@@ Line 1: / Line 1: @@
-ABACABA is the singular pairwise well-formed generalised step pattern, and the (4, 2, 1) [[SN scale|SNS]] pattern. Scales with this step pattern are known as Cantor-2 scales. Such scales can be thought of as mirror-symmetrical tetrachordal scales. As [[step-nested scales]], all ABACABA scales can be described as SNS (P, P/T, A), or equivalently as SNS (P, T, A), where P is the period, and T = ABA, the outer interval of the tetrachord.
+ABACABA is the ternary [[Fraenkel word]], or the rank-3 power SNS, i.e., the (4, 2, 1) [[SN scale|SNS]] pattern, and the singular [[Rank-3 scale#Pairwise well-formed scales|pairwise well-formed]] generalized step pattern. Such scales can be thought of as mirror-symmetric ([[Chirality|achiral]]) tetrachordal scales. As [[step-nested scales]], all ABACABA scales can be described as SNS (P, P/T, T/A), or equivalently as SNS (P, T, A) etc., where P is the period, and T = ABA, the outer interval of the tetrachord. When they span a 2/1 period (P=2), scales with this step pattern are known as Cantor-2 scales.
 == 225-limit ABACABA scales with period 2/1, with steps > 20c ==
 is chosen as the [[odd-limit]] so that the list includes all ABACABA scales with complexity up to that of the [[5-limit]] double harmonic major scale — [[SNS (2/1, 3/2, 5/4)-7|16/15 5/4 4/3 3/2 8/5 15/8 2/1]] — and a lower limit of 20c for step sizes is chosen so that there are no steps smaller than [[81/80]]. For ABACABA scales, 225-odd-limit implies 13-limit.
@@ Line 1,432: / Line 1,432: @@
 |23/22
 |550/529
-|1/1 23/22 25/23 25/22 44/24 46/25 44/23 2/1
+|1/1 23/22 25/23 25/22 44/25 46/25 44/23 2/1
 |625
 |}
@@ Line 1,633: / Line 1,633: @@
 == 729-limit ABACABA scales with period 3/2, with steps > 20c ==
-Given the scales repeat at 3/2, factors of 3 in the odd-limit vary with transposition by a period. Accordingly the odd-limit listed is the odd-limit for intervals in a single period of the scale.
+Given the scales repeat at 3/2, factors of 3 in the odd-limit vary with transposition by a period. Accordingly the odd-limit listed is the odd-limit for intervals in a single period of the scale. There are no 729-limit ABACABA scales with period 3/2, with steps > 20c. The list has an effective odd-limit of 675.
-=== Tetrachord to 6/5 -> C = 25/24 (~70.67c) ===
+=== Tetrachord to 9/8 -> C = 32/27 (~294.13c) ===
 {| class="wikitable"
 |+
@@ Line 1,641: / Line 1,641: @@
 !B
 !Scale
-!no-3 odd-limit of scale intervals
+!odd-limit of scale intervals
 |-
 |21/20 (~84.47c)
-|160/147 (~146.71c)
+|50/49 (~34.98c)
