Neji: Difference between revisions

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A '''neji''' or '''NEJI''' (pronounced /nɛdʒi/ "nedgy"; for "near-~~equal~~ [[just intonation]]") is a [[~~circulating temperament~~]] ~~which approximates~~ an [[~~Equal-step tuning|equal tuning~~]] ~~dividing~~ a JI [[~~equave~~]] ~~into JI scale steps~~.

A '''neji''' or '''NEJI''' (which can be pronounced /nɛdʒi/ "nedgy"; for "near-equivalent [[just intonation]]" or "near-equal just intonation") is a [[JI]] scale that is "nearly-equivalent" to an associated ''target scale'' (or ''target'' for short). Nejis are designed with a focus on the harmonic resonance of the pitches in mind w.r.t their foreseen musical use. If the target scale is an [[edo]], a neji is technically also a type of [[well temperament]] for that edo.

~~Due~~ to the ~~influence of Zhea Erose who originated the~~ term~~, in colloquial usage~~ ''neji'' ~~often specifically refers to a subset of a mode of the~~ [[~~harmonic series~~]] ~~used to approximate an edo~~.

== History ==

The concept behind nejis is probably first proposed by [[George Secor]] in 2002<ref>[http://www.anaphoria.com/secor-blarney.html GEORGE SECOR - A BIT O' BLARNEY]</ref>, where he called it a '''quasi-equal rational tuning'''.

The idea has also been suggested by [[Paul Erlich]] and a feature to generate them has existed in [[Scala]] since some time in the 1990's.

The term ''neji'' was coined by [[Zhea Erose]].

~~== Nemi ==~~

Due to the influence of Zhea Erose who originated the term, the term "neji" has often been used in connection with naming [[#Harmodal nejis|harmodal nejis]] specifically, with other types of nejis being less common.

~~A '''nemi''' or '''NEMI''' (near-equivalent modal intonation) is a scale which approximates some non-JI scale by dividing a JI equave with a subset of a mode~~ of the ~~harmonic series. The~~ term ~~''neji'' may informally be used for nemis~~, ~~e.g.~~ "neji ~~Lydian~~".

== In primodality ==

== Approaches to neji construction ==

In [[Zhea Erose]]'s [[primodality]] theory, ~~edo nemis~~ can be used to explore a prime family (see [[primodality]]), while keeping the transposability, scale structures, rank-2 harmonic theory, notation, etc. associated with ~~that~~ edo. (The ~~edo nemi~~'s denominator need not be prime but primes may be preferred for sake of minimizing lower-complexity intervals. Zhea often uses semiprimes ''pq''.) Zhea Erose's theory also deals with modulations between different prime families, and combining different prime families into one scale.

=== In primodality ===

In Zhea Erose's [[primodality]] theory, nejis can be used to explore a prime family (see [[primodality]]), while keeping the transposability, scale structures, rank-2 harmonic theory, notation, etc. associated with the target scale (usually an [[edo]]). (The neji's denominator need not be prime but primes may be preferred for sake of minimizing lower-complexity intervals and maximizing unique ones specific to that prime. Zhea often uses semiprimes ''pq''.) Zhea Erose's theory also deals with modulations between different prime families, and combining different prime families into one scale.

== ~~History~~ ==

=== As harmonic segment subsets ===

~~The concept behind nemi is probably first proposed by~~ [[~~George Secor~~]] in ~~2002<ref>~~[~~http~~:~~//www~~.~~anaphoria~~.~~com/secor-blarney~~.~~html GEORGE SECOR~~ - ~~A BIT O~~' ~~BLARNEY~~]~~</ref>, where he called it a~~ '''~~quasi-equal rational tuning~~'''.

Generalizing from the primodal use case of the term "neji", one might choose any relatively low [[Glossary#H|harmonic series segment]], ''not necessarily in a way associated with primodality'', and select notes therefrom in order to build a neji with extra [[concordance]].

This distinction is more process-based than formalized (because any JI scale trivially occurs as some (possibly very high) harmonic series segment subset); sometimes the pool of intervals is chosen to be a specific "relatively not large" harmonic series segment before notes are selected from it while other times it is guessed at in some "relatively not large" range and then later revised based on what fits (or other considerations). The "relatively not large" focuses on the following key observation of Zhea's that others have agreed with as a valuable observation in the design of JI scales:

: If you focus on choosing intervals as representing different notes of your target ''without regard'' for the growing size of the implied denominator of the scale as a single chord, then the denominator will often grow ''rapidly'' to absurd numbers, ''especially'' if you are repeatedly stacking the same interval to reach some of the notes.

