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'''Primodality''' (also informally called '''Zheanism''' after its originator [[Zhea Erose]]) is an approach to JI designed to emphasize the identity of the "tonic" as the ~~pth~~ harmonic and places importance on the particular timbre of ~~chords~~ with a given tonic. ~~Scales~~ and chords having the identity of the prime p as the tonic are collectively called a '''prime family''', and can be denoted simply by ''/p''. Zhea also uses various adjectives for specific primodalities, such as ''septimal, undecimal, tridecimal, septendecimal, novem(decimal)'' for /7, /11, /13, /17, /19, which are not to be confused with the use of these adjectives to denote prime limits.

{{interwiki

| de = Primodalität

| en = Primodality

| es =

| ja =

}}

'''Primodality''' (also informally called '''Zheanism''' after its originator [[Zhea Erose]]) is an approach to [[JI]] designed to emphasize the identity of the "tonic" as the p<sup>th</sup> [[harmonic]] and places importance on the particular [[timbre]] of [[chord]]s with a given tonic. [[Scale]]s and chords having the identity of the prime p as the tonic are collectively called a '''prime family''', and can be denoted simply by ''/p''. Zhea also uses various adjectives for specific primodalities, such as ''septimal, undecimal, tridecimal, septendecimal, novem(decimal)'' for /7, /11, /13, /17, and /19 respectively, which are not to be confused with the use of these adjectives to denote prime limits. (If disambiguation is needed, one can say ''over-7'' and ''7-limit'' respectively for the two meanings of ''septimal'', for instance.) Zhea's ideas are new in that she not only treats higher JI as different from close irrational tunings (as some, like [[Johnny Reinhard]], previously have done), but also claims that each prime comes with its own unique timbral "gestalt" which is in all chords built from small multiples of ''p'' (particularly 2''p'') as the tonic. The gestalt aspect is critical: while individual intervals in a primodal tuning may not be recognizable for what they are (using methods like harmonic entropy), when considered as a whole, their shared relationship to /p becomes apparent.

Most importantly, primodality sees any overtone as valuable on its own, rather than relative to some fundamental. Taking a specific overtone as a tonic ~~we can get its particular scales and colors and~~ even ~~versions of~~ "non-xenharmonic" scales, even when the corresponding fundamental is too low to be audible. In particular, primodality discards the concept of [[harmonic limit]], which Zhea considers an artificial way to look at JI harmony. Zhea argues that prime families are a more natural way to categorize intervals; intervals from the same prime family (intervals with a common denominator for example, all /2, all /11 or all /13) tend to blend better together. For example, it is preferable to add 21/16 to 4:5:6:7, rather than 4/3.

Most importantly, primodality sees any [[overtone]] as valuable on its own, rather than relative to some fundamental. Taking a specific overtone as a tonic, even "non-xenharmonic" scales are said to gain the gestalt identity particular to the overtone, even when the corresponding fundamental is too low to be audible. In particular, primodality discards the concept of [[harmonic limit]], which Zhea considers an artificial way to look at JI harmony. Zhea argues that prime families are a more natural way to categorize intervals; intervals from the same prime family (intervals with a common denominator for example, all /2, all /11 or all /13) tend to blend better together. For example, it is preferable to add [[21/16]] to 4:5:6:7 rather than [[4/3]], if one wants to retain the /2 gestalt (otherwise an /3 gestalt emerges from 12:15:16:18:21).

To construct a primodal scale, we fix a prime p to be the denominator and take intervals of the form n/p, where n ≥ p. Zhea often takes n to range over a certain "lineal segment" (Mode mp of the harmonic series where m is a positive integer) or a subset thereof.. For example, if we use p = 13 and take all n between 13 and 26 (inclusive), this would result in the scale 13:14:15:16:17:18:19:20:21:22:23:24:25:26. We may add a 3/2 to the scale root, which corresponds to adding 3p/p. (3/2 is a natural "halfway point" for harmonic scales, since if N is even, Mode N has a 3/2 as its N/2-th note.)

