13-limit scales
240 scales
| File | Description | Notes | Period (ยข) | Limit | Source |
|---|---|---|---|---|---|
| 004_H1 | Hyperenharmonic tetrachord 100/99 * 66/65 * 13/10, Wilson | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 013_H4 | Hyperenharmonic tetrachord 66/65 * 65/64 * 128/99 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 031_H8 | Hyperenharmonic tetrachord 40/39 * 91/90 * 9/7 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 037_H9 | Hyperenharmonic tetrachord 81/80 * 40/39 * 104/81 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 040_H10 | Hyperenharmonic tetrachord 78/77 * 77/75 * 50/39 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 057_E4 | Enharmonic tetrachord 66/65 * 65/63 * 14/11 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 061_E4 | Enharmonic tetrachord 14/11 * 143/140 * 40/39 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 069_E6 | Enharmonic tetrachord 26/25 * 100/99 * 33/26 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 070_E6 | Enharmonic tetrachord 78/77 * 28/27 * 33/26 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 078_E8 | Enharmonic tetrachord 40/39 * 416/405 * 81/64 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 108_E13 | Enharmonic tetrachord 40/39 * 26/25 * 5/4, Avicenna | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 127_E15 | Enharmonic tetrachord 40/39 * 117/112 * 56/45 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 128_E15 | Enharmonic tetrachord 26/25 * 375/364 * 56/45 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 135_C2 | Chromatic tetrachord 28/27 * 27/26 * 26/21, Schlesinger | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 136_C2 | Chromatic tetrachord 21/20 * 40/39 * 26/21 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 147_C4 | Chromatic tetrachord 27/26 * 26/25 * 100/81 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 153_C4 | Chromatic tetrachord 40/39 * 1053/1000 * 100/81 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 161_C6 | Chromatic tetrachord 26/25 * 25/24 * 16/13 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 164_C6 | Chromatic tetrachord 65/64 * 16/15 * 16/13 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 166_C6 | Chromatic tetrachord 40/39 * 169/160 * 16/13 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 167_C6 | Chromatic tetrachord 28/27 * 117/112 * 16/13 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 168_C6 | Chromatic tetrachord 169/168 * 14/13 * 16/13 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 169_C6 | Chromatic tetrachord 22/21 * 91/88 * 16/13 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 170_C7 | Chromatic tetrachord 176/169 * 169/162 * 27/22 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 175_C7 | Chromatic tetrachord 40/39 * 143/135 * 27/22 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 181_C8 | Chromatic tetrachord 78/77 * 14/13 * 11/9 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 185_C8 | Chromatic tetrachord 40/39 * 117/110 * 11/9 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 186_C9 | Chromatic tetrachord 256/245 * 245/234 * 39/32 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 189_C9 | Chromatic tetrachord 64/63 * 14/13 * 39/32 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 207_C12 | Chromatic tetrachord 66/65 * 13/12 * 40/33 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 216_C14 | Chromatic tetrachord 40/39 * 13/12 * 6/5, Barbour | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 218_C14 | Chromatic tetrachord 65/63 * 14/13 * 6/5 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 233_C15 | Chromatic tetrachord 14/13 * 26/25 * 25/21 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 236_C15 | Chromatic tetrachord 40/39 * 273/250 * 25/21 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 247_C17 | Chromatic tetrachord 27/26 * 13/12 * 32/27, Barbour? | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 