Technically, this is a simplification of the observation, as you can take any incomplete harmodal neji and add some intervals that are "awkward" w.r.t the denominator to complete it and thus increase the denominator massively, but the scale will overall likely still sound pretty coherent, ''especially'' if those intervals simplify w.r.t other intervals of interest to the composer, so it is rather the spirit of the observation that your notes of interest should cohere with each-other within reason and that where they don't should ideally be intentional harmonic tensions in the scale accessible for musical use. This logic also shows why the line between [[neji]]s (in the general sense) and '''harmodal nejis''' (defined below) is even more "fuzzy" than one might initially think.

~~The idea~~ has ~~also been suggested by~~ [[~~Paul Erlich~~]] ~~and~~ a ~~feature to produce them has existed in~~ [[~~Scala~~]] for ~~generating them since some time~~ in the ~~1990's~~.

==== Harmodal nejis ====

If the neji belongs to a (''relatively not large'') harmonic segment and the target scale has a [[period]] equal to some positive integer harmonic (like the [[octave]], [[tritave]] or [[pentave]]), it is a "harmodal neji" (a contraction of "[[Harmonic mode|harmonic modal]] neji"), meaning primodal nejis are a type of harmodal neji. This period is typically an octave, as that's the most common use case. This term has found use before by Zhea but it should be noted it was proposed as a standard way to resolve an ambiguity in the meaning of the stand-alone term "neji", therefore please see the directly below alternative, which may be preferred for consistency/backwards-compatibility.

==== Nonharmodal nejis ====

An alternative to using the term "harmodal nejis" is to ''assume'' that a "neji" is harmodal ''by default'', and instead specify that a neji is "''nonharmodal''" only when necessary, in order to preserve the colloquial usage of the term "neji". This is consistent with the sentiment that there does not need to be a new term "harmodal neji", while retaining clarity.

~~The term ''neji'' was coined by Zhea Erose. The term ''nemi'' was coined by~~ [[~~User:Godtone~~]]~~; it~~ is ~~intended to be more faithful to~~ the ~~usual sense in which~~ the ~~term ''neji'' came~~ to ~~be used~~.

=== Detempering ===

A more ([[JI subgroup]]) lattice-based approach is [[detempering]]. Detempering entails that the neji has the property of being [[epimorphic]] (obeys the appropriate mapping logic) with respect to a [[regular temperament]] for a tempered scale, equal-division or otherwise.

~~== Versus~~ detempering ==

Importantly and nontrivially, detempering is stricter than merely requiring that the target scale ''has'' a scale logic (that is, a [[mapping]]). Even in those cases where the target scale has a mapping, a neji might still approximate it without following its associated mapping. A detempering, however, must ''follow'' the mapping.

~~Nejis are~~ a ~~superset of both~~ [[~~detempering~~]] ~~and edo nemis~~. ~~Unlike detempering~~, a neji ~~or a nemi need not imply a [[~~mapping]].

~~Nemis are defined via intention rather than~~ a ~~mathematical definition~~, ~~since any periodic JI scale~~ is a ~~subset of some harmonic series segment~~. ~~Nemis require the rational pitch replacements~~ to ~~all be selected from~~ a ~~''chosen''~~ harmonic ~~series mode. This~~ is ~~not compulsory for detempered edos or nejis~~ in ~~general~~.

=== Building edo nejis ===

It's possible to create a working edo neji by simply approximating an edo as closely as possible with selected harmonics from a mode. However, it is sometimes preferable to build particular aesthetic choices into such a neji. One such common choice is to focus on a few intervals in the edo being "nejified" which are of particular interest. The root harmonic is then selected to approximate these intervals of interest as well as possible; the remaining harmonics to fill in the rest of the edo are chosen based on their ability to fit well with the existing notes.

~~Nejis and nemis are compatible with~~ [[~~regular temperament theory~~]] ~~if they~~ are ~~treated as working in~~ the ~~concrete tuning layer~~ of ~~temperaments~~.

== Near-equal vs near-equivalent ==

The term "near-equal just intonation" may refer specifically to nejis where the target scale is an [[equal-step tuning]] (i.e. the notes of the neji are near-equally spaced), or it may refer to any and all nejis (i.e. the neji's step sizes are nearly equal to the target scale's step sizes). Both uses of the term are acceptable.

~~== Building edo nemis ==~~

The term "near-equivalent just intonation" refers to any and all nejis. It is interchangeable with the second reading of "near-equal".