-|1/1 21/20 8/7 6/5 5/4 21/16 10/7 3/2
+|1/1 21/20 15/14 9/8 4/3 7/5 10/7 2/1
 |147
 |-
-|24/23 (~73.68c)
+|27/26 (~65.34c)
-|529/480 (~168.28c)
+|169/162 (~73.24c)
-|1/1 24/23 23/20 6/5 5/4 30/23 23/16 3/2
+|1/1 27/26 13/12 9/8 4/3 18/13 13/9 3/2
-|529
+|243
 |-
-|27/25 (~133.24c)
+|25/24 (~70.67c)
-|250/243 (~49.17c)
+|648/625 (~62.57c)
-|1/1 27/25 10/9 6/5 5/4 27/20 25/18 3/2
+|1/1 25/24 27/25 9/8 4/3 25/18 36/25 3/2
 |625
-|-
-|16/15 (~111.73c)
-|135/128 (~92.18c)
-|1/1 16/15 9/8 6/5 5/4 4/3 45/32 3/2
-|675
-|-
-|18/17 (~98.95c)
-|289/270 (~117.73c)
-|1/1 18/17 17/15 6/5 5/4 45/34 17/12 3/2
-|675
 |}
-=== Tetrachord to 7/6 -> C = 54/49 (~168.21c) ===
+=== Tetrachord to 17/14 -> C = 294/289 (~29.70c) ===
 {| class="wikitable"
 |+
@@ Line 1,677: / Line 1,667: @@
 !odd-limit of scale intervals
 |-
-|21/20 (~84.47c)
+|17/16 (~104.96c)
-|200/189 (~97.94c)
+|128/117 (~115.56c)
-|1/1 21/20 10/9 7/6 9/7 27/20 10/7 3/2
+|1/1 17/16 8/7 17/14 28/17 21/16 24/17 3/2
-|243
+|357
+|-
+|15/14 (~119.44c)
+|238/225 (~97.24c)
+|1/1 15/14 17/15 17/14 28/17 45/34 7/5 3/2
+|675
+|}
+=== Tetrachord to 7/6 -> C = 54/49 (~168.21c) ===
+{| class="wikitable"
+|+
+!A
+!B
+!Scale
+!odd-limit of scale intervals
 |-
 |19/18 (~93.60c)
@@ Line 1,687: / Line 1,691: @@
 |361
 |-
-|28/27 (~62.96c)
+|21/20 (~84.47c)
-|243/224 (~140.95c)
+|200/189 (~97.94c)
-|1/1 28/27 9/8 7/6 9/7 16/9 27/14 3/2
+|1/1 21/20 10/9 7/6 9/7 27/20 10/7 3/2
-|729
+|567
 |}
-=== Tetrachord to 9/8 -> C = 32/27 ===
+=== Tetrachord to 19/16 -> C = 384/361 (~106.93c) ===
 {| class="wikitable"
 |+
@@ Line 1,701: / Line 1,705: @@
 !odd-limit of scale intervals
 |-
-|27/26
+|19/18 (~93.60c)
-|169/162
+|81/76 (~110.31c)
-|1/1 27/26 13/12 9/8 4/3 18/13 13/9 3/2
+|1/1 19/18 9/8 19/16 24/19 4/3 27/19 3/2
-|351
+|361
+|}
+=== Tetrachord to 6/5 -> C = 25/24 (~70.67c) ===
+{| class="wikitable"
+|+
+!A
+!B
+!Scale
+!odd-limit of scale intervals
+|-
+|21/20 (~84.47c)
+|160/147 (~146.71c)
+|1/1 21/20 8/7 6/5 5/4 21/16 10/7 3/2
+|441
+|-
+|24/23 (~73.68c)
+|529/480 (~168.28c)
+|1/1 24/23 23/20 6/5 5/4 30/23 23/16 3/2
+|529
+|-
+|16/15 (~111.73c)
+|135/128 (~92.18c)
+|1/1 16/15 9/8 6/5 5/4 4/3 45/32 3/2
+|675
+|-
+|18/17 (~98.95c)
+|289/270 (~117.73c)
+|1/1 18/17 17/15 6/5 5/4 45/34 17/12 3/2
+|675
 |-
-|25/24
+|27/25 (~133.24c)
-|648/625
+|250/243 (~49.17c)
-|1/1 25/24 27/25 9/8 4/3 25/18 3/2  36/25 3/2
+|1/1 27/25 10/9 6/5 5/4 27/20 25/18 3/2
+|729
+|}
+=== Tetrachord to 27/23 -> C = 529/486 (~146.77c) ===
+{| class="wikitable"
+|+
+!A
+!B
+!Scale
+!odd-limit of scale intervals
+|-
+|24/23 (~73.68c)
+|69/64 (~130.23c)
