28812/28561: Difference between revisions

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{{Infobox Interval|Name=Tesseract ~~Comma~~|Color name = 3u4z42, Quadthuzo comma|Ratio=28812/28561|Comma=yes}}

{{Infobox Interval

| Name= Tesseract comma

| Color name = 3u4z42, Quadthuzo comma

| Ratio = 28812/28561

| Comma = yes

}}

'''28812/28561''', the '''tesseract comma''', is a small comma in the 2.3.7.13 subgroup. It is the amount by which four [[13/7]] sevenths fall short of the [[12/1|twelfth harmonic]], and the amount by which four [[14/13]] semitones fall short of the [[4/3]] perfect fourth.

'''28812/28561''' (the Tesseract Comma) is a small comma in the 2.3.7.13 subgroup. It is the amount by which four [[13/7]] sevenths fall short of the [[12/1|twelfth harmonic]], and the amount by which four [[14/13]] semitones fall short of the [[4/3]] perfect fourth.

It can be factored into the [[28672/28561|voltage comma]] and the [[1029/1024|gamelisma]], which provides the 77 & 87 temperament '''cubical''' (see below); it can also be factored into the [[octaphore]] plus four [[729/728|squbemas]], which makes the tesseract comma a useful extension to the rank-3 octaphore and to rank-2 unicorn temperaments.

It can be factored into the [[28672/28561|~~Voltage Comma~~]] and the [[1029/1024|~~Gamelisma~~]], which provides the 77 & 87 temperament '''~~Cubical~~''' (see below); it can also be factored into the [[~~Octaphore~~]] plus four [[729/728|~~Squbemas~~]] ~~(squbemae?)~~, which makes the ~~Tesseract Comma~~ a useful extension to the rank-3 ~~Octaphore~~ and to rank-2 ~~Unicorn~~ temperaments.

== Temperaments ==

=== Tesseract ===

Tempering out the ~~Tesseract Comma~~ in its minimal subgroup, 2.3.7.13, yields the rank-3 '''~~Tesseract~~''' temperament.

Tempering out the tesseract comma in its minimal subgroup, 2.3.7.13, yields the rank-3 '''tesseract''' temperament.

[[~~Just intonation subgroup|~~Subgroup]]: 2.3.7.13

[[Subgroup]]: 2.3.7.13

[[Comma list]]: 28812/28561

[[Mapping~~]]: [⟨1~~ 2 2 3~~], ⟨0~~ -4 0 -1~~], ⟨0~~ 0 1 1]]

[[~~Optimization|~~Optimal tuning]] ([[CTE]]): ~2 = ~~1\1~~, ~14/13 = 124.539, ~7/4 = 967.452

[[Optimal tuning]] ([[CTE]]): ~2 = 1200.000, ~14/13 = 124.539, ~7/4 = 967.452

[[Optimal ET sequence~~]]: [[9edo~~|9]], ~~[[10edo|~~10]], ~~[[19edo|~~19]], ~~[[29edo|~~29]], ~~[[37edo|~~37b]], ~~[[48edo|~~48]], ~~[[49edo|~~49f]], ~~[[58edo|~~58]], ~~[[67edo|~~67]], ~~[[68edo|~~68]], ~~[[77edo|~~77]], ~~[[87edo|~~87]]

{{Optimal ET sequence|legend=1| 9, 10, 19, 29, 37b, 48, 49f, 58, 67, 68, 77, 87 }}

[[Badness]]: 2.528

[[Badness]] (Dirichlet): 2.528

==== 2.3.5.7.13 subgroup ====

By noticing that three generators is almost exactly 5/4, we can add prime 5 to the subgroup by tempering out the [[~~Cantonisma~~]]. We can equivalently temper out the [[105/104|~~Animist~~ comma]] by noticing that the difference between 4/3 and 5/4 (that is, 16/15) is equivalent in mapping to 14/13.

By noticing that three generators is almost exactly 5/4, we can add prime 5 to the subgroup by tempering out the [[cantonisma]]. We can equivalently temper out the [[105/104|animist comma]] by noticing that the difference between 4/3 and 5/4 (that is, 16/15) is equivalent in mapping to 14/13.