~~It's possible~~ to ~~create a working edo nemi by simply approximating an edo as closely as possible with selected harmonics~~. ~~However, it~~ is ~~sometimes preferable to build particular aesthetic choices into a nemi. One such common choice is to focus on a few intervals in~~ the ~~edo being~~ "~~nemified~~" which are of particular interest. The root harmonic is then selected to approximate these intervals of interest as well as possible; the remaining harmonics to fill in the rest of the edo are chosen based on their ability to fit well with the existing notes.

== See also ==

* [[Overtone scale]]

* [[NEJI ~~Tables~~]]

* [[NEJI tables]]

* [[Ringer scale]]

== Notes ==

@@ Line 5: / Line 5: @@
 | ja =
 }}
-A '''neji''' or '''NEJI''' (pronounced /nɛdʒi/ "nedgy"; for "near-equal [[just intonation]]") is a [[circulating temperament]] which approximates an [[Equal-step tuning|equal tuning]] dividing a JI [[equave]] into JI scale steps.
+A '''neji''' or '''NEJI''' (which can be pronounced /nɛdʒi/ "nedgy"; for "near-equivalent [[just intonation]]" or "near-equal just intonation") is a [[JI]] scale that is "nearly-equivalent" to an associated ''target scale'' (or ''target'' for short).  Nejis are designed with a focus on the harmonic resonance of the pitches in mind w.r.t their foreseen musical use. If the target scale is an [[edo]], a neji is technically also a type of [[well temperament]] for that edo.
-Due to the influence of Zhea Erose who originated the term, in colloquial usage ''neji'' often specifically refers to a subset of a mode of the [[harmonic series]] used to approximate an edo.
+== History ==
+The concept behind nejis is probably first proposed by [[George Secor]] in 2002<ref>[http://www.anaphoria.com/secor-blarney.html GEORGE SECOR - A BIT O' BLARNEY]</ref>, where he called it a '''quasi-equal rational tuning'''.
+The idea has also been suggested by [[Paul Erlich]] and a feature to generate them has existed in [[Scala]] since some time in the 1990's.
+The term ''neji'' was coined by [[Zhea Erose]].
-== Nemi ==
+Due to the influence of Zhea Erose who originated the term, the term "neji" has often been used in connection with naming [[#Harmodal nejis|harmodal nejis]] specifically, with other types of nejis being less common.
-A '''nemi''' or '''NEMI''' (near-equivalent modal intonation) is a scale which approximates some non-JI scale by dividing a JI equave with a subset of a mode of the harmonic series. The term ''neji'' may informally be used for nemis, e.g. "neji Lydian".
-== In primodality ==
+== Approaches to neji construction ==
-In [[Zhea Erose]]'s [[primodality]] theory, edo nemis can be used to explore a prime family (see [[primodality]]), while keeping the transposability, scale structures, rank-2 harmonic theory, notation, etc. associated with that edo. (The edo nemi's denominator need not be prime but primes may be preferred for sake of minimizing lower-complexity intervals. Zhea often uses semiprimes ''pq''.) Zhea Erose's theory also deals with modulations between different prime families, and combining different prime families into one scale.
+=== In primodality ===
+In Zhea Erose's [[primodality]] theory, nejis can be used to explore a prime family (see [[primodality]]), while keeping the transposability, scale structures, rank-2 harmonic theory, notation, etc. associated with the target scale (usually an [[edo]]). (The neji's denominator need not be prime but primes may be preferred for sake of minimizing lower-complexity intervals and maximizing unique ones specific to that prime. Zhea often uses semiprimes ''pq''.) Zhea Erose's theory also deals with modulations between different prime families, and combining different prime families into one scale.
-== History ==
+=== As harmonic segment subsets ===
-The concept behind nemi is probably first proposed by [[George Secor]] in 2002<ref>[http://www.anaphoria.com/secor-blarney.html GEORGE SECOR - A BIT O' BLARNEY]</ref>, where he called it a '''quasi-equal rational tuning'''.
+Generalizing from the primodal use case of the term "neji", one might choose any relatively low [[Glossary#H|harmonic series segment]], ''not necessarily in a way associated with primodality'', and select notes therefrom in order to build a neji with extra [[concordance]].
+This distinction is more process-based than formalized (because any JI scale trivially occurs as some (possibly very high) harmonic series segment subset); sometimes the pool of intervals is chosen to be a specific "relatively not large" harmonic series segment before notes are selected from it while other times it is guessed at in some "relatively not large" range and then later revised based on what fits (or other considerations). The "relatively not large" focuses on the following key observation of Zhea's that others have agreed with as a valuable observation in the design of JI scales:
+: If you focus on choosing intervals as representing different notes of your target ''without regard'' for the growing size of the implied denominator of the scale as a single chord, then the denominator will often grow ''rapidly'' to absurd numbers, ''especially'' if you are repeatedly stacking the same interval to reach some of the notes.
