11-limit scales

352 scales

File	Description	Notes	Period (¢)	Limit	Source
014_H4	Hyperenharmonic tetrachord 99/98 * 49/48 * 128/99	3	498.0	11	Divisions of the Tetrachord
026_H8	Hyperenharmonic tetrachord 56/55 * 55/54 * 9/7, Wilson	3	498.0	11	Divisions of the Tetrachord
056_E4	Enharmonic tetrachord 33/32 * 64/63 * 14/11	3	498.0	11	Divisions of the Tetrachord
059_E4	Enharmonic tetrachord 36/35 * 55/54 * 14/11	3	498.0	11	Divisions of the Tetrachord
060_E4	Enharmonic tetrachord 50/49 * 77/75 * 14/11	3	498.0	11	Divisions of the Tetrachord
107_E13	Enharmonic tetrachord 56/55 * 22/21 * 5/4, Ptolemy?	3	498.0	11	Divisions of the Tetrachord
117_E14	Enharmonic tetrachord 4374/4235 * 4235/4096 * 8192/6561	3	498.0	11	Divisions of the Tetrachord
123_E15	Enharmonic tetrachord 45/44 * 22/21 * 56/45	3	498.0	11	Divisions of the Tetrachord
125_E15	Enharmonic tetrachord 80/77 * 33/32 * 56/45	3	498.0	11	Divisions of the Tetrachord
148_C4	Chromatic tetrachord 81/77 * 77/75 * 100/81	3	498.0	11	Divisions of the Tetrachord
171_C7	Chromatic tetrachord 132/125 * 250/243 * 27/22	3	498.0	11	Divisions of the Tetrachord
173_C7	Chromatic tetrachord 28/27 * 22/21 * 27/22	3	498.0	11	Divisions of the Tetrachord
174_C7	Chromatic tetrachord 55/54 * 16/15 * 27/22	3	498.0	11	Divisions of the Tetrachord
178_C8	Chromatic tetrachord 36/35 * 35/33 * 11/9	3	498.0	11	Divisions of the Tetrachord
179_C8	Chromatic tetrachord 45/44 * 16/15 * 11/9	3	498.0	11	Divisions of the Tetrachord
180_C8	Chromatic tetrachord 56/55 * 15/14 * 11/9	3	498.0	11	Divisions of the Tetrachord
184_C8	Chromatic tetrachord 28/27 * 81/77 * 11/9	3	498.0	11	Divisions of the Tetrachord
203_C12	Chromatic tetrachord 22/21 * 21/20 * 40/33	3	498.0	11	Divisions of the Tetrachord
205_C12	Chromatic tetrachord 33/32 * 16/15 * 40/33	3	498.0	11	Divisions of the Tetrachord
206_C12	Chromatic tetrachord 55/54 * 27/25 * 40/33	3	498.0	11	Divisions of the Tetrachord
217_C14	Chromatic tetrachord 55/54 * 12/11 * 6/5, Barbour	3	498.0	11	Divisions of the Tetrachord
219_C14	Chromatic tetrachord 22/21 * 35/33 * 6/5	3	498.0	11	Divisions of the Tetrachord
223_C14	Chromatic tetrachord 80/77 * 77/72 * 6/5	3	498.0	11	Divisions of the Tetrachord
225_C14	Chromatic tetrachord 88/81 * 45/44 * 6/5	3	498.0	11	Divisions of the Tetrachord
228_C14	Chromatic tetrachord 100/99 * 11/10 * 6/5, Hofmann	3	498.0	11	Divisions of the Tetrachord
251_C17	Chromatic tetrachord 33/32 * 12/11 * 32/27, Barbour?	3	498.0	11	Divisions of the Tetrachord
252_C17	Chromatic tetrachord 45/44 * 11/10 * 32/27, Barbour?	3	498.0	11	Divisions of the Tetrachord
281_C20	Chromatic tetrachord 56/55 * 10/9 * 33/28	3	498.0	11	Divisions of the Tetrachord
282_C20	Chromatic tetrachord 16/15 * 35/33 * 33/28	3	498.0	11	Divisions of the Tetrachord
308_C24	Chromatic tetrachord 22/21 * 12/11 * 7/6, Ptolemy	3	498.0	11	Divisions of the Tetrachord
324_C24	Chromatic tetrachord 88/81 * 81/77 * 7/6	3	498.0	11	Divisions of the Tetrachord
395_D6	Diatonic tetrachord 35/33 * 11/10 * 8/7, Avicenna	3	498.0	11	Divisions of the Tetrachord
396_D6	Diatonic tetrachord 77/72 * 12/11 * 8/7, Avicenna	3	498.0	11	Divisions of the Tetrachord
414_D8	Diatonic tetrachord 16/15 * 11/10 * 25/22	3	498.0	11	Divisions of the Tetrachord
415_D8	Diatonic tetrachord 88/81 * 27/25 * 25/22	3	498.0	11	Divisions of the Tetrachord
416_D8	Diatonic tetrachord 22/21 * 25/22 * 28/25	3	498.0	11	Divisions of the Tetrachord
417_D8	Diatonic tetrachord 28/27 * 198/175 * 25/22	3	498.0	11	Divisions of the Tetrachord
441_D12	Diatonic tetrachord 10/9 * 297/280 * 112/99	3	498.0	11	Divisions of the Tetrachord
442_D12	Diatonic tetrachord 22/21 * 9/8 * 112/99	3	498.0	11	Divisions of the Tetrachord
457_D15	Diatonic tetrachord 9/8 * 12/11 * 88/81, Avicenna	3	498.0	11	Divisions of the Tetrachord
460_D15	Diatonic tetrachord 9/8 * 11/10 * 320/297, Al-Farabi	3	498.0	11	Divisions of the Tetrachord
469_D15	Diatonic tetrachord 121/108 * 9/8 * 128/121, Partch	3	498.0	11	Divisions of the Tetrachord
474_D17	Diatonic tetrachord 12/11 * 11/10 * 10/9, Ptolemy	3	498.0	11	Divisions of the Tetrachord
477_R1	Reduplicated tetrachord 11/10 * 11/10 * 400/363	3	498.0	11	Divisions of the Tetrachord
478_R2	Reduplicated tetrachord 12/11 * 12/11 * 121/108, Avicenna	3	498.0	11	Divisions of the Tetrachord
486_R10	Reduplicated tetrachord 22/21 * 147/121 * 22/21	3	498.0	11	Divisions of the Tetrachord
