Mavila
- This page is about the regular temperament. For the scale structure sometimes associated with it, see 7L 2s.
Mavila is an extremely important temperament. It was first discovered by Erv Wilson, possibly in 1989[1], after studying the tuning of the timbila music of the Chopi tribe in Mozambique.
See Pelogic family #Mavila for more technical data.
Inverted major and minor intervals: the antidiatonic scale
In mavila, the comma 135/128 vanishes, rather than 81/80. As a result, the fifths are very flat (~675-680 cents or so), flatter than even 7edo. As a result, stacking 7 of these fifths gives you an "antidiatonic" mos scale, where in a certain sense, major and minor intervals get "reversed". For example, stacking four fifths and octave-reducing now gets you a 6/5 minor third, whereas stacking three fourths and octave-reducing now gets you a 5/4 major third. Note that since we have a heptatonic scale, terms like "fifths", "thirds", etc. make perfect sense and really are five, three, etc. steps in the antidiatonic scale.
This has some very strange implications for music. The mavila antidiatonic scale is similar to the normal diatonic scale – except interval classes are flipped. Wherever there was a major third, you'll find a minor third, and vice versa. Half steps become whole steps and whole steps become half steps (closer to neutral second range, however). When you sharpen the leading tone in minor, you end up sharpening it down instead, meaning you flatten it. Also, minor is now major – you end up with three parallel natural/harmonic/melodic major scales, and only one minor scale. Instead of a diminished triad in the major scale, there is now an augmented triad.
As an example, the anti-Ionian scale has steps of ssLsssL, which looks like the regular Ionian scale except the "L" intervals are now "s" and vice versa.
Because of the structure of this unique tuning, it is true that every existing piece of common practice music has a "shadow" version in mavila temperament. That is, when Beethoven wrote Fur Elise, he actually wrote two compositions – the one that you know, and the antidiatonic equivalent in mavila temperament. It's only that the antidiatonic versions have never been heard before. Examples of this are provided below.
The mavila antidiatonic scale is also similar to the pelog scale used in Javanese and Balinese gamelan music, although the pelog's scale tuning is subject to regional variation. In particular, the antidiatonic scale supposes exactly two interval sizes, whereas pelog usually has unequal intervals throughout the scale.
Modal harmony
- Main article: Mavila temperament modal harmony
Scales
- Mavila-eb – 12-tone chromatic scale, equal-beating tuning
Mos tree
In addition to the 7-note anti-diatonic scale described, Mavila also has a 9 note "superdiatonic" mos, the "super-Ionian" mode of which looks LLLsLLLLs. This is the basis for the Armodue theory.
Mavila generates a 16-tone "chromatic" mos. In a certain sense, much of mavila makes sense if viewed within the lens of a 16-tone chromatic gamut, similarly to how much of meantone is thought of in the setting of a 12-tone chromatic gamut.
After the 16-tone "chromatic" scale is the 23-tone "enharmonic" mos, which can be thought of as an "extended mavila" analogous to the "extended meantone" 19-tone enharmonic scale. If the mavila fifth is flatter than that of 16edo (675 cents), it will instead generate an mos at 25 notes. This is similar to how if the meantone fifth is tuned sharper than 12edo, it will instead generate a 17-tone mos rather than a 19-tone one.
Tunings
The fifths of mavila are very flat – 16edo (675.0 cents) and 23edo (678.3 cents) are typical tunings, and the optimal 5-limit tuning is 679.8 cents. As a result, mavila is best played with specialized timbres: either timbres with high rolloff (such as sine waves, marimba, and ocarina), or timbres with high inharmonicity (detuned partials, such as Gamelan, bells, or Timbila instruments).
