Just intonation subgroup: Difference between revisions

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A '''just intonation subgroup''' is a {{w|Free abelian group|group}} generated by a finite set of positive rational numbers via arbitrary multiplications and divisions. Using subgroups implies a way to organize [[just intonation]] intervals such that they form a lattice. Therefore it is closely related to [[regular temperament theory]].

Just intonation subgroups can be described by listing their [[generator]]s with dots between them. In standard mathematical notation, if ''p''1, ..., ''p''''r'' are distinct primes and ''a''''k'' the musical interval of log2(''p''''k'') octaves, then

Just intonation subgroups can be described by listing their [[generator]]s with dots between them. In standard mathematical notation, if ''p''1, ..., ''p''''r'' are distinct primes and ''v''''k'' the musical interval of log2(''p''''k'') octaves, then

<math>p_1.p_2.\cdots.p_r := \operatorname{span}_\mathbb{Z} \{~~a_1~~, ..., ~~a_k~~\}.</math>

<math>p_1.p_2.\cdots.p_r := \operatorname{span}_\mathbb{Z} \{v_1, ..., v_k\}.</math>

This naming convention is employed below.

@@ Line 7: / Line 7: @@
 A '''just intonation subgroup''' is a {{w|Free abelian group|group}} generated by a finite set of positive rational numbers via arbitrary multiplications and divisions. Using subgroups implies a way to organize [[just intonation]] intervals such that they form a lattice. Therefore it is closely related to [[regular temperament theory]].
-Just intonation subgroups can be described by listing their [[generator]]s with dots between them. In standard mathematical notation, if ''p''<sub>1</sub>, ..., ''p''<sub>''r''</sub> are distinct primes and ''a''<sub>''k''</sub> the musical interval of log<sub>2</sub>(''p''<sub>''k''</sub>) octaves, then
+Just intonation subgroups can be described by listing their [[generator]]s with dots between them. In standard mathematical notation, if ''p''<sub>1</sub>, ..., ''p''<sub>''r''</sub> are distinct primes and ''v''<sub>''k''</sub> the musical interval of log<sub>2</sub>(''p''<sub>''k''</sub>) octaves, then
-<math>p_1.p_2.\cdots.p_r := \operatorname{span}_\mathbb{Z} \{a_1, ..., a_k\}.</math>
+<math>p_1.p_2.\cdots.p_r := \operatorname{span}_\mathbb{Z} \{v_1, ..., v_k\}.</math>
 This naming convention is employed below.