560_M68	Miscellaneous tetrachord 12/11 * 297/256 * 256/243	3	498.0	11	Divisions of the Tetrachord
571_M79	Miscellaneous tetrachord 16/15 * 12/11 * 55/48	3	498.0	11	Divisions of the Tetrachord
572_M80	Miscellaneous tetrachord 10/9 * 63/55 * 22/21	3	498.0	11	Divisions of the Tetrachord
11lwt	11-limit Rational Well-temperament	12	1200.0	11	Mailing lists
18rat	11-limit version of 18edo	18	1200.0	11	Mailing lists
2.3.5-7.11-9.diamond		10	1200.0	11	Mailing lists
Bendeler	Bendeler, as quoted by Toepfer, compiled by A.Sparschuh	12	1200.0	11	Mailing lists
Eikosany	3)6 1.3.5.7.9.11 Eikosany (1.3.5 tonic)	20	1200.0	11	Mailing lists
ForJustin-pentatonic001	Pentatonic mode for Justin, possibly applicable to Japanese styles	5	1200.0	11	Mailing lists
SpDoubEpi11lim	Sparschuh's [2010] double (5ths & 3rds) epimoric 11-lim. dodecatonics	12	1200.0	11	Mailing lists
SpUndecanarian	Sparschuh's [2010] epimoric 11-limit decomposition of the PC	12	1200.0	11	Mailing lists
bihexany	Hole around [0, 1/2, 1/2, 1/2]	12	1200.0	11	Mailing lists
blackjack_r	Rational "Wilson/Grady"-style version, Paul Erlich, TL 28-11-2001	21	1200.0	11	Mailing lists
cw12_11	CalkinWilf(<12 19 28 34 42\|)	12	1200.0	11	Mailing lists
cw19_11	CalkinWilf(<19 30 44 53 66\|)	19	1200.0	11	Mailing lists
eidohole5	Fifth eikohole ball	42	1200.0	11	Mailing lists
eikocenter	The 2-3-5-7-9-11 Eikosany plus a tonal center note	21	1200.0	11	Mailing lists
eikohole1	First eikohole ball <6 9 13 17 20\|-epimorphic	6	1200.0	11	Mailing lists
eikohole2	Second eikohole ball	18	1200.0	11	Mailing lists
eikohole3	Third eikohole ball = eikosany	20	1200.0	11	Mailing lists
eikohole6	Sixth eikohole ball	54	1200.0	11	Mailing lists
elevenlim	Eleven-limit otonal chord	6	1200.0	11	Mailing lists
farabi9	Al-Farabi 9 note ud scale	9	1200.0	11	Mailing lists
harm12s	Harmonics 1 to 12 and subharmonics mixed	11	1200.0	11	Mailing lists
moh	Rational mohajira, 11/9 generator	7	1200.0	11	Mailing lists
mohajira-to-slendro	From Mohajira to Aeolian and Slendros	12	1200.0	11	Mailing lists
mostly-elevens-scale	Scale derived mostly from elevens.	17	1200.0	11	Mailing lists
mund45	Tenney reduced 11-limit Miracle[45]	45	1200.0	11	Mailing lists
mundeuc45	Euclidean reduced detempered Miracle[45] with Tenney tie-breaker	45	1200.0	11	Mailing lists
neogji12	Neo-Gothic 12-note JI tuning (primes 2/3/7/11) F-F with Eb key as D+1	12	1200.0	11	Mailing lists
omaha	Omaha 2.3.11 scale	12	1200.0	11	Mailing lists
partch-29-av	29-tone JI scale from Partch's Adapted Viola 1928-30	29	1200.0	11	Mailing lists
partch-41combo	41-tone JI combination from Partch's 29-tone and 37-tone scales	41	1200.0	11	Mailing lists
partch_37	From "Exposition on Monophony" 1933, unp. see Ayers, 1/1 vol.9(2)	37	1200.0	11	Mailing lists
portsmouth	Portsmouth, a 2.3.7.11 subgroup scale	12	1200.0	11	Mailing lists
rat-19et	Rational approximation of 19 equal temperament using 121/81 and 6/5	19	1200.0	11	Mailing lists
red72_11	Canonical 11-limit reduced scale	72	1200.0	11	Mailing lists
red72_11geo	Geometric 11-limit reduced scale	72	1200.0	11	Mailing lists
red72_11pro	Prooijen 11-limit reduced scale	72	1200.0	11	Mailing lists
schis41	Tenney reduced version of Wilson_41	41	1200.0	11	Mailing lists
segah-zalzalian	Arabic Segah (or Sikah) based on zalzal.scl (step 5 = 1/1)	7	1200.0	11	Mailing lists
segah_rat	Rationalized Arabic Segh	7	1200.0	11	Mailing lists
sevish	Sevish JI scale	12	1200.0	11	Mailing lists
ten58	58 Tenny reduced via 11-limit commas {126/125,243/242,441/440,896/891}	58	1200.0	11	Mailing lists
tenn41a	29&41 Tenney reduced fifths from -20 to 20	41	1200.0	11	Mailing lists
tenn41b	41&53 Tenney reduced fifths from -20 to 20	41	1200.0	11	Mailing lists
tenn41c	53&118 Tenney reduced fifths from -20 to 20	41	1200.0	11	Mailing lists
tenn58	Chain of 11/9s -28 to 29 Tenney reduced by {243/242,441/440,896/891}	58	1200.0	11	Mailing lists
tetratetra	tetratetradic scale on 6:7:9:11! 22:27:33 on degree 11! spooky pentatonic!	12	1200.0	11	Mailing lists
unimajor	A 2.3.11/7 subgroup scale	12	1200.0	11	Mailing lists
unknown	Is this scale known?	7	1200.0	11	Mailing lists
wilclav	Erv Wilson's clavochord scale from Xenharmonikon 4	19	1200.0	11	Mailing lists
xen02-wilson-combination-sets	13579*11 Combination Sets - 1 3 5 7 9 11 Diamondic Cross-Set	32	1200.0	11	Xenharmonikon