262_C17 | Chromatic tetrachord 40/39 * 351/320 * 32/27 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 263_C17 | Chromatic tetrachord 14/13 * 117/112 * 32/27 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 273_C19 | Chromatic tetrachord 14/13 * 22/21 * 13/11 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 274_C19 | Chromatic tetrachord 40/39 * 11/10 * 13/11 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 275_C19 | Chromatic tetrachord 66/65 * 10/9 * 13/11, Wilson | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 276_C19 | Chromatic tetrachord 27/26 * 88/81 * 13/11 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 277_C19 | Chromatic tetrachord 28/27 * 99/91 * 13/11 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 315_C24 | Chromatic tetrachord 40/39 * 39/35 * 7/6 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 318_C24 | Chromatic tetrachord 14/13 * 7/6 * 52/49 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 327_C24 | Chromatic tetrachord 26/25 * 7/6 * 100/91 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 346_C29 | Chromatic tetrachord 15/14 * 14/13 * 52/45 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 350_C29 | Chromatic tetrachord 40/39 * 9/8 * 52/45 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 352_C29 | Chromatic tetrachord 45/44 * 44/39 * 52/45 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 353_C29 | Chromatic tetrachord 65/63 * 189/169 * 52/45 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 354_C29 | Chromatic tetrachord 55/52 * 12/11 * 52/45 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 357_C29 | Chromatic tetrachord 27/26 * 10/9 * 52/45 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 358_C29 | Chromatic tetrachord 11/10 * 150/143 * 52/45 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 362_D1 | Diatonic tetrachord 16/15 * 15/13 * 13/12, Schlesinger | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 363_D1 | Diatonic tetrachord 26/25 * 10/9 * 15/13 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 364_D1 | Diatonic tetrachord 256/243 * 351/320 * 15/13 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 366_D1 | Diatonic tetrachord 11/10 * 15/13 * 104/99 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 367_D1 | Diatonic tetrachord 12/11 * 15/13 * 143/135 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 369_D1 | Diatonic tetrachord 40/39 * 169/150 * 15/13 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 370_D1 | Diatonic tetrachord 28/27 * 39/35 * 15/13 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 371_D1 | Diatonic tetrachord 91/90 * 8/7 * 15/13 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 390_D6 | Diatonic tetrachord 14/13 * 13/12 * 8/7, Avicenna | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 401_D6 | Diatonic tetrachord 40/39 * 91/80 * 8/7 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 418_D8 | Diatonic tetrachord 26/25 * 44/39 * 25/22 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 443_D13 | Diatonic tetrachord 12/11 * 13/12 * 44/39, Young | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 444_D13 | Diatonic tetrachord 39/35 * 35/33 * 44/39 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 446_D13 | Diatonic tetrachord 44/39 * 9/8 * 104/99 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 453_D15 | Diatonic tetrachord 96/91 * 91/81 * 9/8 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 458_D15 | Diatonic tetrachord 13/12 * 9/8 * 128/117, Avicenna | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 459_D15 | Diatonic tetrachord 14/13 * 9/8 * 208/189, Avicenna | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 473_D16 | Diatonic tetrachord 11/10 * 13/12 * 160/143, Al-Farabi | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 476_D17 | Diatonic tetrachord 10/9 * 13/12 * 72/65, Avicenna | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 479_R3 | Reduplicated