|
|
| (19 intermediate revisions by 10 users not shown) |
| Line 4: |
Line 4: |
| | nSmallSteps = 2 | | | nSmallSteps = 2 |
| | Equalized = 1 | | | Equalized = 1 |
| | Paucitonic = 1 | | | Collapsed = 1 |
| | Pattern = LLsLLs | | | Pattern = LLsLLs |
| | | Name = citric |
| }} | | }} |
| There are three scales with this [[MOSScales|MOS]] pattern that are significant minima of harmonic entropy.
| | {{MOS intro}} |
|
| |
|
| The first is [[Chromatic_pairs#Antikythera|antikythera]], or no-3's [[Diaschismic_family|srutal/pajara]], which is srutal/pajara without any intervals containing 3 in their prime factorization, so it becomes a 2.5.9 or 2.5.7.9 subgroup temperament. This means that the generator is twice that of srutal/pajara (210-220 cents rather than 105-110), since odd numbers of generators are only needed for intervals with 3. So this is a basically "whole tone" scale, but made uneven so some 2-step intervals are 5/4 and others are 9/7. | | 4L 2s can be seen as a [[Warped diatonic|warped diatonic scale]], where one large step of diatonic (5L 2s) is removed, or as the equal-tempered whole-tone scale ([[6edo]]), but with two "whole tones" that are smaller than the others. |
| | |
| | Scales with the true MOS pattern are always [[Rothenberg propriety|proper]], because there is only one small step per period. In addition, there are near-MOS patterns, such as LLLsLs, in which the period is the only generic interval that has more than two specific representatives. The near-MOS is only proper if the generator is smaller than 2\10 of an octave (240{{c}}). |
| | |
| | == Name == |
| | [[TAMNAMS]] suggests the temperament-agnostic name '''citric''' for this scale. |
| | |
| | == Theory == |
| | === Low harmonic entropy scales === |
| | There are three scales with this [[MOS]] pattern that are significant minima of harmonic entropy. The first is [[antikythera]], or no-3's [[Diaschismic_family|srutal/pajara]], which is srutal/pajara without any intervals containing 3 in their prime factorization, so it becomes a 2.5.9 or 2.5.7.9 subgroup temperament. This means that the generator is twice that of srutal/pajara (210–220{{c}} rather than 105–110), since odd numbers of generators are only needed for intervals with 3. So this is a basically "whole tone" scale, but made uneven so some 2-step intervals are 5/4 and others are 9/7. |
|
| |
|
| The second is [[Dicot_family|decimal]], in which two generators make a 4/3, and the third is [[Jubilismic_clan|Doublewide]], in which the generator is 7/6 so the period minus the generator is 6/5. | | The second is [[Dicot_family|decimal]], in which two generators make a 4/3, and the third is [[Jubilismic_clan|Doublewide]], in which the generator is 7/6 so the period minus the generator is 6/5. |
|
| |
|
| In addition to the true MOS with pattern LLsLLs, all these scales also come in a near-MOS version, LLLsLs, in which the period is the only generic interval that has more than two specific representatives. The true MOS is always proper, but the near-MOS is only proper if the generator is smaller than 2\10 of an octave (240 cents).
| | == Scale properties == |
| | {{TAMNAMS use}} |
|
| |
|
| {| class="wikitable" | | === Intervals === |
| |-
| | {{MOS intervals}} |
| ! colspan="11" | Generator
| | |
| ! | Cents
| | === Generator chain === |
| ! | Comments
| | {{MOS genchain}} |
| |-
| | |
| | | 1\6
| | === Modes === |
| | |
| | {{MOS mode degrees}} |
| | |
| | |
| | |
| | == Scale tree == |
| | |
| | {{MOS tuning spectrum |
| | |
| | | 5/4 = Antikythera |
| | |
| | | 13/8 = Golden lemba |
| | |
| | | 7/4 = Lemba is around here |
| | |
| | | 2/1 = Optimum rank range |
| | |
| | | 6/1 = Doublewide is around here |
| | |
| | }} |
| | | 200
| |
| | style="text-align:center;" |
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 6\34
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 211.76
| |
| | style="text-align:center;" |
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 5\28
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 214.29
| |
| | style="text-align:center;" | Antikythera is around here
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | | 4\22
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 218.18
| |
| | style="text-align:center;" |
| |
| |-
| |
| | |
| |
| | |
| |
| | | 3\16
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 225
| |
| | style="text-align:center;" |
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 227.56
| |
| | |
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 8\42
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 228.57
| |
| | style="text-align:center;" |
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 600/(1+phi)
| |
| | style="text-align:center;" | Golden lemba
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 13\68
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 229.41
| |
| | style="text-align:center;" |
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | | 5\26
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 230.77
| |
| | style="text-align:center;" |
| |
| |- | |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 232.8
| |
| | |
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 7\36
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 233.33
| |
| | style="text-align:center;" | Lemba is around here
| |
| |-
| |
| | |
| |
| | | 2\10
| |
| | | | |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 240
| |
| | style="text-align:center;" | Boundary of propriety for near-MOS
| |
|
| |
|
| Optimum rank range (L/s=2/1) for MOS
| | [[Category:6-tone scales]] |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | | 5\24
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 250
| |
| | style="text-align:center;" | Decimal is around here
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 251.89
| |
| | |
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 8\38
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 252.63
| |
| | |
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 253.39
| |
| | style="text-align:center;" | <span style="display: block; text-align: center;">L/s = e</span>
| |
| |-
| |
| | |
| |
| | |
| |
| | | 3\14
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 257.14
| |
| | style="text-align:center;" | L/s = 3
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 258.81
| |
| | style="text-align:center;" | L/s = pi
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | | 4\18
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 266.67
| |
| | style="text-align:center;" | L/s = 4
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 5\22
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 272.73
| |
| | style="text-align:center;" |
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 6\26
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 276.92
| |
| | style="text-align:center;" |
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 7\30
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 280
| |
| | style="text-align:center;" |
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 8\34
| |
| | |
| |
| | |
| |
| | |
| |
| | | 282.35
| |
| | style="text-align:center;" |
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 9\38
| |
| | |
| |
| | |
| |
| | | 284.21
| |
| | style="text-align:center;" |
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 10\42
| |
| | |
| |
| | | 285.71
| |
| | style="text-align:center;" |
| |
| |-
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 11\46
| |
| | | 286.96
| |
| | style="text-align:center;" | Doublewide is around here
| |
| |-
| |
| | | 1\4
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | |
| |
| | | 300
| |
| | style="text-align:center;" |
| |
| |}
| |