Chirality: Difference between revisions
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== Chirality in MV3 scales == | == Chirality in MV3 scales == | ||
Assume a scale is [[MV3]] and is of the form ax by bz. Additionally assume that the mos ax 2bY is not a multimos. Then the scale must be chiral because there are no rotations that will make the two equivalent (each mode of the mos ax 2bY corresponding to two chiral variants). This is how to determine the handedness of the scale: | Assume a scale is [[MV3]] and is of the form ax by bz. Additionally assume that the mos ax 2bY that results from equating y and z is not a multimos. Then the scale must be chiral because there are no rotations that will make the two equivalent (each mode of the mos ax 2bY corresponding to two chiral variants). This is how to determine the handedness of the scale: | ||
# Identify y and z to Y to get a mos. Take the mode that has the most x's at the beginning. When you undo the identification, the mv3 mode will start with either y or z first. | # Identify y and z to Y to get a mos. Take the mode that has the most x's at the beginning. When you undo the identification, the mv3 mode will start with either y or z first. | ||
# If y is bigger than z then the chiral variant beginning with y is ''right-handed''. Otherwise, it is ''left-handed''. | # If y is bigger than z then the chiral variant beginning with y is ''right-handed''. Otherwise, it is ''left-handed''. | ||
Revision as of 18:04, 18 July 2021
A scale is called chiral if reversing the order of the steps results in a different scale. The two scales form a chiral pair and are right/left-handed. Handedness is determined by writing both scales in their canonical mode[clarification needed] and then comparing the size of both. The smallest example of a chiral pair in an EDO is 321/312, with the former being right-handed and the latter being left-handed.
Scales for which this property does not hold are called achiral. For example, the diatonic scale is achiral because 2221221 reverses to 1221222, which is identical to the original scale up to cyclical permutation.
Properties
- Chiral scales can only exist in EDO's larger than 5-EDO
- Chiral scales are at least max-variety 3 (they cannot be MOS or DE)
- Chiral scales have at least 3 notes
- Chiral scales have a density of 1 (see table below)
| EDO | Number of Chiral Scales |
Percentage of Chiral Scales |
Corresponding Ratio |
|---|---|---|---|
| 1 | 0 | 0.0% | 0/1 |
| 2 | 0 | 0.0% | 0/1 |
| 3 | 0 | 0.0% | 0/1 |
| 4 | 0 | 0.0% | 0/1 |
| 5 | 0 | 0.0% | 0/1 |
| 6 | 2 | 22.2% | 2/9 |
| 7 | 4 | 22.2% | 2/9 |
| 8 | 12 | 40.0% | 2/5 |
| 9 | 28 | 50.0% | 1/2 |
| 10 | 60 | 60.6% | 20/33 |
| 11 | 124 | 66.7% | 2/3 |
| 12 | 254 | 75.8% | 254/335 |
| 13 | 504 | 80.0% | 4/5 |
| 14 | 986 | 84.9% | 986/1161 |
| 15 | 1936 | 88.7% | 968/1091 |
| 16 | 3720 | 91.2% | 31/34 |
| 17 | 7200 | 93.4% | 240/257 |
| 18 | 13804 | 95.0% | 493/519 |
| 19 | 26572 | 96.3% | 26/27 |
| 20 | 50892 | 97.2% | 16964/17459 |
Chirality in MV3 scales
Assume a scale is MV3 and is of the form ax by bz. Additionally assume that the mos ax 2bY that results from equating y and z is not a multimos. Then the scale must be chiral because there are no rotations that will make the two equivalent (each mode of the mos ax 2bY corresponding to two chiral variants). This is how to determine the handedness of the scale:
- Identify y and z to Y to get a mos. Take the mode that has the most x's at the beginning. When you undo the identification, the mv3 mode will start with either y or z first.
- If y is bigger than z then the chiral variant beginning with y is right-handed. Otherwise, it is left-handed.
Such chiral mv3's could be named in the format [handedness] [mv3 name] [the corresponding mode of ax 2bY]. For example, the chiral diasem mode 331323132 can be named "Left-Handed Diasem 8|0", where 8|0 is the UDP notation for the 5L 4s mode LLSLSLSLS.