xen03-colvig-gamelan-7-11	Colvig's American Gamelan 7-11 scale	5	1200.0	11	Xenharmonikon
xen03-secor-partch	Partch Monophonic Fabric	43	1200.0	11	Xenharmonikon
xen03-wilson-baglama	Turkish Baglama Scale (as inferred from string lengths by E.W.)	17	1200.0	11	Xenharmonikon
xen03-wilson-negative-31	Negative, linear-mapped intonational system, 31 notes	31	1200.0	11	Xenharmonikon
xen03-wilson-partch	Harry Partch's Scale on the Bosanquet keyboard	41	1200.0	11	Xenharmonikon
xen03-wilson-positive-41	Positive, linear-mapped intonational system, 41 notes	41	1200.0	11	Xenharmonikon
xen05-walker-golden	Scale used in the composition 'The Golden Net'	21	1200.0	11	Xenharmonikon
xen06-polansky-study-4	Octave IV tuning for 'Piano Study #5 (For JPR)'	12	1200.0	11	Xenharmonikon
xen06-wilson-clavichord-19	Scale for the Clavichord-19	19	1200.0	11	Xenharmonikon
xen07-harrison-thoughts-2	Pelog based on partials 10/11/12/14/15/16/18	7	1200.0	11	Xenharmonikon
xen07-harrison-thoughts-8	Partials 6/7/8/9/11	5	1200.0	11	Xenharmonikon
xen07-rosenthal-helix	Scale for 'Helix Song'	10	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-1-5-11	Tritriadic scale built from 1:5:11	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-1-7-11	Tritriadic scale built from 1:7:11	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-10-11-12	Tritriadic scale built from 10:11:12	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-10-11-15	Tritriadic scale built from 10:11:15	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-10-15-11	Tritriadic scale built from 10:15:11	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-11-14-20	Tritriadic scale built from 11:14:20	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-11-15-20	Tritriadic scale built from 11:15:20	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-11-16-20	Tritriadic scale built from 11:16:20	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-11-18-15	Tritriadic scale built from 11:18:15	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-11-20-18	Tritriadic scale built from 11:20:18	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-11-8-6	Tritriadic scale built from 11:8:6	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-15-18-22	Tritriadic scale built from 15:18:22	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-18-22-27	Tritriadic scale built from 18:22:27	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-22-24-27	Tritriadic scale built from 22:24:27	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-22-24-33	Tritriadic scale built from 22:24:33	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-22-25-27	Tritriadic scale built from 22:25:27	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-22-27-33	Tritriadic scale built from 22:27:33	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-22-28-33	Tritriadic scale built from 22:28:33	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-22-33-24	Tritriadic scale built from 22:33:24	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-24-33-44	Tritriadic scale built from 24:33:44	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-27-24-22	Tritriadic scale built from 27:24:22	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-27-25-22	Tritriadic scale built from 27:25:22	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-28-33-42	Tritriadic scale built from 28:33:42	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-6-10-11	Tritriadic scale built from 6:10:11	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-6-8-11	Tritriadic scale built from 6:8:11	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-7-8-11	Tritriadic scale built from 7:8:11	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-7-9-11	Tritriadic scale built from 7:9:11	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-8-11-12	Tritriadic scale built from 8:11:12	7	1200.0	11	Xenharmonikon
xen09-chalmers-tritriadic-9-10-11	Tritriadic scale built from 9:10:11	7	1200.0	11	Xenharmonikon
xen09-grady-dekany-a	Dekany A	10	1200.0	11	Xenharmonikon
