5L 3s: Difference between revisions

'''5L 3s''' refers to the structure of [[MOS]] scales with generators ranging from 2\5 (two degrees of [[5edo]] = 480¢) to 3\8 (three degrees of [[8edo]] = 450¢). In the case of 8edo, L and s are the same size; in the case of 5edo, s becomes so small it disappears (and all that remains are the five equal L's).  

The term '''oneirotonic''' (/oʊnaɪrəˈtɒnɪk/ ''oh-ny-rə-TON-ik'' or /ənaɪrə-/ ''ə-ny-rə-'') is often used for the octave-equivalent MOS structure 5L 3s, whose brightest mode is LLsLLsLs. The name ''oneirotonic'' (from Greek ''oneiros'' 'dream') was coined by [[Cryptic Ruse]] after the Dreamlands in H.P. Lovecraft's Dream Cycle mythos. Oneirotonic is a distorted diatonic, because it has one extra small step compared to diatonic ([[5L 2s]]).

The generator size ranges from 450¢ (3\8) to 480¢ (2\5). Hence any edo with an interval between 450¢ and 480¢ has an oneirotonic scale. [[13edo]] is the smallest edo with a (non-degenerate) 5L3s oneirotonic scale and thus is the most commonly used oneirotonic tuning.

== Scale tree ==

 

 

 

 

Trivia: A-Team can be tuned by ear, by tuning a chain of pure harmonic sevenths and taking every other note. This corresponds to using a generator of 64/49 = 462.34819 cents. A chain of fourteen 7/4's are needed to tune the 8-note oneirotonic MOS. This produces a tuning close to 13edo.

 

=== Petrtri (13&21) ===

 

 

{| class="wikitable right-2 right-3 right-4 right-5"

 

 

 

 

{| class="wikitable center-all"

| colspan="6" style="text-align:left" | The 8-note MOS has the following intervals (from some root):

|}

 

 

 

 

 

 

 

 

 

 

=== Kata modes ===

We call modes with a minor mos5th ''kata modes'' (from Greek for 'down'). The kata modes of the MOS are the 4 darkest modes, namely Mnarian, Kadathian, Hlanithian and Sarnathian. In kata modes, the melodically squashed fifth from the tonic downwards is the flatter 5th degree. Kata modes could be used to distort diatonic tropes that start from the tonic and work downwards or work upwards towards the tonic from below it. For example:

When used in an "ana" way, the kata modes are radically different in character than the brighter modes. Because the fifth and seventh scale degrees become the more consonant minor tritone and the minor sixth respectively, the flat tritone sounds more like a stable scale function. Hlanithian, in particular, is a lot like a more stable version of the Locrian mode in diatonic.

=== MODMOSes ===

The most important oneirotonic MODMOS is LSLLLSLS (and its rotations), because it allows one to evoke certain ana or kata diatonic modes where three whole steps in a row are important (Dorian, Phrygian, Lydian or Mixo) in an octatonic context. The MOS would not always be able to do this because it has at most two consecutive large steps.

As with the MOS, this MODMOS has four ana and four kata rotations:

* LLLSLSLS: Dylathian &4: an ana-Lydian

Other potentially interesting oneirotonic MODMOSes (that do not use half-sharps or half-flats) are:

* the distorted harmonic minor LSLSLLSAS (A = aug 2nd = L + chroma)

* the distorted Freygish SASLSLLS

* R-m3-m5-M7: Oneiro Half-Diminished Tetrad

* R-m3-m5-m7: Orwell Tetrad, Oneiro Diminished Tetrad

* R-M3-M7: 1st Inversion Squashed Minor Triad (note the order of terms!)

* R-m3-m7: 1st Inversion Squashed Major Triad

"Oneirotonic maqam" is based on the idea "If [[maqam]] is loosely an extension of diatonic that uses neutral intervals, what is the oneirotonic counterpart that uses oneirotonic neutral intervals?" or "What if we distorted maqam scales similarly to how oneirotonic distorts diatonic scales?" The following assumes an edo with A-Team oneirotonic scales and neutral mosseconds (i.e. half of an oneirotonic minor mosthird) such as [[18edo]] and [[26edo]]. In rank-2 [[temperament]] terms, this requires a loosely 18&26 structure.

* 26edo can be used if you want neutral mosseconds and minor mosthirds closer to their [[24edo]] counterparts. In 26edo these are 138c and 277c respectively, but in 18edo these are 133c and 267c.