Subgroup: 2.3.5.7.13

Comma list: 28812/28561~~, 10985/10976~~

Comma list: 10985/10976, 28812/28561

Mapping: ~~[⟨1~~ 2 2 2 3~~], ⟨0~~ -4 3 0 -1~~], ⟨0~~ 0 0 1 1]]

Mapping: {{mapping| 1 2 2 2 3 | 0 -4 3 0 -1 | 0 0 0 1 1 }}

Optimal tuning (CTE): ~2 = ~~1\1~~, ~14/13 = 126.679, ~7/4 = 962.564

Optimal tuning (CTE): ~2 = 1200.000, ~14/13 = 126.679, ~7/4 = 962.564

Optimal ET sequence~~: [[9edo~~|9]], ~~[[10edo|~~10]], ~~[[19edo|~~19]], ~~[[29edo|~~29]], ~~[[37edo|~~37b]], ~~[[38edo|~~38]], ~~[[47edo|~~47]], ~~[[57edo|~~57]], ~~[[58edo|~~58]], ~~[[67edo|~~67c]], 76, ~~[[87edo|~~86c]]

{{Optimal ET sequence|legend=0| 9, 10, 19, 29, 37b, 38, 47, 57, 58, 67c, 76, 86c }}

Badness: 1.818

Badness (Dirichlet): 1.818

=== Cubical ===

By factoring the ~~Tesseract~~ comma into the ~~Voltage Comma~~ and ~~Gamelisma~~, we get the rank-2 temperament '''~~Cubical~~'''. This temperament is so named because its lattice is the same as ~~Tesseract~~, but with one dimension collapsed; similarly, a cube can be thought of as a ~~Tesseract~~ with one of its dimensions collapsed.

By factoring the tesseract comma into the voltage comma and gamelisma, we get the rank-2 temperament '''cubical'''. This temperament is so named because its lattice is the same as tesseract, but with one dimension collapsed; similarly, a cube can be thought of as a tesseract with one of its dimensions collapsed.

Subgroup: 2.3.7.13

Comma list: 28672/28561~~, 1029/1024~~

Comma list: 1029/1024, 28672/28561

Mapping: [⟨1 10 0 3], ⟨0 0 4], ⟨0 3 1]]

Optimal tuning (CTE): ~2 = ~~1\1~~, ~13/8 = 841.527

Optimal tuning (CTE): ~2 = 1200.000, ~13/8 = 841.527

Optimal ET sequence~~: [[10edo~~|10]], ~~[[37edo|~~37b]], ~~[[47edo|~~47]], ~~[[57edo|~~57]], ~~[[67edo|~~67]], ~~[[77edo|~~77]], ~~[[87edo|~~87]], ~~[[97edo|~~97]], ~~[[107edo|~~107]], ~~[[124edo|~~124b]], ~~[[144edo|~~144]]

{{Optimal ET sequence|legend=0| 10, 37b, 47, 57, 67, 77, 87, 97, 107, 124b, 144 }}

Badness: 1.261

Badness (Dirichlet): 1.261

=== Other temperaments ===

Temperaments discussed elsewhere that temper out the ~~Tesseract~~ comma include:

Temperaments discussed elsewhere that temper out the tesseract comma include:

Tridecimal ~~Octaphore~~ → [[Octaphore#Tridecimal%20Octaphore|Octaphore]]

Tridecimal octaphore → [[Octaphore #Tridecimal%20Octaphore|Octaphore]]

2.3.5.7.13 subgroup ~~Unicorn~~ (+351/350 ~~+126/125~~) → [[Unicorn family#2.3.5.7.13%20subgroup|Unicorn ~~Family~~]]

2.3.5.7.13 subgroup unicorn (+126/125 and 351/350) → [[Unicorn family #2.3.5.7.13%20subgroup|Unicorn family]]

== Etymology ==

The name ~~Tesseract Comma~~ was chosen by [[User:Unque|Unque]] in 2025. This name was chosen because tempering the comma cleaves the ~~Perfect Fourth~~ into four parts, and a tesseract is the 4D regular polytope made from four-sided regular polygons.

The name tesseract comma was chosen by [[User:Unque|Unque]] in 2025. This name was chosen because tempering the comma cleaves the perfect fourth into four parts, and a tesseract is the 4D regular polytope made from four-sided regular polygons.

