ALS: Difference between revisions
Cmloegcmluin (talk | contribs) break up wall of information into helpful sections that are consistent across all arithmetic tuning pages |
Cmloegcmluin (talk | contribs) →Examples: update row headers per agreement at https://en.xen.wiki/w/Talk:APS |
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== Relationship to other tunings == | == Relationship to other tunings == | ||
=== | === As shifted undertone series === | ||
By varying the undertone series step size to some | By varying the undertone series step size to some number other than 1, if that number is irrational you can produce an ALS, and if rational you can produce a US (which you could also call an ALS if you really wanted to). In other words, by shifting the undertone series by a constant amount of string length, the step sizes remain equal in terms of length, but their relationship in pitch changes. | ||
=== | === Vs. AFS === | ||
The analogous otonal equivalent of an ALS is an [[AFS|AFS (arithmetic frequency sequence)]]. | The analogous otonal equivalent of an ALS is an [[AFS|AFS (arithmetic frequency sequence)]]. | ||
=== | === Vs. US === | ||
A [[US|US, or utonal sequence]], is the | A [[US|US, or utonal sequence]], is the rational version of an ALS. | ||
=== | === Vs. ELD === | ||
By specifying n, your sequence will be equivalent to some [[ELD|ELD (equal length division)]]; specifically n-ALSp = n-ELD((p-1)/n). | By specifying n, your sequence will be equivalent to one period of some [[ELD|ELD (equal length division)]]; specifically n-ALSp = n-ELD((p-1)/n). | ||
== Examples == | == Examples == | ||
| Line 52: | Line 52: | ||
! 8 | ! 8 | ||
|- | |- | ||
! frequency (f) | ! frequency (''f'', ratio) | ||
|(1) | |(1) | ||
|1.12 | |1.12 | ||
| Line 63: | Line 63: | ||
|7.73 | |7.73 | ||
|- | |- | ||
! pitch ( | ! pitch (log₂''f'', octaves) | ||
|(0) | |(0) | ||
|0.17 | |0.17 | ||
| Line 74: | Line 74: | ||
|2.95 | |2.95 | ||
|- | |- | ||
! length (1/f) | ! length (1/''f'', ratio) | ||
|(1) | |(1) | ||
|0.89 | |0.89 | ||
| Line 101: | Line 101: | ||
! 8 | ! 8 | ||
|- | |- | ||
! frequency (f) | ! frequency (''f'', ratio) | ||
|(1) | |(1) | ||
|0.54 | |0.54 | ||
| Line 112: | Line 112: | ||
|0.13 | |0.13 | ||
|- | |- | ||
! pitch ( | ! pitch (log₂''f'', octaves) | ||
|(0) | |(0) | ||
| -0.88 | | -0.88 | ||
| Line 123: | Line 123: | ||
| -2.95 | | -2.95 | ||
|- | |- | ||
! length (1/f) | ! length (1/''f'', ratio) | ||
|(1 + 0/⁴√2) | |(1 + 0/⁴√2) | ||
|1 + 1/⁴√2 | |1 + 1/⁴√2 | ||
| Line 135: | Line 135: | ||
|} | |} | ||
[[Category:Subharmonic]] | [[Category:Subharmonic]] | ||
[[Category:Subharmonic series]] | [[Category:Subharmonic series]] | ||
[[Category:Utonality]] | |||
[[Category:Xenharmonic series]] | |||
Latest revision as of 20:37, 19 October 2023
An ALS, or arithmetic length sequence, is a kind of arithmetic and harmonotonic tuning.
Specification
Is full specification is (n-)ALSp: (n pitches of an) arithmetic length sequence adding by p. It is equivalent to an undertone series shifted ± frequency. The n is optional. If not provided, the sequence is open-ended.
Formula
The formula for length [math]\displaystyle{ k }[/math] of an ALSp is:
[math]\displaystyle{ L(k) = 1 + k⋅p }[/math]
Tip about tunings based on length
Note that because frequency is the inverse of length, if a frequency lower than the root pitch's frequency is asked for, the length will be greater than 1; at this point the physical analogy to a length of string breaks down somewhat, since it is not easy to imagine dynamically extending the length of a string to accommodate such pitches. However, it is not much of a stretch (pun intended) to tolerate lengths > 1, if the analogy is adapted to a switching from one string to another, and any string length imaginable is instantly available.
Relationship to other tunings
As shifted undertone series
By varying the undertone series step size to some number other than 1, if that number is irrational you can produce an ALS, and if rational you can produce a US (which you could also call an ALS if you really wanted to). In other words, by shifting the undertone series by a constant amount of string length, the step sizes remain equal in terms of length, but their relationship in pitch changes.
Vs. AFS
The analogous otonal equivalent of an ALS is an AFS (arithmetic frequency sequence).
Vs. US
A US, or utonal sequence, is the rational version of an ALS.
Vs. ELD
By specifying n, your sequence will be equivalent to one period of some ELD (equal length division); specifically n-ALSp = n-ELD((p-1)/n).
Examples
| quantity | (0) | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 |
|---|---|---|---|---|---|---|---|---|---|
| frequency (f, ratio) | (1) | 1.12 | 1.28 | 1.48 | 1.77 | 2.19 | 2.88 | 4.20 | 7.73 |
| pitch (log₂f, octaves) | (0) | 0.17 | 0.35 | 0.57 | 0.82 | 1.13 | 1.53 | 2.07 | 2.95 |
| length (1/f, ratio) | (1) | 0.89 | 0.78 | 0.67 | 0.56 | 0.46 | 0.35 | 0.24 | 0.13 |
| quantity | (0) | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 |
|---|---|---|---|---|---|---|---|---|---|
| frequency (f, ratio) | (1) | 0.54 | 0.37 | 0.28 | 0.23 | 0.19 | 0.17 | 0.15 | 0.13 |
| pitch (log₂f, octaves) | (0) | -0.88 | -1.42 | -1.82 | -2.13 | -2.38 | -2.60 | -2.78 | -2.95 |
| length (1/f, ratio) | (1 + 0/⁴√2) | 1 + 1/⁴√2 | 1 + 2/⁴√2 | 1 + 3/⁴√2 | 1 + 4/⁴√2 | 1 + 5/⁴√2 | 1 + 6/⁴√2 | 1 + 7/⁴√2 | 1 + 8/⁴√2 |