tetrachord 13/12 * 13/12 * 192/169, Avicenna | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 480_R4 | Reduplicated tetrachord 14/13 * 14/13 * 169/147, Avicenna | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 491_R15 | Reduplicated tetrachord 40/39 * 40/39 * 507/400 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 556_M64 | Miscellaneous tetrachord 10/9 * 117/100 * 40/39 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 558_M66 | Miscellaneous tetrachord 13/12 * 55/52 * 64/55 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 575_M83 | Miscellaneous tetrachord 40/39 * 143/125 * 25/22 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 581_M89 | Miscellaneous tetrachord 14/13 * 260/231 * 11/10 | 3 | 498.0 | 13 | Divisions of the Tetrachord |
| 08_o8 | Mode 8 of the harmonic series. | 8 | 1200.0 | 13 | Mailing lists |
| 12_o8x13 | Two harmonic series segments (cap 16) rooted a 3:2 apart. | 12 | 1200.0 | 13 | Mailing lists |
| 44_39-12 | 12-note chromatic tuning with 352:351, 364:363 (G=1/1, Eb-G#) | 12 | 1200.0 | 13 | Mailing lists |
| 44_39-12_C | 44_39-12.scl with C as 1/1 (Eb-G#) | 12 | 1200.0 | 13 | Mailing lists |
| 44_39-diat1 | Diatonic involving 352:351 and 364:363 | 7 | 1200.0 | 13 | Mailing lists |
| 7-9-11-13 | 7 9 11 13 | 13 | 1200.0 | 13 | Mailing lists |
| ForJustin001 | Scale for Justin, possibly applicable to Japanese modes | 7 | 1200.0 | 13 | Mailing lists |
| alternative12 | Superset of Buzurg al-Erin with 13/11, 39/22 | 12 | 1200.0 | 13 | Mailing lists |
| badings1 | Henk Badings, harmonic scale, Lydomixolydisch | 9 | 1586.3 | 13 | Mailing lists |
| badings2 | Henk Badings, subharmonic scale, Dorophrygisch | 9 | 1586.3 | 13 | Mailing lists |
| bicycle | 13-limit harmonic bicycle, George Secor, 1963 | 12 | 1200.0 | 13 | Mailing lists |
| buzurg1 | Variant of Buzurg (Qutb al Din al-Shirazi, Persian theorist, c. 1300) | 8 | 1200.0 | 13 | Mailing lists |
| buzurg_al-erin10 | Decatonic with septimal Buzurg, Rastlike modes (cf. Secor, blarney.txt) | 10 | 1200.0 | 13 | Mailing lists |
| caleb46 | 46 note 13-limit epimorphic scale | 46 | 1200.0 | 13 | Mailing lists |
| canton | A 2.3.11/7.13/7 subgroup scale | 12 | 1200.0 | 13 | Mailing lists |
| cons21 | Set of intervals with num + den <= 21 not exceeding 2/1 | 24 | 1200.0 | 13 | Mailing lists |
| fokkerblock | 2.7.13 Fokker block (Carl Lumma's definition) with UVs 343/338, 28672/28561 | 10 | 1200.0 | 13 | Mailing lists |
| freefokkerblock | 2.7.13 Fokker block (free-floating parallelogram definition) with UVs 343/338, 28672/28561 | 10 | 1200.0 | 13 | Mailing lists |
| gizmo14-ji_transversal | Possible JI transversal of gizmo14.scl or gizmo14-pote.scl | 14 | 1200.0 | 13 | Mailing lists |
| harcb12 | Scale of 16 harmonics from C and 16 subharmonics from B | 12 | 1200.0 | 13 | Mailing lists |
| john20110212 | john 2011 02 12 best | 20 | 1200.0 | 13 | Mailing lists |
| locomotive | A 2.9.11.13 subgroup scale | 12 | 1200.0 | 13 | Mailing lists |
| met24-ji1 | Possible JI interpretation of MET-24 | 24 | 1200.0 | 13 | Mailing lists |
| met24-ji3_A | JI interpretation of MET-24, 1/1 is A or 22/13 of C-C version | 24 | 1200.0 | 13 | Mailing lists |
| monzoblock37 | Symmetrical 13-limit Fokker block containing all of the primes as scale degrees | 37 | 1200.0 | 13 | Mailing lists |
| msdiat7 | Diatonic scale, symmetrical tetrachords based on 14:11 and 13:11 thirds | 7 | 1200.0 | 13 | Mailing lists |
| neutr_pent2 | Quasi-Neutral Pentatonic 2, 15/13 x 52/45 in each trichord, after Dudon | 5 | 1200.0 | 13 | Mailing lists |
| oz17 | 80-et commas 13-limit detempering of a chain of 16 fifths | 17 | 1200.0 | 13 | Mailing lists |
| parapyth12trans | A JI transversal of parapyth17.scl for use in calculations. If you temper out 352/351 and 364/363 it becomes parapyth17. | 12 | 1200.0 | 13 | Mailing lists |
| parapyth17trans | A JI transversal of parapyth17.scl for use in calculations. If you temper out 352/351 and 364/363 it becomes parapyth17. | 17 | 1200.0 | 13 | Mailing lists |
