ALS: Difference between revisions
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An '''ALS''', or '''arithmetic length sequence''', is a kind of [[Arithmetic tunings|arithmetic]] and [[ | An '''ALS''', or '''arithmetic length sequence''', is a kind of [[Arithmetic tunings|arithmetic]] and [[Harmonotonic tunings|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 <span><math>k</math></span> of an ALSp is: | |||
<math> | |||
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|AFS (arithmetic frequency sequence)]]. | |||
=== Vs. US === | |||
A [[US|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|ELD (equal length division)]]; specifically n-ALSp = n-ELD((p-1)/n). | |||
== Examples == | |||
{| class="wikitable" | |||
|+example: (1/⁴√2)-shifted undertone series segment = 8-ALS(1/⁴√2) | |||
''(arranged so that the pitches are in ascending order and still begin on 1/1)'' | |||
|- | |||
! 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 (log₂''f'', 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 | |||
|} | |||
{| class="wikitable" | |||
|+example: (1/⁴√2)-shifted undertone series segment = 8-ALS(1/⁴√2) | |||
''(descending pitches)'' | |||
|- | |||
! 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 (log₂''f'', 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 | |||
|} | |||
[[Category:Subharmonic]] | |||
[[Category:Subharmonic series]] | |||
[[Category:Utonality]] | |||
[[Category:Xenharmonic series]] | |||