Pajara
Pajara (pronounced /pəˈd͡ʒɑːrə/, with the J as in "jar") is a temperament with a half-octave period that represents both 7/5 and 10/7, so 50/49 is tempered out and it is in the jubilismic clan. The generator is a perfect fifth in the neighborhood of 707–711 cents, or that minus a half-octave period, which is a semitone representing 15/14 and 16/15. One period minus 2 such semitones is ~5/4, which, if you work it out, implies that 2048/2025 is tempered out, so pajara is also in the diaschismic family. In fact, it shares the same structure as 5-limit diaschismic. Finally, two 4/3's (or an octave minus two semitones) represents 7/4 as well as 16/9, so 64/63 is tempered out and pajara is in the archytas clan. Tempering out any two of these commas (among others) produces the unique temperament pajara.
Pajara has fairly low accuracy overall, due to 5/4 and 7/4 necessarily being separated by 600 cents. This means that 49/48 and 25/24 are tempered to the same interval.
Pajara has mos scales of 10, 12, and 22 notes. The 10-note mos, Pajara[10] is notable for sharing a number of desirable properties with diatonic, while having fundamentally different categories; a diatonic semifourth (~250 cents) is now a neutral 2-step, for example. This mos and the LsssLsssss modmos are called the symmetric and pentachordal decatonic scales and were independently invented/discovered by Paul Erlich and Gene Ward Smith. They are often thought of as subsets of 22edo, without much loss of generality and accuracy.
See Diaschismic family #Pajara for technical data. See Pajara extensions for a discussion on the 11-limit extensions.
Interval chains
There are two different mappings of the 11-limit. One is just called "pajara" and is slightly more complex but suffers almost no loss of accuracy compared to the 7-limit. The other, called "pajarous" to avoid confusion, loses some accuracy and there's little reason to use it unless you're using 22edo, which is the intersection of both systems.
| Generator | −11 | −10 | −9 | −8 | −7 | −6 |
|---|---|---|---|---|---|---|
| Cents* | 24.26 | 131.15 | 238.03 | 344.92 | 451.80 | 558.69 |
| Ratios | 11/9 | 11/8 | ||||
| Generator | −5 | −4 | −3 | −2 | −1 | 0 |
| Cents* | 65.57 | 172.46 | 279.34 | 386.23 | 493.11 | 600.00 |
| Ratios | 11/10, 10/9 | 7/6 | 5/4 | 4/3 | 7/5, 10/7 | |
| Generator | 0 | 1 | 2 | 3 | 4 | 5 |
| Cents* | 0.00 | 106.89 | 213.77 | 320.66 | 427.54 | 534.43 |
| Ratios | 1/1 | 16/15, 15/14 | 9/8, 8/7 | 6/5 | 14/11, 9/7 | 15/11 |
| Generator | 6 | 7 | 8 | 9 | 10 | 11 |
| Cents* | 41.31 | 148.20 | 255.08 | 361.97 | 468.85 | 575.74 |
| Ratios | 12/11 |
* In 11-limit POTE tuning
| Generator | −10 | −9 | −8 | −7 | −6 | |
|---|---|---|---|---|---|---|
| Cents* | 104.22 | 213.80 | 323.38 | 432.96 | 542.53 | |
| Ratios | 14/11 | 15/11 | ||||
| Generator | −5 | −4 | −3 | −2 | −1 | 0 |
| Cents* | 52.11 | 161.69 | 271.27 | 380.84 | 490.42 | 600.00 |
| Ratios | 12/11, 10/9 | 7/6 | 5/4 | 4/3 | 7/5, 10/7 | |
| Generator | 0 | 1 | 2 | 3 | 4 | 5 |
| Cents* | 0.00 | 109.58 | 219.16 | 328.73 | 438.31 | 547.89 |
| Ratios | 1/1 | 16/15, 15/14 | 9/8, 8/7 | 6/5, 11/9 | 9/7 | 11/8 |
| Generator | 6 | 7 | 8 | 9 | 10 | |
| Cents* | 57.47 | 167.04 | 276.62 | 386.20 | 495.78 | |
| Ratios | 11/10 |
* In 11-limit POTE tuning=
Scales
10-note (proper)
The true mos is called the symmetric decatonic scale, because it repeats exactly at the half-octave, so the symmetric scale starting from 7/5~10/7 is the same as the symmetric scale starting from 1/1. The near-mos, LsssLsssss, in which only the 5-step interval violates the rule of no more than 2 intervals per class, is called the pentachordal decatonic, because it consists of two identical pentachords plus a split 9/8~8/7 whole tone to complete the octave.
12-note (proper)
Tuning spectrum
| Edo generator |
Eigenmonzo (unchanged-interval) |
Generator (¢) | Comments |
|---|---|---|---|
| 7\12 | 700.000 | ||
| 4/3 | 701.955 | ||
| 41\70 | 702.857 | ||
| 34\58 | 703.448 | ||
| 61\104 | 703.846 | ||
| 27\46 | 704.348 | ||
| 14/11 | 704.377 | ||
| 10/9 | 704.399 | ||
| 74\126 | 704.762 | ||
| 47\80 | 705.000 | ||
| 114\194 | 705.155 | ||
| 6/5 | 705.214 | 5 and 15-odd-limit minimax | |
| 67\114 | 705.263 | ||
| 87\148 | 705.405 | ||
| 20\34 | 705.882 | ||
| 93\158 | 706.329 | ||
| 73\124 | 706.452 | ||
| 126\214 | 706.542 | ||
| 11/9 | 706.574 | ||
| 53\90 | 706.667 | ||
| 139\236 | 706.780 | ||
| 5/4 | 706.843 | 7 and 11-limit POTT | |
| 86\146 | 706.849 | ||
| 119\202 | 706.931 | ||
| 33\56 | 707.143 | ||
| 12/11 | 707.234 | ||
| 112\190 | 707.368 | ||
| 15/11 | 707.390 | ||
| 79\134 | 707.463 | ||
| 125\212 | 707.547 | ||
| 46\78 | 707.692 | ||
| 105\178 | 707.865 | ||
| 59\100 | 708.000 | ||
| 11/8 | 708.114 | ||
| 72\122 | 708.196 | ||
| 11/10 | 708.749 | 11-odd-limit minimax | |
| 9/7 | 708.771 | ||
| 13\22 | 709.091 | ||
| 58\98 | 710.204 | ||
| 45\76 | 710.526 | ||
| 122\206 | 710.680 | ||
| 77\130 | 710.769 | ||
| 109\184 | 710.870 | ||
| 7/6 | 711.043 | 7-odd-limit minimax | |
| 32\54 | 711.111 | ||
| 13/11 | 711.151 | 13-odd-limit minimax | |
| 83\140 | 711.429 | ||
| 51\86 | 711.628 | ||
| 16/15 | 711.731 | ||
| 70\118 | 711.864 | ||
| 19\32 | 712.500 | ||
| 44\74 | 713.5135 | ||
| 13/10 | 713.553 | ||
| 25\42 | 714.286 | ||
| 31\52 | 715.385 | ||
| 8/7 | 715.587 | ||
| 6\10 | 720.000 |
Music
- Chord Sequence in Paul Erlich's Decatonic Major (2014) – in Pajara[10], 22edo tuning
References
- Erlich, Paul. "Tuning, Tonality and 22-Tone Temperament." Xenharmonicon 17, 1998. http://sethares.engr.wisc.edu/paperspdf/Erlich-22.pdf