| pelog_mal | Malaysian Pelog, Pierre Genest: Diff?rentes gammes encore en usage | 5 | 1200.0 | 13 | Mailing lists |
| pentatonic-2_3_7_11_13 | Pentatonic, primes 2-3-7-11-13 | 5 | 1200.0 | 13 | Mailing lists |
| pentatonic-proper_5-prime | Strictly proper 2-3-7-11-13 pentatonic | 5 | 1200.0 | 13 | Mailing lists |
| precata19 | Cata[19] transversal | 19 | 1200.0 | 13 | Mailing lists |
| quasi_11-EDO | Emulation of 11-EDO | 11 | 1200.0 | 13 | Mailing lists |
| quasi_6-EDO | Emulation of 6-EDO | 6 | 1200.0 | 13 | Mailing lists |
| quasi_8-EDO | Emulation of 8-EDO | 8 | 1200.0 | 13 | Mailing lists |
| quasi_9-EDO | Emulation of 9-EDO | 9 | 1200.0 | 13 | Mailing lists |
| ragaldoj | Raga-like medieval European Dorian mode with 7/6 and 7/4, just version | 7 | 1200.0 | 13 | Mailing lists |
| rational_canasta | Rational version of Canasta MIRACLE-31 scale by Joe Monzo | 31 | 1200.0 | 13 | Mailing lists |
| rational_canasta_tuning_22793_23190 | Rational version of Canasta MIRACLE-31 scale by Joe Monzo | 31 | 1200.0 | 13 | Mailing lists |
| rodpoole | Rod Poole's 13-limit scale | 17 | 1200.0 | 13 | Mailing lists |
| s-n-buzurg | Decaphonic system inspired by medieval Persian mode Buzurg (Safi al-Din) | 12 | 1200.0 | 13 | Mailing lists |
| sk13 | 13-limit JI scale with 14 complete septads | 41 | 1200.0 | 13 | Mailing lists |
| sternbrocot4 | level 4 of the Stern-Brocot tree | 16 | 1200.0 | 13 | Mailing lists |
| thirteenlim | Thirteen-limit otonal chord | 7 | 1200.0 | 13 | Mailing lists |
| variant-on-marcel_12 | Expansion of Marcel de Velde's JI tuning, TL #90805 (9 July 2010) | 12 | 1200.0 | 13 | Mailing lists |
| walker | Robert Walker's 2.3.11.13 scale | 7 | 1200.0 | 13 | Mailing lists |
| yarman_ushaq | 10-tone Ushaq/Huseyni by Ozan Yarman | 10 | 1200.0 | 13 | Mailing lists |
| xen06-polansky-study-3 | Octave III tuning for 'Piano Study #5 (For JPR)' | 12 | 1200.0 | 13 | Xenharmonikon |
| xen06-polansky-study-full | Full four octave tuning for 'Piano Study #5 (For JPR)' | 48 | 4800.0 | 13 | Xenharmonikon |
| xen07-forster-diamond | Tuning of the Diamond Marimba II | 41 | 1200.0 | 13 | Xenharmonikon |
| xen07-morrison-decimal | Just approximation to ten tone equal temperament. | 10 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-1-11-13 | Tritriadic scale built from 1:11:13 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-1-5-13 | Tritriadic scale built from 1:5:13 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-10-13-15 | Tritriadic scale built from 10:13:15 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-10-13-18 | Tritriadic scale built from 10:13:18 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-11-13-15 | Tritriadic scale built from 11:13:15 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-12-13-18 | Tritriadic scale built from 12:13:18 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-13-14-16 | Tritriadic scale built from 13:14:16 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-22-26-33 | Tritriadic scale built from 22:26:33 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-24-35-26 | Tritriadic scale built from 24:35:26 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-26-30-39 | Tritriadic scale built from 26:30:39 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-26-32-39 | Tritriadic scale built from 26:32:39 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-26-33-39 | Tritriadic scale built from 26:33:39 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-26-35-48 | Tritriadic scale built from 26:35:48 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-32-39-48 | Tritriadic scale built from 32:39:48 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-7-10-13 | Tritriadic scale built from 7:10:13 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-7-11-13 | Tritriadic scale built from 7:11:13 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-7-9-13 | Tritriadic scale built from 7:9:13 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-8-14-13 | Tritriadic scale built from 8:14:13 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-9-11-13 | Tritriadic scale built from 9:11:13 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-chalmers-tritriadic-9-13-10 | Tritriadic scale built from 9:13:10 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-polansky-will-you-miss-me | Scale for 'Will You Miss Me' | 17 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16a-01 | Marwa permutation 1 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16a-02 | Marwa permutation 2 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16a-03 | Marwa permutation 3 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16a-04 | Marwa permutation 4 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16a-05 | Marwa permutation 5 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16a-06 | Marwa permutation 6 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16a-07 | Marwa permutation 7 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16a-08 | Marwa permutation 8 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16a-09 | Marwa permutation 9 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16a-10 | Marwa permutation 10 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16b-01 | Marwa permutation 1 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16b-02 | Marwa permutation 2 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16b-03 | Marwa permutation 3 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16b-04 | Marwa permutation 4 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16b-05 | Marwa permutation 5 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16b-06 | Marwa permutation 6 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16b-07 | Marwa permutation 7 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16b-08 | Marwa permutation 8 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16b-09 | Marwa permutation 9 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen09-wilson-marwa-16b-10 | Marwa permutation 10 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07a-01 | Purvi modulation 1 from Figure 7a, Kathleen Schlesinger (13/12 16/15 15/13), (15/13 13/12 16/15) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07a-02 | Purvi modulation 2 from Figure 7a, Kathleen Schlesinger (13/12 16/15 15/13), (15/13 13/12 16/15) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07a-03 | Purvi modulation 3 from Figure 7a, Kathleen Schlesinger (13/12 16/15 15/13), (15/13 13/12 16/15) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07a-04 | Purvi modulation 4 from Figure 7a, Kathleen Schlesinger (13/12 16/15 15/13), (15/13 13/12 16/15) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07a-05 | Purvi modulation 5 from Figure 7a, Kathleen Schlesinger (13/12 16/15 15/13), (15/13 13/12 16/15) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07a-06 | Purvi modulation 6 from Figure 7a, Kathleen Schlesinger (13/12 16/15 15/13), (15/13 13/12 16/15) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07a-07 | Purvi modulation 7 from Figure 7a, Kathleen Schlesinger (13/12 16/15 15/13), (15/13 13/12 16/15) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07b-01 | Purvi modulation 1 from Figure 7b, Kathleen Schlesinger (15/13 16/15 13/12), (16/15 13/12 15/13) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07b-02 | Purvi modulation 2 from Figure 7b, Kathleen Schlesinger (15/13 16/15 13/12), (16/15 13/12 15/13) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07b-03 | Purvi modulation 3 from Figure 7b, Kathleen Schlesinger (15/13 16/15 13/12), (16/15 13/12 15/13) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07b-04 | Purvi modulation 4 from Figure 7b, Kathleen Schlesinger (15/13 16/15 13/12), (16/15 13/12 15/13) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07b-05 | Purvi modulation 5 from Figure 7b, Kathleen Schlesinger (15/13 16/15 13/12), (16/15 13/12 15/13) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07b-06 | Purvi modulation 6 from Figure 7b, Kathleen Schlesinger (15/13 16/15 13/12), (16/15 13/12 15/13) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07b-07 | Purvi modulation 7 from Figure 7b, Kathleen Schlesinger (15/13 16/15 13/12), (16/15 13/12 15/13) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07c-01 | Purvi modulation 1 from Figure 7c, Kathleen Schlesinger (16/15 15/13 13/12), (13/12 15/13 16/15) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07c-02 | Purvi modulation 2 from Figure 7c, Kathleen Schlesinger (16/15 15/13 13/12), (13/12 15/13 16/15) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07c-03 | Purvi modulation 3 from Figure 7c, Kathleen Schlesinger (16/15 15/13 13/12), (13/12 15/13 16/15) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07c-04 | Purvi modulation 4 from Figure 7c, Kathleen Schlesinger (16/15 15/13 13/12), (13/12 15/13 16/15) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07c-05 | Purvi modulation 5 from Figure 7c, Kathleen Schlesinger (16/15 15/13 13/12), (13/12 15/13 16/15) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07c-06 | Purvi modulation 6 from Figure 7c, Kathleen Schlesinger (16/15 15/13 13/12), (13/12 15/13 16/15) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen10-wilson-purvi-07c-07 | Purvi modulation 7 from Figure 7c, Kathleen Schlesinger (16/15 15/13 13/12), (13/12 15/13 16/15) | 7 | 1200.0 | 13 | Xenharmonikon |
| xen11-garcia-linear-29 | Linear series of alternating 15/13 and 52/45 | 29 | 1200.0 | 13 | Xenharmonikon |
| xen12-chalmers-tritriadic-dm-13-9-5 | Tritriadic D->M scale built from 13:9:5 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen12-chalmers-tritriadic-dm-7-13-1 | Tritriadic D->M scale built from 7:13:1 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen12-chalmers-tritriadic-mt-13-9-5 | Tritriadic M->T scale built from 13:9:5 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen12-hanson-12-ogdoadic-diamond | Ogdoadic Diamond, Figure 12 | 49 | 1200.0 | 13 | Xenharmonikon |
| xen12-hanson-13-three-ogdoadic-diamonds | 3 Ogdoadic Diamonds (at 1/1, 4/3 & 3/2), Figure 13 | 91 | 1200.0 | 13 | Xenharmonikon |
| xen12-wilson-42-ogdoadic-tileburst-1 | Four Ogdoadic Tilebursts, Figure 42, top left | 28 | 1200.0 | 13 | Xenharmonikon |
| xen12-wilson-42-ogdoadic-tileburst-2 | Four Ogdoadic Tilebursts, Figure 42, top right | 28 | 1200.0 | 13 | Xenharmonikon |
| xen12-wilson-42-ogdoadic-tileburst-3 | Four Ogdoadic Tilebursts, Figure 42, bottom left | 28 | 1200.0 | 13 | Xenharmonikon |
| xen12-wilson-42-ogdoadic-tileburst-4 | Four Ogdoadic Tilebursts, Figure 42, bottom right | 27 | 1200.0 | 13 | Xenharmonikon |
| xen13-mclaren-factorable-numbers | Factorable numbers scale | 5 | 884.4 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-diamond-13-11 | Triadic diamond for M=13/11, D=3/2 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-diamond-13-11-tetrachord | Upper tetrachord 104/99 * 363/338 * 13/11 of triadic diamond for M=13/11, D=3/2 | 3 | 498.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-diamond-15-13 | Triadic diamond for M=15/13, D=3/2 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-diamond-15-13-tetrachord | Upper tetrachord 40/39 * 169/150 * 15/13 of triadic diamond for M=15/13, D=3/2 | 3 | 498.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-diamond-16-13 | Triadic diamond for M=16/13, D=3/2 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-diamond-16-13-tetrachord | Upper tetrachord 13/12 * 512/507 * 39/32 of triadic diamond for M=16/13, D=3/2 | 3 | 498.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-diamond-26-21 | Triadic diamond for M=26/21, D=3/2 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-diamond-26-21-tetrachord | Upper tetrachord 14/13 * 1352/1323 * 63/52 of triadic diamond for M=26/21, D=3/2 | 3 | 498.