xen09-grady-dekany-b	Dekany B	10	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-01	Marwa permutation 1 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-02	Marwa permutation 2 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-03	Marwa permutation 3 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-04	Marwa permutation 4 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-05	Marwa permutation 5 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-06	Marwa permutation 6 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-07	Marwa permutation 7 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-08	Marwa permutation 8 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-09	Marwa permutation 9 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-10	Marwa permutation 10 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-11	Marwa permutation 11 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-12	Marwa permutation 12 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-13	Marwa permutation 13 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-14	Marwa permutation 14 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-15	Marwa permutation 15 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-16	Marwa permutation 16 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-17	Marwa permutation 17 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-18	Marwa permutation 18 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-19	Marwa permutation 19 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-10-20	Marwa permutation 20 from Figure 10, Ptolemy 7/6 12/11 22/21	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15a-01	Marwa permutation 1 from Figure 15a, Ptolemy 12/11 22/21 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15a-02	Marwa permutation 2 from Figure 15a, Ptolemy 12/11 22/21 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15a-03	Marwa permutation 3 from Figure 15a, Ptolemy 12/11 22/21 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15a-04	Marwa permutation 4 from Figure 15a, Ptolemy 12/11 22/21 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15a-05	Marwa permutation 5 from Figure 15a, Ptolemy 12/11 22/21 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15a-06	Marwa permutation 6 from Figure 15a, Ptolemy 12/11 22/21 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15a-07	Marwa permutation 7 from Figure 15a, Ptolemy 12/11 22/21 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15a-08	Marwa permutation 8 from Figure 15a, Ptolemy 12/11 22/21 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15a-09	Marwa permutation 9 from Figure 15a, Ptolemy 12/11 22/21 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15a-10	Marwa permutation 10 from Figure 15a, Ptolemy 12/11 22/21 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15b-01	Marwa permutation 1 from Figure 15b, Ptolemy 22/21 12/11 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15b-02	Marwa permutation 2 from Figure 15b, Ptolemy 22/21 12/11 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15b-03	Marwa permutation 3 from Figure 15b, Ptolemy 22/21 12/11 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15b-04	Marwa permutation 4 from Figure 15b, Ptolemy 22/21 12/11 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15b-05	Marwa permutation 5 from Figure 15b, Ptolemy 22/21 12/11 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15b-06	Marwa permutation 6 from Figure 15b, Ptolemy 22/21 12/11 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15b-07	Marwa permutation 7 from Figure 15b, Ptolemy 22/21 12/11 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15b-08	Marwa permutation 8 from Figure 15b, Ptolemy 22/21 12/11 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15b-09	Marwa permutation 9 from Figure 15b, Ptolemy 22/21 12/11 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-15b-10	Marwa permutation 10 from Figure 15b, Ptolemy 22/21 12/11 7/6	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18a-01	Marwa permutation 1 from Figure 18a, Ptolemy 12/11 11/10 10/9	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18a-02	Marwa permutation 2 from Figure 18a, Ptolemy 12/11 11/10 10/9	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18a-03	Marwa permutation 3 from Figure 18a, Ptolemy 12/11 11/10 10/9	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18a-04	Marwa permutation 4 from Figure 18a, Ptolemy 12/11 11/10 10/9	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18a-05	Marwa permutation 5 from Figure 18a, Ptolemy 12/11 11/10 10/9	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18a-06	Marwa permutation 6 from Figure 