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EPISODE 2: The Fundamental Laws of Tempering: First Law[edit]

test

If you missed the first episode, please read it here first!

If you have seen it, then hopefully you're a masters of vectors and covectors now. Many of you knew vectors anyway, and now you know what these mysterious things called covectors are. Now let's move on to bigger and grander things.

First, before getting into exterior algebra itself, I'll introduce a simple mathematical theorem which is basically like the First Law of Tempering. For this, all you need to know is the dimensionality of the original, pre-tempered JI space you're working in. For example, the 3-limit is 2D, the 5-limit is 3D, the 7-limit is 4D, the 11-limit is 5D.

Before I state the law, however, I should probably get some terms straight:

The dimension of a tuning, whether JI or a temperament, is the number of generators needed to hit every note in it. So 12-EDO is a 1D temperament, meantone is 2D, etc. This is sometimes called the rank of the tuning.
A temperament is considered to be a musical entity eliminating one or more commas. All of the various tunings of a temperament are classified as tunings of the same fundamental temperament. For instance 1/4-comma meantone, 1/3-comma meantone, TOP meantone, etc. are all different tunings of the overarching meantone temperament.{1}
The word comma has two meanings, the first of which is more relevant to what I'm talking about here:
- In the context of temperaments, a comma is an interval you're deciding to temper out. For instance, the comma being tempered out in meantone temperament is 81/80, and the comma being tempered out in dicot temperament is 25/24.
  - You'll note that there's nothing in this definition stopping you from tempering out something like 5/4 and calling that the "comma" for your temperament, much like there's nothing stopping you from purchasing an 18-wheeler and driving it off of a cliff. The latter may yield more perceptually interesting results than the former.
- In the context of JI, the term "comma" also denotes a small musical interval in JI, one which you may not want to temper out at all. Archetypical examples of commas include 81/80, the syntonic comma, and 64/63, Archytas' comma. Sometimes small intervals are also called other things, such as kleisma, schisma, diesis, etc. I'm not concerning myself with all of these ad hoc names for size ranges, but you should know it so you don't get confused.

Now then, PREPARE FOR LAW

2.1: The First Law of Tempering[edit]

Given an initial JI space of dimension $d$, if you temper out $n$ commas, there is exactly one unique temperament eliminating only those commas, and it will be of dimension $(d-n)$.

File:Thoughtful-bonobo.jpg

2.2: Aftermath (pun intended)[edit]

Hm. What does that mean? Formulated more concisely,

Dimension of original JI space - Number of commas tempered out = Dimension of resulting temperament

Or, using fancy pseudo-algebraic terms,

if $d$ = Dimension of JI space

and if $n$ = Number of commas tempered out,

then Dimension of resulting temperament = $d-n$.

If this still looks like the equivalent of $\left( \sum_{k=1}^n a_k b_k \right)^2 \leq \left( \sum_{k=1}^n a_k^2 \right) \left( \sum_{k=1}^n b_k^2 \right)$ to you, then maybe some examples will help make it clearer.

So, the first thing this law makes reference to is the dimension of the initial JI space, which is being stored in a variable called $d$. If you're not used to thinking about JI in this way, this may seem a strange concept, at first, but it's really simple - the "dimension" is just the number of primes. If you're working in the 5-limit, for instance, your primes are 2/1, 3/1, and 5/1, so 5-limit JI is a 3D space. Therefore, as far as the formulae above are concerned, for 5-limit JI, $d=3$.
The second thing we're supposed to know is the number of commas we're tempering out. This is simple enough. So say we're in 5-limit JI, and we want to temper out 81/80. That's one comma, so $n=1$.
Finally, using this information, we can figure out what the dimension of the resulting temperament is. It's going to be equal to $d-n = 2$.

Therefore, after going through the simple process above, we can see that the resulting temperament is going to be a 2D temperament, meaning it's going to have two generators. Anyone who's played with meantone above knows that this is right.

You'll note also that the law states that "there is exactly one unique temperament eliminating only those commas." What does that mean? Well, it just means that there's only one temperament eliminating 81/80 and nothing else, which you know as meantone temperament. In other words, there's no other temperament that eliminates 81/80 and nothing else; there are no bizarro-meantones or anything like that. There's just one, and it's The Meantone Temperament.

This may seem obvious until you think about the implications for tempering out more than one comma. For instance, if you're in the 5-limit, and you eliminate both 81/80 and 128/125, the first law says you're going to get a temperament with a resulting dimension of 3-2 = 1. A 1D (sometimes called "rank-1") temperament is an equal temperament, so you know that the result's going to be one of those. However, the first law also states that there's only one temperament eliminating both 81/80 and 128/125 and nothing else. And, since you know that this temperament must be a 1-dimensional equal temperament, this means that there is only one equal temperament eliminating both 81/80 and 128/125.{2 - oh my god, what is it?}

2.3: More examples[edit]

Let's go over some more examples to make some more sense of this all.

Say you're starting in 5-limit JI, which is a 3D space. Now let's say you temper out 81/80. You started with a 3D space and tempered out one comma. The first law tells us that there is exactly one temperament eliminating 81/80 and nothing else, and that it's of dimension 3-1=2. You know this temperament as meantone.
Say you're in the 5-limit again, and this time you're tempering out 81/80 and 128/125. There is only one temperament eliminating these commas and nothing else, and in this case it's of dimension 3-2 = 1. It just so happens that if you work it out, the rank-1 temperament in question is 12-EDO, specifically $\bra{12 \s 19 \s 28}$ and its multiples, all of which "contain" $\bra{12 \s 19 \s 28}$.
Say you're in the 7-limit and you eliminate 81/80 and nothing else. There is only one temperament eliminating only 81/80 in the 7-limit, and it's of dimension 4-1=3. Note that if you start with the 7-limit and temper out just 81/80, you end up with a different temperament than if you start with 5-limit JI and do the same thing - you now have a 3D temperament, as opposed to a 2D temperament! If you work it out, you get something that's effectively meantone but with an extra 7/1 generator that's totally outside the circle of fifths.
Say in the 7-limit, you temper out 81/80 and 126/125. There is only one temperament eliminating these commas and nothing else, and it's rank 4-2=2. You know it as septimal meantone, where augmented sixths are 7/4. Now you've tempered out an additional comma to relate it that 7/4 back to the circle of fifths, and brought it down to 2D. (If it's not obvious to you that tempering out 126/125 makes 7/4 an augmented sixth, don't worry about that for now.)
Say in the 7-limit, you temper out 81/80 and 36/35. The only temperament eliminating both of these and nothing else will be of rank 4-2=2, and it's called dominant temperament. (Although it may not be obvious just yet, it makes 7/4 equal to a normal minor seventh.)

Now, what does it all mean?

2.4: What it all means[edit]

OK, hopefully you get it. It's a simple idea, but it leads to some very strong implications right away.

The first important implication is that 1D temperaments are no different from 2D temperaments, even though 2D temperaments tend to have fancy names involving animals and 1D temperaments don't. That they're no different means that if you start in the 5-limit or in any 3D system (like 3.5.7-limit JI, for instance), and temper out 2 commas, you get a single unique 1D temperament, just like you get a single unique 2D temperament if you temper out only 1 comma from 5-limit JI.
The second important realization is that if you care about temperaments being 2D, e.g. things producing MOS's, then: it requires 1 comma to be tempered out from the 5-limit to get to 2D; it requires 2 commas to be tempered from the 7-limit to get to 2D; it requires 3 commas to be tempered out from the 11-limit to get to 2D, etc.
The third important realization is that if you start in something like the 7-limit (which is 4D) and temper out one comma, then you get to a 4-1= 3D temperament. And then, if you temper out ANOTHER comma on top of that, you get to a 4-2=2D temperament. And then, if you temper out ANOTHER comma, you get to a 4-3=1D temperament.
The fourth important realization is there's no conceptual difference at all between something like the dimensionality of a 4D JI lattice and the dimensionality of a 4D temperament - whichever you start with, if you temper out an additional comma, you lose a dimension and go down to 3D. A 4D temperament and some 4D JI system are both just different lattices that require four generators, and are hence both "4D."

The last point is worth mentioning again. The number of "generators" a temperament needs is the same basic concept whether the temperament is an actual temperament, or whether it's JI. It can be very useful, in fact, to think of something like JI as itself being a special type of "temperament" which tempers out 0 commas (and, consequently, has 0.0 cents of error), and to think of temperaments as "deriving" from it by tempering out additional commas. Carl has sometimes called JI the "identity temperament" before for this reason.{3}

More to come...

[1] - Note that others have at time used the term "temperament" differently - historically, some authors have used the term "temperament" in the sense that 1/4-comma meantone is a different "temperament" than 1/3-comma meantone. This use differs from the one presented above, which I think is a more useful definition for the purpose of classifying and organizing the infinite set of new tuning systems we have at our disposal, whatever you want to call them.

[2] - You guessed it - this temperament happens to be the familiar 12 tone equal temperament, using the obvious mapping where you consider the 700 cent interval to be 3/2, and the 400 cent interval to be 5/4. In val notation, this is the $\bra{12 \s 19 \s 28}$ val. Multiples of this val also count, for instance $\bra{24 \s 38 \s 56}$, which is 24-EDO - they're considered to be "contorsions" of $\brat{12 \s 19 \s 28}$, with extra unrelated notes that don't relate back to JI in any way at all. Much like all of the different tunings of a temperament are classified as the same temperament, all of the different "contorsions" of a temperament are also considered to have the same underlying temperament powering them. This is only a brief intro to this concept, which we'll touch more on later.

[3] - Much like the definition of "temperament," this is one of those things that sometimes gets people up in arms, possibly due to artists feeling that certain choices of definition can interfere with their thought processes. Regardless of what semantic choices you make to explain this concept, or what definition of "temperament" or whatever words you prefer to use, you should understand the underlying idea, because it's important: the same mathematical objects in this tuning that represent temperaments also represent JI, with JI tempering out "zero" commas and containing 0.0 cents of error. Tempered spaces are just like JI spaces and work in exactly the same way, with the temperament itself being a "map" from JI into the tempered space.

This isn't just a random philosophical idea, but is quite true mathematically: the wedgie for 5-limit JI, for instance, is $\bra{\bra{\bra{1}}}$, and the mapping matrix for 5-limit JI is the identity matrix

$$\begin{bmatrix}

1 & 0 & 0\\

0 & 1 & 0\\

0 & 0 & 1

\end{bmatrix}$$

both of which you'll learn about later.

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]]

Mike's Lecture on the First Fundamental Law of Tempering

Contents

EPISODE 2: The Fundamental Laws of Tempering: First Law[edit]

2.1: The First Law of Tempering[edit]

2.2: Aftermath (pun intended)[edit]

2.3: More examples[edit]

2.4: What it all means[edit]

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Mike's Lecture on the First Fundamental Law of Tempering

EPISODE 2: The Fundamental Laws of Tempering: First Law[edit]

2.1: The First Law of Tempering[edit]

2.2: Aftermath (pun intended)[edit]

2.3: More examples[edit]

2.4: What it all means[edit]

Navigation menu

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