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-reversed-diamond-13-10 | Triadic reversed diamond for M=13/10, D=3/2 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-reversed-diamond-13-10-tetrachord | Tetrachord 40/39 * 507/400 * 40/39 of triadic reversed diamond for M=13/10, D=3/2 | 3 | 498.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-reversed-diamond-13-11 | Triadic reversed diamond for M=13/11, D=3/2 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-reversed-diamond-13-11-tetrachord | Tetrachord 44/39 * 507/484 * 44/39 of triadic reversed diamond for M=13/11, D=3/2 | 3 | 498.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-reversed-diamond-15-13 | Triadic reversed diamond for M=15/13, D=3/2 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-reversed-diamond-15-13-tetrachord | Tetrachord 15/13 * 676/675 * 15/13 of triadic reversed diamond for M=15/13, D=3/2 | 3 | 498.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-reversed-diamond-16-13 | Triadic reversed diamond for M=16/13, D=3/2 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-reversed-diamond-16-13-tetrachord | Tetrachord 13/12 * 192/169 * 13/12 of triadic reversed diamond for M=16/13, D=3/2 | 3 | 498.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-reversed-diamond-26-21 | Triadic reversed diamond for M=26/21, D=3/2 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-reversed-diamond-26-21-tetrachord | Tetrachord 14/13 * 169/147 * 14/13 of triadic reversed diamond for M=26/21, D=3/2 | 3 | 498.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-reversed-diamond-33-26 | Triadic reversed diamond for M=33/26, D=3/2 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-reversed-diamond-33-26-tetrachord | Tetrachord 104/99 * 3267/2704 * 104/99 of triadic reversed diamond for M=33/26, D=3/2 | 3 | 498.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-reversed-diamond-39-32 | Triadic reversed diamond for M=39/32, D=3/2 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen15-chalmers-triadic-reversed-diamond-39-32-tetrachord | Tetrachord 128/117 * 4563/4096 * 128/117 of triadic reversed diamond for M=39/32, D=3/2 | 3 | 498.0 | 13 | Xenharmonikon |
| xen15-gilson-generalized-pythagorean-13-8-3 | Generalized Pythagorean Scale, 13/8 stacked 3=2+1 times | 3 | 1200.0 | 13 | Xenharmonikon |
| xen15-gilson-generalized-pythagorean-13-8-7 | Generalized Pythagorean Scale, 13/8 stacked 7=5+2 times | 7 | 1200.0 | 13 | Xenharmonikon |
| xen16-hero-lambdoma-16 | 16 by 16 Lambdoma matrix | 158 | 9600.0 | 13 | Xenharmonikon |
| xen18-ayers-table-04 | 7 Iterated Arithmetic Means between 1/1 and 2/1 | 8 | 1200.0 | 13 | Xenharmonikon |
| xen18-ayers-table-05 | 6 Generalized Arithmetic Means between 1/1 and 2/1 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen18-ayers-table-11 | 7 Iterated Harmonic Means between 1/1 and 2/1 | 8 | 1200.0 | 13 | Xenharmonikon |
| xen18-ayers-table-44 | Transposing 3 Fibonacci-Type Means to Lower Tetrachord Between 1/1 and 4/3 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen18-ayers-table-45 | Complementary Ratios to 3 Fibonacci-Type Means for Lower Tetrachord Between 1/1 and 4/3 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen18-ayers-table-55 | First Unnamed Mean scale from window in Table 55 | 7 | 1200.0 | 13 | Xenharmonikon |
| xen18-schulter-symmetrical | A JI version of a symmetrical scale in 17-WT | 7 | 1200.0 | 13 | Xenharmonikon |
| xen18-secor-13-limit-1-just | 13-limit just scale | 7 | 1200.0 | 13 | Xenharmonikon |
| xen18-secor-13-limit-2-just | 13-limit just scale, enharmonic alteration | 7 | 1200.0 | 13 | Xenharmonikon |
| xen18-secor-neutral-third-mos-1-just | MOS generated by a neutral third, just | 7 | 1200.0 | 13 | Xenharmonikon |
| xen18-secor-neutral-third-mos-2-just | Transposition of a mode of MOS generated by a neutral third, just | 7 | 1200.0 | 13 | Xenharmonikon |