Consistency: Difference between revisions

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An edo, say N-edo, represents the q-[[odd limit]] '''consistently''' if the best approximations of the odd harmonics of the q-odd limit in that edo also give the best approximations of all the ratios between these odd harmonics. This word can actually be used for any set of odd harmonics~~, such as~~ no-5's 13-odd limit.

An edo, say N-edo, represents the q-[[odd limit]] '''consistently''' if the best approximations of the odd harmonics of the q-odd limit in that edo also give the best approximations of all the ratios between these odd harmonics. This word can actually be used for any set of odd harmonics: e.g. [[17edo]] is consistent on the no-5's 13-odd limit.

Stated more mathematically, if N-edo is an [[EDO|equal division of the octave]], and if for any interval r, N(r) is the best N-edo approximation to r, then N is '''consistent''' with respect to a set of intervals S if for any two intervals a and b in S where ab is also in S, N(ab) = N(a) + N(b). Normally this is considered when S is the set of [[Odd_limit|q odd limit intervals]], consisting of everything of the form 2^n u/v, where u and v are odd integers less than or equal to q. N is then said to be ''q limit consistent''. If each interval in the q-limit is mapped to a unique value by N, then it said to be ''uniquely q limit consistent''.

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-An edo, say N-edo, represents the q-[[odd limit]] '''consistently''' if the best approximations of the odd harmonics of the q-odd limit in that edo also give the best approximations of all the ratios between these odd harmonics. This word can actually be used for any set of odd harmonics, such as no-5's 13-odd limit.
+An edo, say N-edo, represents the q-[[odd limit]] '''consistently''' if the best approximations of the odd harmonics of the q-odd limit in that edo also give the best approximations of all the ratios between these odd harmonics. This word can actually be used for any set of odd harmonics: e.g. [[17edo]] is consistent on the no-5's 13-odd limit.
 Stated more mathematically, if N-edo is an [[EDO|equal division of the octave]], and if for any interval r, N(r) is the best N-edo approximation to r, then N is '''consistent''' with respect to a set of intervals S if for any two intervals a and b in S where ab is also in S, N(ab) = N(a) + N(b). Normally this is considered when S is the set of [[Odd_limit|q odd limit intervals]], consisting of everything of the form 2^n u/v, where u and v are odd integers less than or equal to q. N is then said to be ''q limit consistent''. If each interval in the q-limit is mapped to a unique value by N, then it said to be ''uniquely q limit consistent''.