* 18edo can be used if you want neutral mosthirds (neutral mos2nd + major mos2nd) closer to conventional neutral thirds. The neutral mos3rd is 333c in 18edo and 323c in 26edo.

== Zheanist theory ==

18edo may be a better basis for a style of oneirotonic Zheanism using comma sharp and comma flat fifths than 13edo (in particular diesis sharp and diesis flat fifths; diesis is a category with a central region of 32 to 40c). In 18edo both the major fifth (+31.4c) and the minor fifth (-35.3) are about a diesis off from a just perfect fifth. In 13edo only the major fifth is a diesis sharp, and it is +36.5c off from just; so there's less wiggle room for a [[neji]] if you want every major fifth to be at most a diesis sharp).  

31nejis and 34nejis also provide opportunities to use dieses directly, since 1\31 (38.71c) and 1\34 (35.29c) are both dieses.

These are just oneirotonic-inspired chords, they aren't guaranteed to fit in your neji.

*13:16:19 Tridecimal Squashed Major Triad

*13:17:19 Tridecimal Naiadic Maj2

*13:17:20 Tridecimal Squashed 2nd Inversion Minor Triad

==== /17 ====

*34:40:52:58:76:89:102:110:129 (Celephaïsian + P5; R-min3-sup5-M6-M9-sub11-P12(fc)-supmin13-M14)

*34:40:50:58:89:102:129 (R-min3-sub5-M6-M9-sub11-P12(rc)-M14)

*34:40:50:58:76:89:102:110:129:208 (R-m3-sub5-M6-M9-sub11-P12(rc)-supm13-M14-sup19(rc^2))

==== /23 ====

*23:27:30 Vice Squashed Min4

==== /29 ====

*58:65:68:76:84:94:99:110:116 Vicenon Celephaïsian &6

*58:61:68:76:84:89:99:104:116 Vicenon Ultharian @2

*58:61:68:72:80:89:94:104:116 Vicenon Sarnathian

==== Over small prime multiples ====

=== Some oneirotonic nejis ===

*58:61:65:68:72:76:80:84:89:94:99:104:110:116 A very low-complexity 13neji; not optimized for transposability.

== Oneirotonic rank-2 temperaments ==

The only notable harmonic entropy minimum is Vulture/[[Hemifamity_temperaments|Buzzard]], in which four generators make a 3/1 (and three generators approximate an octave plus 8/7). The rest of this region does not approximate low-complexity JI harmony well, though there are a couple notable subgroup temperaments.

=== Tridec (21&29, 2.7/5.11/5.13/5) ===

=== A-Team (13&18, 2.5.9.21) ===

{| class="wikitable right-2 right-3 right-4 sortable"

|-

! class="unsortable"| Approximate ratios<ref>The harmonics over 1/1 are in bold. The ratio interpretations that are not valid for 18edo are italicized.</ref>

! #Gens up

|}

=== Petrtri (13&21, 2.5.9.11.13.17) ===

Sortable table of intervals in the Dylathian mode and their Petrtri interpretations:

| 0\13, 0.00

| 1/1

| 2\13, 184.62

| 6\21, 342.86

| 10\34, 352.94

| 13\34, 458.82

| 459.15

| 13/9, 16/11

| +4

| 6

| 9\13, 830.77

| +7

| 17/10

| 19\21, 1085.71

| 31\34, 1094.12

=== Buzzard (48&53, 2.3.5.7) ===

Commas: 1728/1715, 5120/5103

[[POTE_tuning|POTE generator]]: ~320/243 = 475.636

Map: [&lt;1 0 -6 4|, &lt;0 4 21 -3|]

Wedgie: &lt;&lt;4 21 -3 24 -16 -66||

EDOs: 48, 53, 111, 164d, 275d

 

 

 

 

[[File:13edo_1MC.mp3]]

[[Category:Scales]]

[[Category:Oneirotonic| ]] <!-- sort order in category: this page shows above A -->

[[Category:Mos]]

[[Category:MOS scales]]

By a weird coincidence, the other generator for this MOS will generate the same pattern within a tritave equivalence. By yet another weird coincidence, this MOS belongs to a temperament which has [[Bohlen-Pierce|Bohlen-Pierce]] as its index-2 subtemperament. In addition to being harmonious, this tuning of the MOS gives an L/s ratio between 3/1 and 3/2, which is squarely in the middle of the range, being thus neither too exaggerated nor too equalized to be recognizable as such, unlike in octaves, where the only notable harmonic entropy minimum is near a greatly exaggerated 10/1 L/s ratio.

{| class="wikitable" style="text-align:center;"

! colspan="5" |\