18a, Ptolemy 12/11 11/10 10/9	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18a-07	Marwa permutation 7 from Figure 18a, Ptolemy 12/11 11/10 10/9	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18a-08	Marwa permutation 8 from Figure 18a, Ptolemy 12/11 11/10 10/9	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18a-09	Marwa permutation 9 from Figure 18a, Ptolemy 12/11 11/10 10/9	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18a-10	Marwa permutation 10 from Figure 18a, Ptolemy 12/11 11/10 10/9	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18b-01	Marwa permutation 1 from Figure 18b, Ptolemy 10/9 11/10 12/11	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18b-02	Marwa permutation 2 from Figure 18b, Ptolemy 10/9 11/10 12/11	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18b-03	Marwa permutation 3 from Figure 18b, Ptolemy 10/9 11/10 12/11	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18b-04	Marwa permutation 4 from Figure 18b, Ptolemy 10/9 11/10 12/11	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18b-05	Marwa permutation 5 from Figure 18b, Ptolemy 10/9 11/10 12/11	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18b-06	Marwa permutation 6 from Figure 18b, Ptolemy 10/9 11/10 12/11	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18b-07	Marwa permutation 7 from Figure 18b, Ptolemy 10/9 11/10 12/11	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18b-08	Marwa permutation 8 from Figure 18b, Ptolemy 10/9 11/10 12/11	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18b-09	Marwa permutation 9 from Figure 18b, Ptolemy 10/9 11/10 12/11	7	1200.0	11	Xenharmonikon
xen09-wilson-marwa-18b-10	Marwa permutation 10 from Figure 18b, Ptolemy 10/9 11/10 12/11	7	1200.0	11	Xenharmonikon
xen10-chalmers-tritriadic-3-11-15	Tritriadic scale built from 3:11:15	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08a-01	Purvi modulation 1 from Figure 8a, Ptolemy (12/11 22/21 7/6), (7/6 12/11 22/21)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08a-02	Purvi modulation 2 from Figure 8a, Ptolemy (12/11 22/21 7/6), (7/6 12/11 22/21)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08a-03	Purvi modulation 3 from Figure 8a, Ptolemy (12/11 22/21 7/6), (7/6 12/11 22/21)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08a-04	Purvi modulation 4 from Figure 8a, Ptolemy (12/11 22/21 7/6), (7/6 12/11 22/21)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08a-05	Purvi modulation 5 from Figure 8a, Ptolemy (12/11 22/21 7/6), (7/6 12/11 22/21)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08a-06	Purvi modulation 6 from Figure 8a, Ptolemy (12/11 22/21 7/6), (7/6 12/11 22/21)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08a-07	Purvi modulation 7 from Figure 8a, Ptolemy (12/11 22/21 7/6), (7/6 12/11 22/21)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08b-01	Purvi modulation 1 from Figure 8b, Ptolemy (7/6 22/21 12/11), (22/21 12/11 7/6)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08b-02	Purvi modulation 2 from Figure 8b, Ptolemy (7/6 22/21 12/11), (22/21 12/11 7/6)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08b-03	Purvi modulation 3 from Figure 8b, Ptolemy (7/6 22/21 12/11), (22/21 12/11 7/6)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08b-04	Purvi modulation 4 from Figure 8b, Ptolemy (7/6 22/21 12/11), (22/21 12/11 7/6)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08b-05	Purvi modulation 5 from Figure 8b, Ptolemy (7/6 22/21 12/11), (22/21 12/11 7/6)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08b-06	Purvi modulation 6 from Figure 8b, Ptolemy (7/6 22/21 12/11), (22/21 12/11 7/6)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08b-07	Purvi modulation 7 from Figure 8b, Ptolemy (7/6 22/21 12/11), (22/21 12/11 7/6)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08c-01	Purvi modulation 1 from Figure 8c, Ptolemy (22/21 7/6 12/11), (12/11 7/6 22/21)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08c-02	Purvi modulation 2 from Figure 8c, Ptolemy (22/21 7/6 12/11), (12/11 7/6 22/21)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08c-03	Purvi modulation 3 from Figure 8c, Ptolemy (22/21 7/6 12/11), (12/11 7/6 22/21)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08c-04	Purvi modulation 4 from Figure 8c, Ptolemy (22/21 7/6 12/11), (12/11 7/6 22/21)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08c-05	Purvi modulation 5 from Figure 8c, Ptolemy (22/21 7/6 12/11), (12/11 7/6 22/21)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08c-06	Purvi modulation 6 from Figure 8c, Ptolemy (22/21 7/6 12/11), (12/11 7/6 22/21)	7	1200.0	11	Xenharmonikon