[[Category:Commas named for how they divide the fourth]]

[[Category:Commas named for the intervals they stack]]

~~[[Category:Rational intervals]]~~

~~[[Category:13-limit intervals]]~~

@@ Line 1: / Line 1: @@
-{{Infobox Interval|Name=Tesseract Comma|Color name = 3u<sup>4</sup>z<sup>4</sup>2, Quadthuzo comma|Ratio=28812/28561|Comma=yes}}
+{{Infobox Interval
+| Name= Tesseract comma
+| Color name = 3u<sup>4</sup>z<sup>4</sup>2, Quadthuzo comma
+| Ratio = 28812/28561
+| Comma = yes
+}}
+'''28812/28561''', the '''tesseract comma''', is a small comma in the 2.3.7.13 subgroup. It is the amount by which four [[13/7]] sevenths fall short of the [[12/1|twelfth harmonic]], and the amount by which four [[14/13]] semitones fall short of the [[4/3]] perfect fourth.
-'''28812/28561''' (the Tesseract Comma) is a small comma in the 2.3.7.13 subgroup.  It is the amount by which four [[13/7]] sevenths fall short of the [[12/1|twelfth harmonic]], and the amount by which four [[14/13]] semitones fall short of the [[4/3]] perfect fourth.
+It can be factored into the [[28672/28561|voltage comma]] and the [[1029/1024|gamelisma]], which provides the 77 & 87 temperament '''cubical''' (see below); it can also be factored into the [[octaphore]] plus four [[729/728|squbemas]], which makes the tesseract comma a useful extension to the rank-3 octaphore and to rank-2 unicorn temperaments.
-It can be factored into the [[28672/28561|Voltage Comma]] and the [[1029/1024|Gamelisma]], which provides the 77 & 87 temperament '''Cubical''' (see below); it can also be factored into the [[Octaphore]] plus four [[729/728|Squbemas]] (squbemae?), which makes the Tesseract Comma a useful extension to the rank-3 Octaphore and to rank-2 Unicorn temperaments.
 == Temperaments ==
 === Tesseract ===
-Tempering out the Tesseract Comma in its minimal subgroup, 2.3.7.13, yields the rank-3 '''Tesseract''' temperament.
+Tempering out the tesseract comma in its minimal subgroup, 2.3.7.13, yields the rank-3 '''tesseract''' temperament.
-[[Just intonation subgroup|Subgroup]]: 2.3.7.13
+[[Subgroup]]: 2.3.7.13
 [[Comma list]]: 28812/28561
-[[Mapping]]: [⟨1 2 2 3], ⟨0 -4 0 -1], ⟨0 0 1 1]]
+{{Mapping|legend=1| 1 2 2 3 | 0 -4 0 -1 | 0 0 1 1 }}
-[[Optimization|Optimal tuning]] ([[CTE]]): ~2 = 1\1, ~14/13 = 124.539, ~7/4 = 967.452
+[[Optimal tuning]] ([[CTE]]): ~2 = 1200.000, ~14/13 = 124.539, ~7/4 = 967.452
-[[Optimal ET sequence]]: [[9edo|9]], [[10edo|10]], [[19edo|19]], [[29edo|29]], [[37edo|37b]], [[48edo|48]], [[49edo|49f]], [[58edo|58]], [[67edo|67]], [[68edo|68]], [[77edo|77]], [[87edo|87]]
+{{Optimal ET sequence|legend=1| 9, 10, 19, 29, 37b, 48, 49f, 58, 67, 68, 77, 87 }}
-[[Badness]]: 2.528
+[[Badness]] (Dirichlet): 2.528
 ==== 2.3.5.7.13 subgroup ====
-By noticing that three generators is almost exactly 5/4, we can add prime 5 to the subgroup by tempering out the [[Cantonisma]].  We can equivalently temper out the [[105/104|Animist comma]] by noticing that the difference between 4/3 and 5/4 (that is, 16/15) is equivalent in mapping to 14/13.
+By noticing that three generators is almost exactly 5/4, we can add prime 5 to the subgroup by tempering out the [[cantonisma]]. We can equivalently temper out the [[105/104|animist comma]] by noticing that the difference between 4/3 and 5/4 (that is, 16/15) is equivalent in mapping to 14/13.