+|1/1 24/23 9/8 27/23 23/18 4/3 23/16 3/2
+|529
+|}
+=== Tetrachord to 23/20 -> C = 600/529 (~218.03c) ===
+{| class="wikitable"
+|+
+!A
+!B
+!Scale
+!odd-limit of scale intervals
+|-
+|23/22 (~76.96c)
+|121/115 (~88.05c)
+|1/1 23/22 11/10 23/20 30/23 15/11 33/23 3/2
+|529
+|}
+=== Tetrachord to 25/22 -> C = 726/625 (~259.34c) ===
+{| class="wikitable"
+|+
+!A
+!B
+!Scale
+!odd-limit of scale intervals
+|-
+|25/24 (~70.67c)
+|288/275 (~79.96c)
+|1/1 25/24 12/11 25/22 33/25 11/8 36/25 3/2
+|625
+|}
+=== Tetrachord to 10/9 -> C = 243/200 (~337.15c) ===
+{| class="wikitable"
+|+
+!A
+!B
+!Scale
+!odd-limit of scale intervals
+|-
+|25/24 (~70.67c)
+|128/125 (~41.06c)
+|1/1 25/24 16/15 10/9 27/20 45/32 36/25 3/2
+|675
+|}
+=== Tetrachord to 15/13 -> C = 169/150 (~206.47c) ===
+{| class="wikitable"
+|+
+!A
+!B
+!Scale
+!odd-limit of scale intervals
+|-
+|27/26 (~65.34c)
+|260/243 (~117.07c)
+|1/1 27/26 10/9 15/13 39/30 27/20 13/9 3/2
+|729
+|}
+== 729-limit ABACABA scales with period 4/3, with steps > 20c ==
+/1 period scales with two periods of these ABACABA scales and a remaining interval of 9/8 may be built, akin to octave species scales built of two copies of a tetrachord (with a 9/8 remainder). The remaining 9/8 interval may be filled in a number of different ways. There are no 729-limit ABACABA scales with period 4/3, with steps > 20c. The list has an effective odd-limit of 675.
+=== Tetrachord to 8/7 -> C = 49/48 (~35.70c) ===
+{| class="wikitable"
+|+
+!A
+!B
+!Scale
+!odd-limit of scale intervals
+|-
+|22/21 (~80.54c)
+|126/121 (~70.10c)
+|1/1 22/21 12/11 8/7 7/6 11/9 14/11 4/3
+|189
+|-
+|24/23 (~73.68c)
+|529/504 (~83.81c)
+|1/1 24/23 23/21 8/7 7/6 28/23 23/18 4/3
+|529
+|}
+=== Tetrachord to 26/23 -> C = 529/507 (~73.54c)===
+{| class="wikitable"
+|+
+!A
+!B
+!Scale
+!odd-limit of scale intervals
+|-
+|24/23 (~73.68c)
+|299/288 (~64.89c)
+|1/1 24/23 13/12 26/23 46/39 16/13 23/18 4/3
+|529
+|}
+=== Tetrachord to 10/9 -> C = 27/25 (~133.24c) ===
+{| class="wikitable"
+|+
+!A
+!B
+!Scale
+!odd-limit of scale intervals
+|-
+|25/24 (~70.67c)
+|128/125 (~41.06c)
+|1/1 25/24 16/15 10/9 6/5 5/4 32/25 4/3
+|625
+|}
+=== Tetrachord to 28/25 -> C = 625/588 (~105.65c) ===
+{| class="wikitable"
+|+
+!A
+!B
+!Scale
+!odd-limit of scale intervals
+|-
+|26/25 (~67.90c)
+|175/169 (~60.40c)
+|1/1 26/25 14/13 28/25 25/21 26/21 50/39 4/3
 |625
 |}
+{{Navbox scale gallery}}
 [[Category: Just intonation scales]]
 [[Category: Step-nested scales]]
+[[Category:Wakalixes]]
+[[Category:Lists of scales]]

ABACABA JI scales: Difference between revisions