xen10-wilson-purvi-08c-07	Purvi modulation 7 from Figure 8c, Ptolemy (22/21 7/6 12/11), (12/11 7/6 22/21)	7	1200.0	11	Xenharmonikon
xen11-chalmers-tetrachordal-04-02b	Malaka, a Lyra tuning: Soft or Intense Chromatic and Tonic Diatonic	7	1200.0	11	Xenharmonikon
xen11-wilsonsmithgrady-marimba	Marimba design, Inverted D'alessandro Kbd Program	36	1200.0	11	Xenharmonikon
xen12-chalmers-tritriadic-dm-1-3-11	Tritriadic D->M scale built from 1:3:11	7	1200.0	11	Xenharmonikon
xen12-chalmers-tritriadic-dm-11-27-9	Tritriadic D->M scale built from 11:27:9	7	1200.0	11	Xenharmonikon
xen12-chalmers-tritriadic-dm-11-5-3	Tritriadic D->M scale built from 11:5:3	7	1200.0	11	Xenharmonikon
xen12-chalmers-tritriadic-dm-15-11-5	Tritriadic D->M scale built from 15:11:5	7	1200.0	11	Xenharmonikon
xen12-chalmers-tritriadic-dm-25-27-11	Tritriadic D->M scale built from 25:27:11	7	1200.0	11	Xenharmonikon
xen12-chalmers-tritriadic-dm-3-11-27	Tritriadic D->M scale built from 3:11:27	7	1200.0	11	Xenharmonikon
xen12-chalmers-tritriadic-dm-5-9-11	Tritriadic D->M scale built from 5:9:11	7	1200.0	11	Xenharmonikon
xen12-chalmers-tritriadic-dm-9-11-15	Tritriadic D->M scale built from 9:11:15	7	1200.0	11	Xenharmonikon
xen12-chalmers-tritriadic-mt-11-27-9	Tritriadic M->T scale built from 11:27:9	7	1200.0	11	Xenharmonikon
xen12-chalmers-tritriadic-mt-11-5-3	Tritriadic M->T scale built from 11:5:3	7	1200.0	11	Xenharmonikon
xen12-chalmers-tritriadic-mt-15-11-5	Tritriadic M->T scale built from 15:11:5	7	1200.0	11	Xenharmonikon
xen12-chalmers-tritriadic-mt-25-27-11	Tritriadic M->T scale built from 25:27:11	7	1200.0	11	Xenharmonikon
xen12-chalmers-tritriadic-mt-3-11-27	Tritriadic M->T scale built from 3:11:27	7	1200.0	11	Xenharmonikon
xen12-chalmers-tritriadic-mt-5-9-11	Tritriadic M->T scale built from 5:9:11	7	1200.0	11	Xenharmonikon
xen12-chalmers-tritriadic-mt-9-11-15	Tritriadic M->T scale built from 9:11:15	7	1200.0	11	Xenharmonikon
xen12-wilson-02-hexany	3-5-7-11 Hexany, Figure 2	6	1200.0	11	Xenharmonikon
xen12-wilson-06-mandala	The 3-5-7-11 Mandala, Figure 6	14	1200.0	11	Xenharmonikon
xen12-wilson-06b-genus	357*11 Genus, Figure 6b	16	1200.0	11	Xenharmonikon
xen12-wilson-06c-4C1-tetrany	3-5-7-11 4C1 tetrany, Figure 6c	4	1200.0	11	Xenharmonikon
xen12-wilson-06c-4C3-tetrany	3-5-7-11 4C3 tetrany, Figure 6c	4	1200.0	11	Xenharmonikon
xen12-wilson-07-eikosany	1-3-7-9-11-15 Eikosany, Figure 7	20	1200.0	11	Xenharmonikon
xen12-wilson-07-eikosany-extended	1-3-7-9-11-15 Eikosany with two added tones, Figure 7	22	1200.0	11	Xenharmonikon
xen12-wilson-08-4C1-tetrany-01	1-3-7-11 4C1 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C1-tetrany-03	1-3-9-11 4C1 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C1-tetrany-05	1-3-11-15 4C1 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C1-tetrany-06	1-7-9-11 4C1 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C1-tetrany-08	1-7-11-15 4C1 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C1-tetrany-09	1-9-11-15 4C1 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C1-tetrany-10	3-7-9-11 4C1 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C1-tetrany-12	3-7-11-15 4C1 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C1-tetrany-13	3-9-11-15 4C1 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C1-tetrany-14	7-9-11-15 4C1 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C3-tetrany-01	1-3-7-11 4C3 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C3-tetrany-03	1-3-9-11 4C3 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C3-tetrany-05	1-3-11-15 4C3 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C3-tetrany-06	1-7-9-11 4C3 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C3-tetrany-08	1-7-11-15 4C3 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C3-tetrany-09	1-9-11-15 4C3 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C3-tetrany-10	3-7-9-11 4C3 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C3-tetrany-12	3-7-11-15 4C3 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C3-tetrany-13	3-9-11-15 4C3 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-08-4C3-tetrany-14	7-9-11-15 4C3 Tetrany, Figure 8	4	1200.0	11	Xenharmonikon