 Subgroup: 2.3.5.7.13
-Comma list: 28812/28561, 10985/10976
+Comma list: 10985/10976, 28812/28561
-Mapping: [⟨1 2 2 2 3], ⟨0 -4 3 0 -1], ⟨0 0 0 1 1]]
+Mapping: {{mapping| 1 2 2 2 3 | 0 -4 3 0 -1 | 0 0 0 1 1 }}
-Optimal tuning (CTE): ~2 = 1\1, ~14/13 = 126.679, ~7/4 = 962.564
+Optimal tuning (CTE): ~2 = 1200.000, ~14/13 = 126.679, ~7/4 = 962.564
-Optimal ET sequence: [[9edo|9]], [[10edo|10]], [[19edo|19]], [[29edo|29]], [[37edo|37b]], [[38edo|38]], [[47edo|47]], [[57edo|57]], [[58edo|58]], [[67edo|67c]], 76, [[87edo|86c]]
+{{Optimal ET sequence|legend=0| 9, 10, 19, 29, 37b, 38, 47, 57, 58, 67c, 76, 86c }}
-Badness: 1.818
+Badness (Dirichlet): 1.818
 === Cubical ===
-By factoring the Tesseract comma into the Voltage Comma and Gamelisma, we get the rank-2 temperament '''Cubical'''.  This temperament is so named because its lattice is the same as Tesseract, but with one dimension collapsed; similarly, a cube can be thought of as a Tesseract with one of its dimensions collapsed.
+By factoring the tesseract comma into the voltage comma and gamelisma, we get the rank-2 temperament '''cubical'''.  This temperament is so named because its lattice is the same as tesseract, but with one dimension collapsed; similarly, a cube can be thought of as a tesseract with one of its dimensions collapsed.
 Subgroup: 2.3.7.13
-Comma list: 28672/28561, 1029/1024
+Comma list: 1029/1024, 28672/28561
 Mapping: [⟨1 10 0 3], ⟨0 0 4], ⟨0 3 1]]
-Optimal tuning (CTE): ~2 = 1\1, ~13/8 = 841.527
+Optimal tuning (CTE): ~2 = 1200.000, ~13/8 = 841.527
-Optimal ET sequence: [[10edo|10]], [[37edo|37b]], [[47edo|47]], [[57edo|57]], [[67edo|67]], [[77edo|77]], [[87edo|87]], [[97edo|97]], [[107edo|107]], [[124edo|124b]], [[144edo|144]]
+{{Optimal ET sequence|legend=0| 10, 37b, 47, 57, 67, 77, 87, 97, 107, 124b, 144 }}
-Badness: 1.261
+Badness (Dirichlet): 1.261
 === Other temperaments ===
-Temperaments discussed elsewhere that temper out the Tesseract comma include:
+Temperaments discussed elsewhere that temper out the tesseract comma include:
-Tridecimal Octaphore → [[Octaphore#Tridecimal%20Octaphore|Octaphore]]
+Tridecimal octaphore → [[Octaphore #Tridecimal%20Octaphore|Octaphore]]
-.3.5.7.13 subgroup Unicorn (+351/350 +126/125) → [[Unicorn family#2.3.5.7.13%20subgroup|Unicorn Family]]
+.3.5.7.13 subgroup unicorn (+126/125 and 351/350) → [[Unicorn family #2.3.5.7.13%20subgroup|Unicorn family]]
 == Etymology ==
-The name Tesseract Comma was chosen by [[User:Unque|Unque]] in 2025.  This name was chosen because tempering the comma cleaves the Perfect Fourth into four parts, and a tesseract is the 4D regular polytope made from four-sided regular polygons.
+The name tesseract comma was chosen by [[User:Unque|Unque]] in 2025. This name was chosen because tempering the comma cleaves the perfect fourth into four parts, and a tesseract is the 4D regular polytope made from four-sided regular polygons.
 [[Category:Commas named for how they divide the fourth]]
 [[Category:Commas named for the intervals they stack]]
-[[Category:Rational intervals]]
-[[Category:13-limit intervals]]