Syntonic–rastmic subchroma notation: Difference between revisions
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| Double sharp || (2187/2048)<sup>2</sup> || {{monzo| -22 14 }} || x | | Double sharp || (2187/2048)<sup>2</sup> || {{monzo| -22 14 }} || x | ||
|- | |- | ||
| Sesquisharp || (2187/2048)<sup>3/2</sup> || {{monzo| -33/2 21/2 }} || | | Sesquisharp || (2187/2048)<sup>3/2</sup> || {{monzo| -33/2 21/2 }} || t# | ||
|- | |- | ||
| Sharp || (2187/2048)<sup>1</sup> || {{monzo| -11 7 }} || # | | Sharp || (2187/2048)<sup>1</sup> || {{monzo| -11 7 }} || # | ||
|- | |- | ||
| Demisharp || (2187/2048)<sup>1/2</sup> || {{monzo| -11/2 7/2 }} || | | Demisharp || (2187/2048)<sup>1/2</sup> || {{monzo| -11/2 7/2 }} || t | ||
|- | |- | ||
| (None) || (2187/2048)<sup>0</sup> || {{monzo| 0 }} || | | (None) || (2187/2048)<sup>0</sup> || {{monzo| 0 }} || | ||
| Line 100: | Line 100: | ||
! Name !! Ratio !! Subgroup Monzo<br>(2.3.5.11) !! Textual<br>Representation | ! Name !! Ratio !! Subgroup Monzo<br>(2.3.5.11) !! Textual<br>Representation | ||
|- | |- | ||
| Tendodemisharp || 729/704 || {{monzo| -6 6 0 -1 }} || | | Tendodemisharp || 729/704 || {{monzo| -6 6 0 -1 }} || t> | ||
|- | |- | ||
| Artodemisharp || 33/32 || {{monzo| -5 1 0 1 }} || < | | Artodemisharp || 33/32 || {{monzo| -5 1 0 1 }} || t< | ||
|- | |- | ||
| Tendodemiflat || 32/33 || {{monzo| 5 -1 0 -1 }} || d> | | Tendodemiflat || 32/33 || {{monzo| 5 -1 0 -1 }} || d> | ||
|- | |- | ||
| Artodemiflat || 704/729 || {{monzo| 6 -6 0 1 }} || < | | Artodemiflat || 704/729 || {{monzo| 6 -6 0 1 }} || d< | ||
|} | |} | ||
Revision as of 13:56, 22 June 2022
The syntonic-rastmic subchroma notation is a notation scheme developed by Aura et al.[1] that is an expansion to the neutral circle-of-fifths notation.
While the neutral circle-of-fifths notation models the 2.3 subgroup of just intonation, with the neutral intervals capable of roughly modeling the harmonic 11, the syntonic-rastmic subchroma notation accurately captures the characteristics of the 2.3.5.11 subgroup, and is fit for a wider variety of equal temperaments and multirank temperaments. As it tries to strike a balance between the number and semantic consistency of the accidentals, it has the following three basic building blocks of accidentals: the conventional accidentals, the syntonic accidentals, and the rastmic and demirastmic accidentals, detailed below.
Accidentals
Conventional accidentals
As in neutral circle-of-fifths notation, the demisharp raises the pitch by half a chromatic semitone, and the demiflat lowers the pitch by the same amount.
| Name | Ratio | Monzo | Textual Representation |
|---|---|---|---|
| … | … | … | … |
| Double sharp | (2187/2048)2 | [-22 14⟩ | x |
| Sesquisharp | (2187/2048)3/2 | [-33/2 21/2⟩ | t# |
| Sharp | (2187/2048)1 | [-11 7⟩ | # |
| Demisharp | (2187/2048)1/2 | [-11/2 7/2⟩ | t |
| (None) | (2187/2048)0 | [0⟩ | |
| Demiflat | (2187/2048)-1/2 | [11/2 -7/2⟩ | d |
| Flat | (2187/2048)-1 | [11 -7⟩ | b |
| Sesquiflat | (2187/2048)-3/2 | [33/2 -21/2⟩ | db |
| Double flat | (2187/2048)-2 | [22 -14⟩ | bb |
| … | … | … | … |
Syntonic accidentals
The syntonic accidentals model the harmonic 5. The synsharp raises the pitch by a syntonic comma. The synflat lowers the pitch by the same amount.
| Name | Ratio | Monzo | Textual Representation* |
|---|---|---|---|
| … | … | … | … |
| Synsharp | (81/80)1 | [-4 4 -1⟩ | ↑ |
| (None) | (81/80)0 | [0⟩ | |
| Synflat | (81/80)-1 | [4 -4 1⟩ | ↓ |
| … | … | … | … |
* "^" and "v" are acceptable variants of textual representation. Those are handy when input of non-ASCII characters are not available.
Rastmic and demirastmic accidentals
The rastmic and demirastmic accidentals model the harmonic 11. The demirasharp raises the pitch by half a rastma. The demiraflat lowers the pitch by the same amount. Note: The graphical forms of demirastmic accidentals are work in progress.
| Name | Ratio | Subgroup Monzo (2.3.5.11) |
Textual Representation |
|---|---|---|---|
| … | … | … | … |
| Double rasharp | (243/242)2 | [-2 10 0 -4⟩ | // |
| Sesquirasharp | (243/242)3/2 | [-3/2 15/2 0 -3⟩ | /> |
| Rasharp | (243/242)1 | [-1 5 0 -2⟩ | / |
| Demirasharp | (243/242)1/2 | [-1/2 5/2 0 -1⟩ | > |
| (None) | (243/242)0 | [0⟩ | |
| Demiraflat | (243/242)-1/2 | [1/2 -5/2 0 1⟩ | < |
| Raflat | (243/242)-1 | [1 -5 0 2⟩ | \ |
| Sesquiraflat | (243/242)-3/2 | [3/2 -15/2 0 3⟩ | <\ |
| Double raflat | (243/242)-2 | [2 -10 0 4⟩ | \\ |
| … | … | … | … |
Combined accidentals
The demisharp/demiflat and the demirasharp/demiraflat are rarely used alone since they are irrational. They are usually combined for the following accidentals. These are the most common quartertones.
| Name | Ratio | Subgroup Monzo (2.3.5.11) |
Textual Representation |
|---|---|---|---|
| Tendodemisharp | 729/704 | [-6 6 0 -1⟩ | t> |
| Artodemisharp | 33/32 | [-5 1 0 1⟩ | t< |
| Tendodemiflat | 32/33 | [5 -1 0 -1⟩ | d> |
| Artodemiflat | 704/729 | [6 -6 0 1⟩ | d< |
Natural accidental
The natural accidental cancels all pitch alterations.
Notes
- ↑ Other contributors include Flora Canou and HEHEHE I AM A SUPAHSTAR SAGA.