xen12-wilson-09-4C2-hexany-01	1-3-7-11 4C2 Hexany, Figure 9	6	1200.0	11	Xenharmonikon
xen12-wilson-09-4C2-hexany-03	1-3-9-11 4C2 Hexany, Figure 9	6	1200.0	11	Xenharmonikon
xen12-wilson-09-4C2-hexany-05	1-3-11-15 4C2 Hexany, Figure 9	6	1200.0	11	Xenharmonikon
xen12-wilson-09-4C2-hexany-06	1-7-9-11 4C2 Hexany, Figure 9	6	1200.0	11	Xenharmonikon
xen12-wilson-09-4C2-hexany-08	1-7-11-15 4C2 Hexany, Figure 9	6	1200.0	11	Xenharmonikon
xen12-wilson-09-4C2-hexany-09	1-9-11-15 4C2 Hexany, Figure 9	6	1200.0	11	Xenharmonikon
xen12-wilson-09-4C2-hexany-10	3-7-9-11 4C2 Hexany, Figure 9	6	1200.0	11	Xenharmonikon
xen12-wilson-09-4C2-hexany-12	3-7-11-15 4C2 Hexany, Figure 9	6	1200.0	11	Xenharmonikon
xen12-wilson-09-4C2-hexany-13	3-9-11-15 4C2 Hexany, Figure 9	6	1200.0	11	Xenharmonikon
xen12-wilson-09-4C2-hexany-14	7-9-11-15 4C2 Hexany, Figure 9	6	1200.0	11	Xenharmonikon
xen12-wilson-13-eikosany	1-3-5-7-9-11 Eikosany, Figure 13	20	1200.0	11	Xenharmonikon
xen12-wilson-14-diamond	1-3-5-7-9-11 Diamond, Figure 14	29	1200.0	11	Xenharmonikon
xen12-wilson-15-diamond-eikosany-intersection	Intersection of Diamond & Eikosany (1 3 5 7 9 11), Figure 15	10	1200.0	11	Xenharmonikon
xen12-wilson-15-diamond-eikosany-union	Union of Diamond & Eikosany (1 3 5 7 9 11), see Figure 15	37	1200.0	11	Xenharmonikon
xen12-wilson-20b-genus	Combination-product Sets (0,6) thru (6,6) 1 3 5 7 9 11, Figure 20b	32	1200.0	11	Xenharmonikon
xen12-wilson-23-dalessandro	Genus 333571111 (& 8 pigtails), D'Alessandro, Figure 23	56	1200.0	11	Xenharmonikon
xen12-wilson-23-genus	Genus 333571111, subset of D'Alessandro, see Figure 23	48	1200.0	11	Xenharmonikon
xen12-wilson-23-repeated-1	Lattice for Genus 33357*11 (plus 6 pigtails), Repeated Patterins in "Dalessandro", Figure 23	38	1200.0	11	Xenharmonikon
xen12-wilson-23-repeated-2	Lattice for Genus 33357 (plus 4 pigtails), Repeated Patterins in "Dalessandro", Figure 23	20	1200.0	11	Xenharmonikon
xen12-wilson-24-dalessandro	"D'alessandro", 1.3.5.7.9.11 Combination-Product Set series, Figure 24	38	1200.0	11	Xenharmonikon
xen12-wilson-25-6C1-hexany	1.3.5.7.9.11 6C1 Hexany, Figure 25	6	1200.0	11	Xenharmonikon
xen12-wilson-25-6C2-pentadekany	1.3.5.7.9.11 6C2 Pentadekany, Figure 25	15	1200.0	11	Xenharmonikon
xen12-wilson-25-6C3-eikosany	1.3.5.7.9.11 6C3 Eikosany, Figure 25	20	1200.0	11	Xenharmonikon
xen12-wilson-25-6C4-pentadekany	1.3.5.7.9.11 6C4 Pentadekany, Figure 25	15	1200.0	11	Xenharmonikon
xen12-wilson-25-6C5-hexany	1.3.5.7.9.11 6C5 Hexany, Figure 25	6	1200.0	11	Xenharmonikon
xen12-wilson-26-inverted-dallesandro	inverted "D'alessandro", Figure 26	36	1200.0	11	Xenharmonikon
xen12-wilson-30-double-dekany	5C2 + 5C3 1-5-7-11-15 Double-Dekany, Figure 30	14	1200.0	11	Xenharmonikon
xen12-wilson-31-pentadic-diamond	1-5-7-11-15 Pentadic Diamond, Figure 31	21	1200.0	11	Xenharmonikon
xen12-wilson-32-dekany	5C2 1.5.7.11.15 Dekany, Figure 32	10	1200.0	11	Xenharmonikon
xen12-wilson-33-dekany	5C3 1.5.7.11.15 Dekany, Figure 33	10	1200.0	11	Xenharmonikon
xen12-wilson-38-4C1-tetrany-02	1-3-5-11 4C1 Tetrany, Figure 38	4	1200.0	11	Xenharmonikon
xen12-wilson-38-4C1-tetrany-07	1-5-7-11 4C1 Tetrany, Figure 38	4	1200.0	11	Xenharmonikon
xen12-wilson-38-4C1-tetrany-08	1-5-9-11 4C1 Tetrany, Figure 38	4	1200.0	11	Xenharmonikon
xen12-wilson-38-4C1-tetrany-11	3-5-7-11 4C1 Tetrany, Figure 38	4	1200.0	11	Xenharmonikon
xen12-wilson-38-4C1-tetrany-12	3-5-9-11 4C1 Tetrany, Figure 38	4	1200.0	11	Xenharmonikon
xen12-wilson-38-4C1-tetrany-14	5-7-9-11 4C1 Tetrany, Figure 38	4	1200.0	11	Xenharmonikon
xen12-wilson-38-4C3-tetrany-02	1-3-5-11 4C3 Tetrany, Figure 38	4	1200.0	11	Xenharmonikon
xen12-wilson-38-4C3-tetrany-07	1-5-7-11 4C3 Tetrany, Figure 38	4	1200.0	11	Xenharmonikon
xen12-wilson-38-4C3-tetrany-08	1-5-9-11 4C3 Tetrany, Figure 38	4	1200.0	11	Xenharmonikon
xen12-wilson-38-4C3-tetrany-11	3-5-7-11 4C3 Tetrany, Figure 38	4	1200.0	11	Xenharmonikon
xen12-wilson-38-4C3-tetrany-12	3-5-9-11 4C3 Tetrany, Figure 38	4	1200.0	11	Xenharmonikon
xen12-wilson-38-4C3-tetrany-14	5-7-9-11 4C3 Tetrany, Figure 38	4	1200.0	11	Xenharmonikon
xen12-wilson-39-4C2-hexany-02	1-3-5-11 4C2 Hexany, Figure 39	6	1200.0	11	Xenharmonikon
xen12-wilson-39-4C2-hexany-07	1-5-7-11 4C2 Hexany, Figure 39	6	1200.0	11	Xenharmonikon
