3u3 | ||
|thu 3rd | | thu 3rd | ||
|tridecimal supraneutral third | | tridecimal supraneutral third | ||
|- | |- | ||
|13/10 | | 13/10 | ||
|454.214 | | 454.214 | ||
|3og4 | | 3og4 | ||
|thogu 4th | | thogu 4th | ||
|tridecimal | | tridecimal naiadic | ||
|- | |- | ||
|18/13 | | 18/13 | ||
|563.382 | | 563.382 | ||
|3u4 | | 3u4 | ||
|thu 4th | | thu 4th | ||
|tridecimal sub-tritone | | tridecimal sub-tritone | ||
|- | |- | ||
|13/9 | | 13/9 | ||
|636.618 | | 636.618 | ||
|3o5 | | 3o5 | ||
|tho 5th | | tho 5th | ||
|tridecimal super-tritone | | tridecimal super-tritone | ||
|- | |- | ||
|20/13 | | 20/13 | ||
|745.786 | | 745.786 | ||
|3uy5 | | 3uy5 | ||
|thuyo 5th | | thuyo 5th | ||
|tridecimal | | tridecimal cocytic | ||
|- | |- | ||
|13/8 | | 13/8 | ||
|840.528 | | 840.528 | ||
|3o6 | | 3o6 | ||
|tho 6th | | tho 6th | ||
|tridecimal subneutral sixth | | tridecimal subneutral sixth | ||
|- | |- | ||
|22/13 | | 22/13 | ||
|910.790 | | 910.790 | ||
|3u1o6 | | 3u1o6 | ||
|thulo 6th | | thulo 6th | ||
|tridecimal major sixth | | tridecimal major sixth | ||
|- | |- | ||
|26/15 | | 26/15 | ||
|952.259 | | 952.259 | ||
|3og7 | | 3og7 | ||
|thogu 7th | | thogu 7th | ||
|tridecimal | | tridecimal semitwelfth | ||
|- | |- | ||
|24/13 | | 24/13 | ||
|1061.427 | | 1061.427 | ||
|3u7 | | 3u7 | ||
|thu 7th | | thu 7th | ||
|tridecimal supraneutral seventh | | tridecimal supraneutral seventh | ||
|- | |- | ||
|13/7 | | 13/7 | ||
|1071.702 | | 1071.702 | ||
|3or7 | | 3or7 | ||
|thoru 7th | | thoru 7th | ||
|tridecimal submajor seventh | | tridecimal submajor seventh | ||
|} | |} | ||
=Music= | == Music == | ||
[http://sonic-arts.org/hill/10-passages-ji/10-passages-ji.htm Venusian Cataclysms] [http://sonic-arts.org/hill/10-passages-ji/02_hill_venusian-cataclysms.mp3 play] by [[ | |||
; [[E8 Heterotic]] | |||
* [https://www.youtube.com/watch?v=cUR3MsI-mWM ''Justification''] (2022) | |||
; [[Francium]] | |||
* [https://www.youtube.com/watch?v=ratGb2qTStQ ''Bicycle Wheels''] (2023) | |||
; [[Dave Hill]] | |||
* [http://sonic-arts.org/hill/10-passages-ji/10-passages-ji.htm ''Venusian Cataclysms'']{{dead link}} [http://sonic-arts.org/hill/10-passages-ji/02_hill_venusian-cataclysms.mp3 play]{{dead link}} | |||
* [http://sonic-arts.org/hill/10-passages-ji/10-passages-ji.htm ''Chord Progression on the Harmonic Overtone Series'']{{dead link}} [http://sonic-arts.org/hill/10-passages-ji/06_hill_chord-progression-on-harmonic-series.mp3 play]{{dead link}} | |||
; [https://youtube.com/@hojominori?si=gqJP3hzvup2YL0sz Hojo Minori] | |||
* [https://www.youtube.com/watch?v=xSIS2lobkTk ''P`rismatic fut`URE''] (2025) | |||
; [[Ben Johnston]] | |||
* ''String Quartet No. 5'' (1979) – [https://newworldrecords.bandcamp.com/track/string-quartet-no-5 Bandcamp] | [https://www.youtube.com/watch?v=jOpQwiEB4g0 YouTube] – performed by Kepler Quartet | |||