+Technically, this is a simplification of the observation, as you can take any incomplete harmodal neji and add some intervals that are "awkward" w.r.t the denominator to complete it and thus increase the denominator massively, but the scale will overall likely still sound pretty coherent, ''especially'' if those intervals simplify w.r.t other intervals of interest to the composer, so it is rather the spirit of the observation that your notes of interest should cohere with each-other within reason and that where they don't should ideally be intentional harmonic tensions in the scale accessible for musical use. This logic also shows why the line between [[neji]]s (in the general sense) and '''harmodal nejis''' (defined below) is even more "fuzzy" than one might initially think.
-The idea has also been suggested by [[Paul Erlich]] and a feature to produce them has existed in [[Scala]] for generating them since some time in the 1990's.
+==== Harmodal nejis ====
+If the neji belongs to a (''relatively not large'') harmonic segment and the target scale has a [[period]] equal to some positive integer harmonic (like the [[octave]], [[tritave]] or [[pentave]]), it is a "harmodal neji" (a contraction of "[[Harmonic mode|harmonic modal]] neji"), meaning primodal nejis are a type of harmodal neji. This period is typically an octave, as that's the most common use case. This term has found use before by Zhea but it should be noted it was proposed as a standard way to resolve an ambiguity in the meaning of the stand-alone term "neji", therefore please see the directly below alternative, which may be preferred for consistency/backwards-compatibility.
+==== Nonharmodal nejis ====
+An alternative to using the term "harmodal nejis" is to ''assume'' that a "neji" is harmodal ''by default'', and instead specify that a neji is "''nonharmodal''" only when necessary, in order to preserve the colloquial usage of the term "neji". This is consistent with the sentiment that there does not need to be a new term "harmodal neji", while retaining clarity.
-The term ''neji'' was coined by Zhea Erose. The term ''nemi'' was coined by [[User:Godtone]]; it is intended to be more faithful to the usual sense in which the term ''neji'' came to be used.
+=== Detempering ===
+A more ([[JI subgroup]]) lattice-based approach is [[detempering]]. Detempering entails that the neji has the property of being [[epimorphic]] (obeys the appropriate mapping logic) with respect to a [[regular temperament]] for a tempered scale, equal-division or otherwise.
-== Versus detempering ==
+Importantly and nontrivially, detempering is stricter than merely requiring that the target scale ''has'' a scale logic (that is, a [[mapping]]). Even in those cases where the target scale has a mapping, a neji might still approximate it without following its associated mapping. A detempering, however, must ''follow'' the mapping.
-Nejis are a superset of both [[detempering]] and edo nemis. Unlike detempering, a neji or a nemi need not imply a [[mapping]].
-Nemis are defined via intention rather than a mathematical definition, since any periodic JI scale is a subset of some harmonic series segment. Nemis require the rational pitch replacements to all be selected from a ''chosen'' harmonic series mode. This is not compulsory for detempered edos or nejis in general.
+=== Building edo nejis ===
+It's possible to create a working edo neji by simply approximating an edo as closely as possible with selected harmonics from a mode. However, it is sometimes preferable to build particular aesthetic choices into such a neji. One such common choice is to focus on a few intervals in the edo being "nejified" which are of particular interest. The root harmonic is then selected to approximate these intervals of interest as well as possible; the remaining harmonics to fill in the rest of the edo are chosen based on their ability to fit well with the existing notes.
-Nejis and nemis are compatible with [[regular temperament theory]] if they are treated as working in the concrete tuning layer of temperaments.
+== Near-equal vs near-equivalent ==
+The term "near-equal just intonation" may refer specifically to nejis where the target scale is an [[equal-step tuning]] (i.e. the notes of the neji are near-equally spaced), or it may refer to any and all nejis (i.e. the neji's step sizes are nearly equal to the target scale's step sizes). Both uses of the term are acceptable.
-== Building edo nemis ==
+The term "near-equivalent just intonation" refers to any and all nejis. It is interchangeable with the second reading of "near-equal".
-It's possible to create a working edo nemi by simply approximating an edo as closely as possible with selected harmonics. However, it is sometimes preferable to build particular aesthetic choices into a nemi. One such common choice is to focus on a few intervals in the edo being "nemified" which are of particular interest. The root harmonic is then selected to approximate these intervals of interest as well as possible; the remaining harmonics to fill in the rest of the edo are chosen based on their ability to fit well with the existing notes.
 == See also ==
 * [[Overtone scale]]
-* [[NEJI Tables]]
+* [[NEJI tables]]
+* [[Ringer scale]]
 == Notes ==