Mapped interval: Difference between revisions
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A '''mapped interval''' is an [[interval]] that has been mapped by a [[mapping]] matrix for a [[regular temperament]]. | A '''mapped interval''' is an [[interval]] that has been mapped by a [[mapping]] matrix for a [[regular temperament]]. | ||
For example, if we begin with an unmapped, [[JI]] interval <math>\frac{10}{9}</math> with [[prime-count vector]] <math>\textbf{i} =</math> {{ket|1 -2 1}}, the mapped interval ~<math>\frac{10}{9}</math> under [[meantone temperament]] {{rket|{{bra|1 1 0}} {{bra|0 1 4}}}} would have [[generator-count vector]] <math>\textbf{y} =</math> {{rket|{{bra|1 1 0}} {{bra|0 1 4}}}}{{ket|1 -2 1}} = {{rket|-3 2}}. | For example, if we begin with an unmapped, [[JI]] interval <math>\frac{10}{9}</math> with [[prime-count vector]] (or "[[monzo]]") <math>\textbf{i} =</math> {{ket|1 -2 1}}, the mapped interval ~<math>\frac{10}{9}</math> under [[meantone temperament]] {{rket|{{bra|1 1 0}} {{bra|0 1 4}}}} would have [[generator-count vector]] (or "[[tmonzo]]") <math>\textbf{y} =</math> {{rket|{{bra|1 1 0}} {{bra|0 1 4}}}}{{ket|1 -2 1}} = {{rket|-3 2}}. | ||
Note that we've notated the mapped interval with a tilde, <span style="background-color: yellow">~</span><math>\frac{10}{9}</math>, to indicate that its size is now approximate. | Note that we've notated the mapped interval with a tilde, <span style="background-color: yellow">~</span><math>\frac{10}{9}</math>, to indicate that its size is now approximate. | ||
Revision as of 00:26, 15 December 2022
A mapped interval is an interval that has been mapped by a mapping matrix for a regular temperament.
For example, if we begin with an unmapped, JI interval [math]\displaystyle{ \frac{10}{9} }[/math] with prime-count vector (or "monzo") [math]\displaystyle{ \textbf{i} = }[/math] [1 -2 1⟩, the mapped interval ~[math]\displaystyle{ \frac{10}{9} }[/math] under meantone temperament [⟨1 1 0] ⟨0 1 4]} would have generator-count vector (or "tmonzo") [math]\displaystyle{ \textbf{y} = }[/math] [⟨1 1 0] ⟨0 1 4]}[1 -2 1⟩ = [-3 2}.
Note that we've notated the mapped interval with a tilde, ~[math]\displaystyle{ \frac{10}{9} }[/math], to indicate that its size is now approximate.
Here are several mnemonics for the use of [math]\displaystyle{ \textbf{y} }[/math] as the symbol for mapped intervals:
- The letter 'y' is linguistically similar to the letter 'i', the obvious letter for (just) intervals.
- Visually, a 'Y' also looks like a diagram showing — from the top — two just intervals getting mapped to the same size.
- A 'y' also looks like a 'g', which is fitting because [math]\displaystyle{ \mathbf{y} }[/math] is a generator-count vector, associated with the generator tuning map [math]\displaystyle{ 𝒈 }[/math], in the sense that intervals are associated with (tempered-prime) tuning maps [math]\displaystyle{ 𝒕 }[/math], or in other words, [math]\displaystyle{ 𝒕\textbf{i} = 𝒈\textbf{y} }[/math].
See also
- Dave Keenan & Douglas Blumeyer's guide to RTT: tuning fundamentals#The RTT version: another take at explaining mapped intervals
- Tmonzos and tvals: a more mathematical explanation