xen12-wilson-39-4C2-hexany-08	1-5-9-11 4C2 Hexany, Figure 39	6	1200.0	11	Xenharmonikon
xen12-wilson-39-4C2-hexany-11	3-5-7-11 4C2 Hexany, Figure 39	6	1200.0	11	Xenharmonikon
xen12-wilson-39-4C2-hexany-12	3-5-9-11 4C2 Hexany, Figure 39	6	1200.0	11	Xenharmonikon
xen12-wilson-39-4C2-hexany-14	5-7-9-11 4C2 Hexany, Figure 39	6	1200.0	11	Xenharmonikon
xen12-wilson-40-5C2-dekany-01	1-3-5-7-11 5C2 Dekany, Figure 40	10	1200.0	11	Xenharmonikon
xen12-wilson-40-5C2-dekany-02	1-3-5-9-11 5C2 Dekany, Figure 40	10	1200.0	11	Xenharmonikon
xen12-wilson-40-5C2-dekany-03	1-3-7-9-11 5C2 Dekany, Figure 40	10	1200.0	11	Xenharmonikon
xen12-wilson-40-5C2-dekany-04	1-5-7-9-11 5C2 Dekany, Figure 40	10	1200.0	11	Xenharmonikon
xen12-wilson-40-5C2-dekany-05	3-5-7-9-11 5C2 Dekany, Figure 40	10	1200.0	11	Xenharmonikon
xen12-wilson-40-5C3-dekany-01	1-3-5-7-11 5C3 Dekany, Figure 40	10	1200.0	11	Xenharmonikon
xen12-wilson-40-5C3-dekany-02	1-3-5-9-11 5C3 Dekany, Figure 40	10	1200.0	11	Xenharmonikon
xen12-wilson-40-5C3-dekany-03	1-3-7-9-11 5C3 Dekany, Figure 40	10	1200.0	11	Xenharmonikon
xen12-wilson-40-5C3-dekany-04	1-5-7-9-11 5C3 Dekany, Figure 40	10	1200.0	11	Xenharmonikon
xen12-wilson-40-5C3-dekany-05	3-5-7-9-11 5C3 Dekany, Figure 40	10	1200.0	11	Xenharmonikon
xen12-wilson-41-hexadic-tileburst-1	Four Hexadic Tilebursts, Figure 41, top left	16	1200.0	11	Xenharmonikon
xen12-wilson-41-hexadic-tileburst-2	Four Hexadic Tilebursts, Figure 41, top right	16	1200.0	11	Xenharmonikon
xen12-wilson-41-hexadic-tileburst-3	Four Hexadic Tilebursts, Figure 41, bottom left	16	1200.0	11	Xenharmonikon
xen12-wilson-41-hexadic-tileburst-4	Four Hexadic Tilebursts, Figure 41, bottom right	16	1200.0	11	Xenharmonikon
xen13-grady-19-2	19 tone scale 2	19	1200.0	11	Xenharmonikon
xen13-mclaren-prime-indices	Prime indices scale	12	1007.7	11	Xenharmonikon
xen15-chalmers-triadic-diamond-11-9	Triadic diamond for M=11/9, D=3/2	7	1200.0	11	Xenharmonikon
xen15-chalmers-triadic-diamond-11-9-tetrachord	Upper tetrachord 88/81 * 243/242 * 11/9 of triadic diamond for M=11/9, D=3/2	3	498.0	11	Xenharmonikon
xen15-chalmers-triadic-diamond-14-11	Triadic diamond for M=14/11, D=3/2	7	1200.0	11	Xenharmonikon
xen15-chalmers-triadic-diamond-14-11-tetrachord	Upper tetrachord 22/21 * 392/363 * 33/28 of triadic diamond for M=14/11, D=3/2	3	498.0	11	Xenharmonikon
xen15-chalmers-triadic-diamond-40-33	Triadic diamond for M=40/33, D=3/2	7	1200.0	11	Xenharmonikon
xen15-chalmers-triadic-diamond-40-33-tetrachord	Upper tetrachord 320/297 * 3267/3200 * 40/33 of triadic diamond for M=40/33, D=3/2	3	498.0	11	Xenharmonikon
xen15-chalmers-triadic-reversed-diamond-11-9	Triadic reversed diamond for M=11/9, D=3/2	7	1200.0	11	Xenharmonikon
xen15-chalmers-triadic-reversed-diamond-11-9-tetrachord	Tetrachord 12/11 * 121/108 * 12/11 of triadic reversed diamond for M=11/9, D=3/2	3	498.0	11	Xenharmonikon
xen15-chalmers-triadic-reversed-diamond-14-11	Triadic reversed diamond for M=14/11, D=3/2	7	1200.0	11	Xenharmonikon
xen15-chalmers-triadic-reversed-diamond-14-11-tetrachord	Tetrachord 22/21 * 147/121 * 22/21 of triadic reversed diamond for M=14/11, D=3/2	3	498.0	11	Xenharmonikon
xen15-chalmers-triadic-reversed-diamond-27-22	Triadic reversed diamond for M=27/22, D=3/2	7	1200.0	11	Xenharmonikon
xen15-chalmers-triadic-reversed-diamond-27-22-tetrachord	Tetrachord 88/81 * 2187/1936 * 88/81 of triadic reversed diamond for M=27/22, D=3/2	3	498.0	11	Xenharmonikon
xen15-chalmers-triadic-reversed-diamond-33-28	Triadic reversed diamond for M=33/28, D=3/2	7	1200.0	11	Xenharmonikon
xen15-chalmers-triadic-reversed-diamond-33-28-tetrachord	Tetrachord 112/99 * 3267/3136 * 112/99 of triadic reversed diamond for M=33/28, D=3/2	3	498.0	11	Xenharmonikon
xen15-chalmers-triadic-reversed-diamond-40-33	Triadic reversed diamond for M=40/33, D=3/2	7	1200.0	11	Xenharmonikon
xen15-chalmers-triadic-reversed-diamond-40-33-tetrachord	Tetrachord 11/10 * 400/363 * 11/10 of triadic reversed diamond for M=40/33, D=3/2	3	498.0	11	Xenharmonikon
xen15-gilson-ptolemy-chromatic-syntonon	Ptolemy's Chromatic Syntonon	7	1200.0	11	Xenharmonikon
xen15-gilson-ptolemy-diatonic-hemiolon	Ptolemy's Diatonic Hemiolon	7	1200.0	11	Xenharmonikon
xen18-ayers-table-12	5 Generalized Harmonic Means between 1/1 and 2/1	6	1200.0	11	Xenharmonikon
xen18-schulter-zalzal	Zalzal's scale	7	1200.0	11	Xenharmonikon