* ''String Quartet No. 7'' (1984) | |||
** "Movt. 1" – [https://newworldrecords.bandcamp.com/track/string-quartet-no-7-scurrying-forceful-intense Bandcamp] | [https://www.youtube.com/watch?v=-TdFgtAf5Cg YouTube] | |||
** "Movt. 2" – [https://newworldrecords.bandcamp.com/track/string-quartet-no-7-eerie Bandcamp] | [https://www.youtube.com/watch?v=Tq9cjvgnbAY YouTube] | |||
** "Movt. 3" – [https://newworldrecords.bandcamp.com/track/string-quartet-no-7-with-solemnity Bandcamp] | [https://www.youtube.com/watch?v=jgFQAGyF0Gw YouTube] | |||
:: performed by Kepler Quartet | |||
; [[Kaiveran Lugheidh]] | |||
* [https://soundcloud.com/vale-10/unlicensed-copy ''Unlicensed Copy''] (2017) – mostly 7-limit with some erstwhile 13-based chromaticisms | |||
; [[Claudi Meneghin]] | |||
* [http://web.archive.org/web/20160412025512/http://soonlabel.com/xenharmonic/archives/2089 ''Canon on a ground''] – in 2.11.13 subgroup | |||
; [[Gene Ward Smith]] | |||
* [https://archive.org/details/ThrenodyForTheVictimsOfWolfgangAmadeusMozart ''Threnody for the Victims of Wolfgang Amadeus Mozart''] (archived 2010) – 13-limit JI in [[6079edo]] tuning | |||
* [https://archive.org/details/RoughDiamond ''Rough Diamond''] (archived 2010) a.k.a. ''Diamond in the Rough''<ref>[http://lumma.org/tuning/gws/gene.html xenharmony.org mirror | ''Gene's Music'']</ref> – symphonic con brio using the Partch 13-odd-limit tonality diamond as a scale. | |||
; [[User:Tristanbay|Tristan Bay]] | |||
* [https://youtu.be/ouUV2Uwr2qI ''Junp''] – in [[User:Tristanbay/Margo Scale|a 2.3.11/7.13/7 subgroup JI scale]] | |||
; [[Randy Wells]] | |||
* [https://www.youtube.com/watch?v=wbZXArV5ffw ''Dying Visions of a Lonesome Machine''] (2021) | |||
* [https://www.youtube.com/watch?v=bA6wr07PiYE ''Avenoir''] (2022) | |||
* [https://www.youtube.com/watch?v=rBS2gGTostA ''I Was a Teenage Boltzmann Brain''] (2022) | |||
* [https://www.youtube.com/watch?v=NwsMMnOTcQ4 ''Atlas Apassionata''] (2022) | |||
== See also == | |||
* [[Gallery of just intervals]] | |||
* [[Tridecimal neutral seventh chord]] | |||
* [[Augmented chords in just intonation, some]] (they are 13-limit) | |||
== Notes == | |||
[[Category:13-limit| ]] <!-- main article --> | |||
[[Category:Lists of intervals]] | |||
[[Category:13-limit]] | [[Category:Listen]] | ||
[[Category: | [[Category:Rank 6]] | ||
[[Category: | |||
[[Category: | |||
Latest revision as of 16:28, 20 August 2025
The 13-limit or 13-prime-limit consists of just intonation intervals such that the highest prime factor in all ratios is 13. Thus, 40/39 would be within the 13-limit, since 40 is 2 × 2 × 2 × 5 and 39 is 3 × 13, but 34/33 would not, since 34 is 2 × 17, and 17 is a prime number higher than 13. The 13-limit is the 6th prime limit and is a superset of the 11-limit and a subset of the 17-limit.
