AFS: Difference between revisions

An AFS, or arithmetic frequency sequence, is a kind of arithmetic and harmonotonic tuning.

Its full specification is (n-)AFSp: (n pitches of an) arithmetic frequency sequence adding by (irrtional) interval p. The only difference between an OS (overtone sequence) and AFS is that for OS the p is rational.

The n is optional. If not provided, the sequence is open-ended. By specifying n, your sequence will be equivalent to some EFD (equal frequency division). Specifically, n-EFDp = n-AFS((p-1)/n).

The analogous utonal equivalent of an AFS is an ALS (arithmetic length sequence).

An AFS could also be described as a shifted overtone series (± frequency).

OS and AFS are equivalent to taking an overtone series and adding (or subtracting) a constant amount of frequency. By doing this, the step sizes remain equal in frequency, but their relationship in pitch changes. For a detailed explanation of this, see the later section on the derivation of OS.

Examples

If we wanted to move by steps of φ, like this: [math]\displaystyle{ 1, 1+φ, 1+2φ, 1+3φ... }[/math] etc. we could have the AFSφ.

Here's another example: