Eigenmonzo: Difference between revisions

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An '''eigenmonzo''' (also known as an '''unchanged interval''') is a (usually justly intoned) interval that remains unchanged when a specific tuning of a given temperament is applied to it.

An '''eigenmonzo''' (also known as an '''unchanged interval''') is a (usually justly intoned) interval that remains unchanged when a specific tuning of a given temperament is applied to it. The term "eigenmonzo" does not imply that the interval is notated in monzo form, so that if 2.3 [2 -1] is an eigenmonzo, then we may also refer to the same interval written as a ratio, 4/3, as an eigenmonzo.

A [[regular temperament]] transforms untempered intervals into tempered intervals, which changes most of their sizes. Only a small set of exceptional intervals do not change in size. This set of unchanged intervals depends on the choice of tuning.

A popular example of an ~~eigenmonzo~~ is the JI interval ~~{{monzo| 0 0~~ 1 ~~}}, or 1:5~~, when it is mapped by [[quarter-comma meantone]]; because this temperament tuning's generator is defined as exactly one-quarter the size of the interval 1:5, it remains justly tuned.

A popular example of an unchanged interval is the JI interval 5/1, when it is mapped by [[quarter-comma meantone]]; because this temperament tuning's generator is defined as exactly one-quarter the size of the interval 5/1, it remains justly tuned.

For any pure-octave temperament tuning, ~~{{monzo|~~ 1 ~~}}, aka 1:2,~~ is an ~~eigenmonzo~~.

For any pure-octave temperament tuning, 2/1 is an unchanged interval.

A [[rank]]-''n'' temperament can have up to ''n'' different ~~eigenmonzos~~—one for each [[generator]].

A [[rank]]-''n'' temperament can have up to ''n'' different unchanged intervals—one for each [[generator]].

~~== With respect~~ to the projection matrix ==

The term "eigenmonzo" here comes from the [[linear algebra formalism]], where intervals are often represented as vectors corresponding to their [[monzos]] (and thus instances of "vector" are often replaced with "monzo"). An [[wikipedia: Eigenvalues and eigenvectors|eigenvector]] is a vector that is not rotated (only scaled) by a matrix. The etymology of "eigen" is "own" in the sense of "characteristic"; the set of unrotated vectors and their scale factors are considered to characterize the transformation represented by the matrix. In this case, the transformation matrix is the [[projection]] corresponding to the tuning of the regular temperament, which gives the conflations of the just bases with [[Radical interval|radical intervals]], such as 3/2 to 5^(1/4). Note that this is ''not'' the matrix corresponding to the [[mapping]], which cannot specify a precise tuning.

~~The "monzo" part~~ of "eigenmonzo~~" should not be taken to imply that the interval~~ is ~~notated in monzo form. For example, if {{monzo| 2 -1 }} is an eigenmonzo, then we may also refer~~ to ~~this same interval expressed in quotient form, 4/3, as~~ an ~~eigenmonzo.~~

However, the definition of eigenmonzo is more precise; along with corresponding to an eigenvector, it must be scaled by a factor of 1 (i.e. left unchanged). In other words, there are many intervals that correspond to eigenvectors of a projection but that are not unchanged intervals in the corresponding tuning (most notably, any comma tempered out by a temperament is scaled to 0, but that is obviously not unchanged).

~~The "eigen" part of the term "eigenmonzo" comes from the fact that these intervals are [[wikipedia: Eigenvalues and eigenvectors|eigenvectors]] (vectors that are not rotated~~, ~~only~~ scaled) of the tuning's [[projection matrix]] (not the [[mapping|temperament's mapping matrix]]). The etymology of "eigen" is "own" in the sense of "characteristic"; the set of unrotated vectors and their scale factors are considered to characterize the transformation represented by ~~the matrix. However, only eigenvectors~~ of ~~the projection matrix with [[wikipedia: Eigenvalues and eigenvectors|eigenvalues]] (scale factors) equal to~~ 1 (~~scaled by 1,~~ i.e. unchanged ~~intervals~~) ~~are considered to be eigenmonzos; eigenvectors with eigenvalues equal to anything else are ''not'' considered to be eigenmonzos~~. In other words, many ~~things~~ that ~~are both monzos and~~ eigenvectors are not ~~eigenmonzos. Most~~ notably, ~~eigenvectors with eigenvalues equal to 0 are the vanishing commas of the~~ temperament~~, being~~ scaled to 0, but ~~these are~~ not ~~eigenmonzos~~.

== See also ==

* [[Fractional monzo]]: for more mathematical information

* [[Eigenmonzo subgroup]]

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-An '''eigenmonzo''' (also known as an '''unchanged interval''') is a (usually justly intoned) interval that remains unchanged when a specific tuning of a given temperament is applied to it.
+An '''eigenmonzo''' (also known as an '''unchanged interval''') is a (usually justly intoned) interval that remains unchanged when a specific tuning of a given temperament is applied to it. The term "eigenmonzo" does not imply that the interval is notated in monzo form, so that if 2.3 [2 -1] is an eigenmonzo, then we may also refer to the same interval written as a ratio, 4/3, as an eigenmonzo.
 A [[regular temperament]] transforms untempered intervals into tempered intervals, which changes most of their sizes. Only a small set of exceptional intervals do not change in size. This set of unchanged intervals depends on the choice of tuning.
-A popular example of an eigenmonzo is the JI interval {{monzo| 0 0 1 }}, or 1:5, when it is mapped by [[quarter-comma meantone]]; because this temperament tuning's generator is defined as exactly one-quarter the size of the interval 1:5, it remains justly tuned.
+A popular example of an unchanged interval is the JI interval 5/1, when it is mapped by [[quarter-comma meantone]]; because this temperament tuning's generator is defined as exactly one-quarter the size of the interval 5/1, it remains justly tuned.
-For any pure-octave temperament tuning, {{monzo| 1 }}, aka 1:2, is an eigenmonzo.
+For any pure-octave temperament tuning, 2/1 is an unchanged interval.
-A [[rank]]-''n'' temperament can have up to ''n'' different eigenmonzos&mdash;one for each [[generator]].
+A [[rank]]-''n'' temperament can have up to ''n'' different unchanged intervals&mdash;one for each [[generator]].
-== With respect to the projection matrix ==
+The term "eigenmonzo" here comes from the [[linear algebra formalism]], where intervals are often represented as vectors corresponding to their [[monzos]] (and thus instances of "vector" are often replaced with "monzo"). An [[wikipedia: Eigenvalues and eigenvectors|eigenvector]] is a vector that is not rotated (only scaled) by a matrix.  The etymology of "eigen" is "own" in the sense of "characteristic"; the set of unrotated vectors and their scale factors are considered to characterize the transformation represented by the matrix. In this case, the transformation matrix is the [[projection]] corresponding to the tuning of the regular temperament, which gives the conflations of the just bases with [[Radical interval|radical intervals]], such as 3/2 to 5^(1/4). Note that this is ''not'' the matrix corresponding to the [[mapping]], which cannot specify a precise tuning.
-The "monzo" part of "eigenmonzo" should not be taken to imply that the interval is notated in monzo form. For example, if {{monzo| 2 -1 }} is an eigenmonzo, then we may also refer to this same interval expressed in quotient form, 4/3, as an eigenmonzo.
+However, the definition of eigenmonzo is more precise; along with corresponding to an eigenvector, it must be scaled by a factor of 1 (i.e. left unchanged). In other words, there are many intervals that correspond to eigenvectors of a projection but that are not unchanged intervals in the corresponding tuning (most notably, any comma tempered out by a temperament is scaled to 0, but that is obviously not unchanged).
-The "eigen" part of the term "eigenmonzo" comes from the fact that these intervals are [[wikipedia: Eigenvalues and eigenvectors|eigenvectors]] (vectors that are not rotated, only scaled) of the tuning's [[projection matrix]] (not the [[mapping|temperament's mapping matrix]]). The etymology of "eigen" is "own" in the sense of "characteristic"; the set of unrotated vectors and their scale factors are considered to characterize the transformation represented by the matrix. However, only eigenvectors of the projection matrix with [[wikipedia: Eigenvalues and eigenvectors|eigenvalues]] (scale factors) equal to 1 (scaled by 1, i.e. unchanged intervals) are considered to be eigenmonzos; eigenvectors with eigenvalues equal to anything else are ''not'' considered to be eigenmonzos. In other words, many things that are both monzos and eigenvectors are not eigenmonzos. Most notably, eigenvectors with eigenvalues equal to 0 are the vanishing commas of the temperament, being scaled to 0, but these are not eigenmonzos.
 == See also ==
-* [[Fractional monzo]]: for more mathematical information
 * [[Eigenmonzo subgroup]]