The 13-limit is a rank-6 system, and can be modeled in a 5-dimensional lattice, with the primes 3, 5, 7, 11, and 13 represented by each dimension. The prime 2 does not appear in the typical 13-limit lattice because octave equivalence is presumed. If octave equivalence is not presumed, a sixth dimension is needed.
These things are contained by the 13-limit, but not the 11-limit:
- The 13- and 15-odd-limit;
- Mode 7 and 8 of the harmonic or subharmonic series.
Edo approximation
Edos which represent 13-limit intervals better (monotonicity limit ≥ 13 and decreasing TE error): 15, 17c, 19, 26, 27e, 29, 31, 41, 46, 53, 58, 72, 87, 103, 111, 121, 130, 183, 190, 198, 224, 270, 494 and so on. For a more comprehensive list, see Sequence of equal temperaments by error.
Here is a list of edos which tunes the 13-limit well relative to their size (TE relative error < 5.5%): 31, 41, 46, 53, 58, 72, 87, 94, 103, 111, 121, 130, 140, 152f, 159, 183, 190, 198, 212, 217, 224, 270, 282, 296, 301, 311, 320, 328, 342f, 354, 364, 369f, 373, 383, 400, 414, 422, 431, 441, 460, 472, 494, and so on.
Note: Wart notation is used to specify the val chosen for the edo. In the above list, "27e" means taking the second closest approximation of harmonic 11.
Intervals
Here are all the 15-odd-limit intervals of 13:
| Ratio | Cents value | Color name | Name | |
|---|---|---|---|---|
| 14/13 | 128.298 | 3uz2 | thuzo 2nd | tridecimal supraminor second |
| 13/12 | 138.573 | 3o2 | tho 2nd | tridecimal subneutral second |
| 15/13 | 247.741 | 3uy2 | thuyo 2nd | tridecimal semifourth |
| 13/11 | 289.210 | 3o1u3 | tholu 3rd | tridecimal minor third |
| 16/13 | 359.472 | 3u3 | thu 3rd | tridecimal supraneutral third |
| 13/10 | 454.214 | 3og4 | thogu 4th | tridecimal naiadic |
| 18/13 | 563.382 | 3u4 | thu 4th | tridecimal sub-tritone |
| 13/9 | 636.618 | 3o5 | tho 5th | tridecimal super-tritone |
| 20/13 | 745.786 | 3uy5 | thuyo 5th | tridecimal cocytic |
| 13/8 | 840.528 | 3o6 | tho 6th | tridecimal subneutral sixth |
| 22/13 | 910.790 | 3u1o6 | thulo 6th | tridecimal major sixth |
| 26/15 | 952.259 | 3og7 | thogu 7th | tridecimal semitwelfth |
| 24/13 | 1061.427 | 3u7 | thu 7th | tridecimal supraneutral seventh |
| 13/7 | 1071.702 | 3or7 | thoru 7th | tridecimal submajor seventh |
Music
- Justification (2022)
- Bicycle Wheels (2023)
- Venusian Cataclysms[dead link] play[dead link]
- Chord Progression on the Harmonic Overtone Series[dead link] play[dead link]
- P`rismatic fut`URE (2025)
- String Quartet No. 5 (1979) – Bandcamp | YouTube – performed by Kepler Quartet
- String Quartet No. 7 (1984)
- performed by Kepler Quartet
- Unlicensed Copy (2017) – mostly 7-limit with some erstwhile 13-based chromaticisms
- Canon on a ground – in 2.11.13 subgroup
- Threnody for the Victims of Wolfgang Amadeus Mozart (archived 2010) – 13-limit JI in 6079edo tuning
- Rough Diamond (archived 2010) a.k.a. Diamond in the Rough[1] – symphonic con brio using the Partch 13-odd-limit tonality diamond as a scale.
- Dying Visions of a Lonesome Machine (2021)
- Avenoir (2022)
- I Was a Teenage Boltzmann Brain (2022)
- Atlas Apassionata (2022)
See also
- Gallery of just intervals
- Tridecimal neutral seventh chord
- Augmented chords in just intonation, some (they are 13-limit)