The temperament defines a tuning spectrum, similarly to the meantone spectrum. The fifth of 7edo (~686 cents) is often thought of as an informal dividing line between meantone and mavila temperament, in which case it forms the sharpmost endpoint on the mavila tuning spectrum: if the fifth is flatter than this, it will generate anti-diatonic scales, and if it is sharper than this, it will generate diatonic scales. The fifth of 9edo is also often thought of as the other (flatmost) endpoint on the mavila spectrum.
Much like meantone, mavila is supported by several low-numbered edos, which will basically be the same size as the mosses listed above.
7edo can be thought of as a primitive tuning, yielding a completely equal heptatonic scale that is equally diatonic and anti-diatonic.
The next edo supporting mavila is 9edo, which can be thought of as the first mavila edo (and the first edo in general) differentiating between 4:5:6 major and 10:12:15 minor chords. This is fairly interesting, as there is no real equivalent in meantone terms. It is larger than the "diatonic" sized mos, but smaller than the 16-tone "chromatic" mos. It is best thought of as a "superdiatonic" scale. The fifth is 667 cents.
It is also supported by 16edo, which is probably the most common tuning for mavila temperament. This can be thought of as the first edo offering the potential for chromatic mavila harmony, similar to 12edo for meantone. This is also the usual setting for the aforementioned Armodue theory, although the Armodue theory can easily be extended to larger mavila scales such as mavila[23].
The next edo supporting mavila is 23edo, which is the second-most common tuning for mavila temperament, used frequently by Igliashon Jones in his Cryptic Ruse albums. The fifth is 678 cents, and as a result the harmonic properties are slightly better than 16edo, although still fairly inharmonic compared to meantone. The anti-diatonic scale is more "quasi-equal" in this tuning than in 16edo.
25edo also supports mavila. The tuning is 672 cents and hence very flat, even flatter than 16edo, but not as flat as 9edo.
Tuning spectrum
| Edo Generator |
Eigenmonzo (Unchanged-interval)* |
Generator (¢) | Comments |
|---|---|---|---|
| 1\2 | 600.000 | Lower bound of 5-odd-limit diamond monotone | |
| 15/8 | 655.866 | ||
| 5\9 | 666.667 | ||
| 5/4 | 671.229 | ||
| 9\16 | 675.000 | ||
| 25/24 | 675.618 | ||
| 676.337 | octave mirror to Wilson's 523.662 meta-mavila | ||
| 13\23 | 678.261 | ||
| 5/3 | 678.910 | 5-odd-limit minimax | |
| 9/5 | 683.519 | 5-limit 9-odd-limit minimax | |
| 4\7 | 685.714 | Upper bound of 5-odd-limit diamond monotone 5-limit 9-odd-limit diamond monotone (singleton) | |
| 3/2 | 701.955 | Pythagorean tuning |
* besides the octave
Music
- from Map of an Internal Landscape (Reissue) (2007)
- Illegible Red Ink – in 16edo tuning
- Run Run Red Robot – in 9edo tuning
- Court Music of the Mesa (fifth-transcription) (1989) – first piece written in meta-mavila
- Our Rainy Season (2011)
- Wallowing in Madness (2020) – in 16edo tuning
- Mavila Jazz Rhodes 1 (archived 2014)
- Netbeans (2019)
- from Sean but not Heard (2012)
- Undercity ft. Hatsune Miku (2020) – in 16edo tuning
Experiments
Mike Battaglia has "translated" several common practice pieces into mavila by using Graham Breed's Lilypond code to tune the generators flat. Musical examples are provided in 9edo, 16edo, 23edo, and 25edo, for comparison. Note that the melodic and/or intonational properties differ slightly for each tuning.
- 9edo:
- 16edo:
- 23edo:
- 25edo:
See also
- African music – contains a discussion about the original tuning that inspired the discovery of this temperament
External links
- Meta Meantone & Meta Mavila by Erv Wilson
Notes
- ↑ A Linear Tuning of 4-"5"-"6" Artihmetic Mean (−3=5) paper from 1989 was referenced in Erv Wilson's Meta Meantone & Meta Mavila paper.