Step ratio: Difference between revisions

Part of this perception stems from the fact that, as these L:s ratios change and pass certain critical rational values, the ''next'' MOS in the sequence changes structure entirely. For instance, when we have L:s > 2, the next MOS changes from "''x''L ''y''s" to "''y''L ''x''s". As an example, with the "5L 2s" diatonic MOS, if we have L/s < 2, the next MOS will be "7L 5s", and if we have L/s > 2, the next MOS will be "5L 7s". (At the point L/s = 2, we have that the next MOS is an equal temperament.)

Similar things happen with ''all'' of these rational points. As the L:s ratio decreases and passes 3/2, for instance, the MOS that is ''two'' steps after the current one changes. Again, as an example, with the familiar 5L 2s diatonic MOS sequence, if we have 3:2 < L:s < 2:1, the next two MOS's have 19 and 31 notes, whereas if we have L:s < 3:2, the next two MOS's have 19 and 26 notes.

Another way to look at this is using [[Rothenberg propriety]]: it so happens that, with one small exception, if a MOS has L:s < 2:1, it is "strictly proper", if it has L:s > 2:1, it is "improper", and if it has L:s = 2:1, it is "proper", all using Rothenberg's definition. The one exception is if the MOS has a single small step (e.g. it is of the form ''x''L 1s), at which point it is always "strictly proper". Similarly we pass the L:s = 3:2 boundary, the ''next'' MOS changes from strictly proper to improper, and so on.

The special ratio L:s = φ is unique in that it is the only ratio in which the MOS is strictly proper, and all of the following MOS's are also strictly proper.

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