Combination product set: Difference between revisions
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A '''combination product set''' (CPS) is a scale generated by the following | A '''combination product set''' (CPS) is a scale (usually [[Just intonation|JI]]) generated by the following procedure: | ||
# A | # A list of chosen intervals (usually odd harmonics) is the starting point. | ||
# All the combinations of | # All the combinations of some number of distinct intervals from the list are obtained. The same number of intervals is used for every combination. | ||
# | # Each of the above combinations of intervals is stacked together into one interval. | ||
# The resulting | # This results in a list of notes. One note is chosen as the tonic. | ||
# The resulting intervals relative to the tonic are octave-reduced. | |||
== Example (hexany) == | CPSes are notable as ''every'' note of a CPS has a different JI chord on it. | ||
[[ | |||
A CPS is a subset of an iterated [[cross-set]] of a chord with itself. Specifically, a CPS of chord X is the subset of all elements of cross-set(X, cross-set(X, cross-set(..., cross-set(X, X)...))) that do not stack any ratio of X more than once. CPSes were developed by Erv Wilson. | |||
== Example (1, 3, 5, 7 hexany) == | |||
# In this example we choose four odd harmonics: 1, 3, 5, 7. | |||
# We get all combinations of 2 different odd harmonics: [1, 3], [1, 5], [1, 7], [3, 5], [3, 7], [5, 7]. | |||
# For each combination of intervals, stack the intervals together: 3, 5, 7, 15, 21, 35. | |||
# Choose 3 as the tonic. (This choice just amounts to choosing a mode of the final scale.) | |||
# Measure all the other notes relative to the chosen tonic: 1/1, 5/3, 7/3, 15/3 = 5/1, 21/3 = 7/1, 35/3. | |||
# Octave-reduce everything: 1/1, 5/3, 7/6, 5/4, 7/4, 35/24. | |||
This results in the 6-note scale [1/1, 7/6, 5/4, 35/24, 5/3, 7/4, 2/1], hence "hexany". | |||
== Types of CPSes == | |||
Common sizes for CPSes have specific names: | |||
# '''Hexany''': Choose 2 out of a list of 4 intervals | |||
#* '''Stellated hexany''': A hexany combined with combinations of 1 and combinations of 3 | |||
#* '''Bihexany''': Superimposition of two offset hexanies | |||
# '''Dekany''': Choose 2 (or 3) out of a list of 5 intervals | |||
# '''Pentadekany''': Choose 2 (or 4) out of a list of 6 intervals | |||
# '''Eikosany''': Choose 3 out of a list of 6 intervals, creating a 20-note scale | |||
== Playing with CPSes == | |||
ScaleWorkshop 3 allows you to make JI CPSes: | |||
# Go to https://scaleworkshop.plainsound.org | |||
# Click "New scale" | |||
# Select "Combination product set" | |||
== Music == | |||
* [https://youtu.be/62FggGa9bMg Eikosany Study - Daniel Corral (1 3 5 7 9 11 eikosany)] | |||
* [https://youtu.be/AWeFIOwGBh8 Nodial - Outward Once (an eikosany)] | |||
* [https://youtu.be/0n1AqB_SY7c Sevish - Murmurations (1 3 5 7 9 dekany)] | |||
* [https://youtu.be/5IyRbPr9QV0 dotuXil - waterpad (1 3 5 7 9 dekany)] | |||
{{Cat|Scale construction}} | |||
Latest revision as of 11:39, 31 January 2026
This is a problematic page or section. It lacks sufficient justification, content, or organization, and is subject to future overhaul or deletion.
This is an expert page. It either assumes experience with xen theory or involves fairly technical procedures.
A combination product set (CPS) is a scale (usually JI) generated by the following procedure:
- A list of chosen intervals (usually odd harmonics) is the starting point.
- All the combinations of some number of distinct intervals from the list are obtained. The same number of intervals is used for every combination.
- Each of the above combinations of intervals is stacked together into one interval.
- This results in a list of notes. One note is chosen as the tonic.
- The resulting intervals relative to the tonic are octave-reduced.
CPSes are notable as every note of a CPS has a different JI chord on it.
A CPS is a subset of an iterated cross-set of a chord with itself. Specifically, a CPS of chord X is the subset of all elements of cross-set(X, cross-set(X, cross-set(..., cross-set(X, X)...))) that do not stack any ratio of X more than once. CPSes were developed by Erv Wilson.
Example (1, 3, 5, 7 hexany)
- In this example we choose four odd harmonics: 1, 3, 5, 7.
- We get all combinations of 2 different odd harmonics: [1, 3], [1, 5], [1, 7], [3, 5], [3, 7], [5, 7].
- For each combination of intervals, stack the intervals together: 3, 5, 7, 15, 21, 35.
- Choose 3 as the tonic. (This choice just amounts to choosing a mode of the final scale.)
- Measure all the other notes relative to the chosen tonic: 1/1, 5/3, 7/3, 15/3 = 5/1, 21/3 = 7/1, 35/3.
- Octave-reduce everything: 1/1, 5/3, 7/6, 5/4, 7/4, 35/24.
This results in the 6-note scale [1/1, 7/6, 5/4, 35/24, 5/3, 7/4, 2/1], hence "hexany".
Types of CPSes
Common sizes for CPSes have specific names:
- Hexany: Choose 2 out of a list of 4 intervals
- Stellated hexany: A hexany combined with combinations of 1 and combinations of 3
- Bihexany: Superimposition of two offset hexanies
- Dekany: Choose 2 (or 3) out of a list of 5 intervals
- Pentadekany: Choose 2 (or 4) out of a list of 6 intervals
- Eikosany: Choose 3 out of a list of 6 intervals, creating a 20-note scale
Playing with CPSes
ScaleWorkshop 3 allows you to make JI CPSes:
- Go to https://scaleworkshop.plainsound.org
- Click "New scale"
- Select "Combination product set"
