Eigenmonzo

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Revision as of 23:04, 25 May 2021 by Cmloegcmluin (talk | contribs) (seems like some potentially critical information about eigenmonzos is only found on this eigenmonzo subgroup page, so at least linking it for now)

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An eigenmonzo is (the monzo representation of) a JI interval that can be generated exactly in a concrete tuning of a temperament.

For example, in quarter-comma meantone, the generator is 5^(1/4), so the eigenmonzo here is [0 0 1⟩. For any pure-octave temperament tuning, [1⟩, aka 2/1, is an eigenmonzo.

See also

fractional monzo: for more mathematical information
eigenmonzo subgroup

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