To construct a primodal scale, we fix a prime ''p'' to be the denominator and take intervals of the form ''n/p'', where ''n ≥ p''. Zhea often takes n to range over a certain "lineal segment" (Mode mp of the harmonic series where m is a positive integer) or a subset thereof. For example, if we use ''p = 13'' and take all ''n'' between 13 and 26 (inclusive), this would result in the scale ''13:14:15:16:17:18:19:20:21:22:23:24:25:26''. We may add a [[3/2]] to the scale root, which corresponds to adding 3p/p. (3/2 is a natural "halfway point" for harmonic scales, since if N is even, Mode N has a 3/2 as its N/2-th note.)

Primodality, and Zhea's microtonal theory overall, emphasize subtle timbral effects, as opposed to lower-complexity JI identities such as 4:5:6:7:9 that are more common in composite modes. Mode p and Mode 2p (called respectively the ''first'' and ''second octaves of /p'') are considered the most important for the identity of /p; those ~~intervals~~ are the most recognizable as distinct identities. For any prime p, the set of harmonics from p to 2p is unique in the sense that the sets {p/p, ..., 2p/p} and {n/n, ..., 2n/n} only intersect at {1/1, 2/1} for any positive integer n < p. Similarly, the second octaves of p and the second octave of any n < p only intersect at {1/1, 3/2, 2/1}.

Primodality, and Zhea's microtonal theory overall, emphasize subtle timbral effects, as opposed to lower-complexity JI identities such as 4:5:6:7:9 that are more common in composite modes. Mode p and Mode 2p (called respectively the ''first'' and ''second octaves of /p'') are considered the most important for the identity of /p; those [[interval]]s are the most recognizable as distinct identities. For any prime p, the set of harmonics from p to 2p is unique in the sense that the sets {p/p, ..., 2p/p} and {n/n, ..., 2n/n} only intersect at {1/1, 2/1} for any positive integer n < p. Similarly, the second octaves of p and the second octave of any n < p only intersect at {1/1, 3/2, 2/1}.

Primodality could be understood as the use of ''prime'' [[Overtone scale|modes of the harmonic series]] (hence "prime" + "mode" + "-ality") which is of musical interest because using a prime as the mode maximizes irreducible intervals; and as an additional step away from the exhibition of obvious low-limit JI intervals, primodality suggests the use of very ''large'' modes of the harmonic series (or subsets thereof), which as in [[8th Octave Overtone Tuning|higher harmonic tuning]] leverages JI instead for the "harmonic cloud" effect of a shared very low (sometimes infrasonic) fundamental.

== Neji ==

A '''~~neji~~''' ~~(pronounced /nɛdʒi/ "nedgy"; for "~~near-equal ~~JI") is an overtone series approximation of an [[EDO]]~~.

Primodality is often used in combination with another Zhea Erose technique: [[neji]] (or '''N'''ear-'''E'''qual '''J'''ust '''I'''ntonation) tunings, which can be used to preserve the primodal aspects while producing tunings with the benefit of near-equal intervals.

~~Nejis can be used to explore~~ a ~~prime family, while keeping the transposability, scale structures, rank~~-~~2 harmonic theory, notation, etc~~. ~~associated with that edo. (The neji~~'~~s denominator need not be prime.)~~

== Music ==

; [[Benyamind]]

* "A Story" from ''Microtonal archive'' (2018–2020) – [https://benyamind.bandcamp.com/track/a-story-novemdecimal-ji Bandcamp] | [https://youtu.be/KpiOqPr4m9M YouTube] – in the ''Novemdeca'' tuning

Zhea Erose'~~s theory also deals with modulations between different prime families~~, ~~and combining different prime families into one scale~~.

; [[Budjarn Lambeth]]

* [https://youtu.be/Qo3zR_s0H2o ''Music in Over-5 Just Intonation''] (2024) – in [[80afdo]]

; [[Francium]]

* [https://www.youtube.com/watch?v=PwvKS0RhTgs ''Spring Your Miracle''] (2026) – 23-primodal doubled by 88/87

; [[Zhea Erose]]

* ''Eurybia'' (2020) – [https://zheaerosemusic.bandcamp.com/track/eurybia Bandcamp] | [https://www.youtube.com/watch?v=ubPwKxcp87g YouTube] – 12-tone undecimal tuning

* [https://youtu.be/ZIn6uis5duw ''Novemdeca''] (2020) – 12-tone novemdecimal tuning

* [https://youtu.be/ZSUdXVI0tO0 ''Pandelia''] (2020) – in 2*17-primodal + 3/2

* ''WXTCHCRXFT'' (2020) – [https://zheaerosemusic.bandcamp.com/track/wxtchcrxft Bandcamp] | [https://www.youtube.com/watch?v=a63V_fAPNaA YouTube] – 29-tone [[neji]], 19*11 novemdecimal-undecimal hybrid + 8-tone, [[Interseptimal intervals|hypernaiadic]] /41

* [https://www.youtube.com/watch?v=3iWRlf3wrPs ''Spiritualistica''] (2020) – 12-tone undecimal tuning

* [https://www.youtube.com/watch?v=PIhFupdwv3M Timelessness](2021) – 12-tone undecimal tuning

* [https://www.youtube.com/watch?v=4BBdJly4-OY ''Fluorescence''] (2021) – 12-tone undecimal tuning for acoustic piano

~~== Music ==~~

*[https://youtu.be/ZIn6uis5duw Zhea Erose - Novemdeca (in a 12-note 19-primodal scale)]

*[https://youtu.be/ZSUdXVI0tO0 Zhea Erose - Pandelia (in 2*17-primodal + 3/2)]

*[https://youtu.be/KpiOqPr4m9M benyamind - A Story (in the Novemdeca tuning)]

== See also ==

* '''[[Primodal Archive]]''': Zhea's chord archive

* [[~~Oneirotonic#Primodal theory~~]]: ~~An attempt to apply Zhea's theory to oneirotonic (~~[[~~5L 3s]~~] ~~MOS) and its MODMOSes.~~

* [[Undecimal Primodality]]

* [https://www.youtube.com/live/KKxXdD-lkwI?si=2xbZJ7SD80bF6nWI Theory of Primodality]: Zhea’s educational livestream about primodality

** [https://sites.google.com/view/budjarnsarchive/home Google Sites archive including a transcript of the livestream]

** [https://web.archive.org/web/20240218055951/https://sites.google.com/view/budjarnsarchive/home Archive.org backup of the Google Site]

[[Category:Just intonation]]

[[Category:Primodality]]

[[Category:Primodality| ]]

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-'''Primodality''' (also informally called '''Zheanism''' after its originator [[Zhea Erose]]) is an approach to JI designed to emphasize the identity of the "tonic" as the pth harmonic and places importance on the particular timbre of chords with a given tonic. Scales and chords having the identity of the prime p as the tonic are collectively called a '''prime family''', and can be denoted simply by ''/p''. Zhea also uses various adjectives for specific primodalities, such as ''septimal, undecimal, tridecimal, septendecimal, novem(decimal)'' for /7, /11, /13, /17, /19, which are not to be confused with the use of these adjectives to denote prime limits.
+{{interwiki
+| de = Primodalität
+| en = Primodality
+| es =
+| ja =
+}}
+'''Primodality''' (also informally called '''Zheanism''' after its originator [[Zhea Erose]]) is an approach to [[JI]] designed to emphasize the identity of the "tonic" as the p<sup>th</sup> [[harmonic]] and places importance on the particular [[timbre]] of [[chord]]s with a given tonic. [[Scale]]s and chords having the identity of the prime p as the tonic are collectively called a '''prime family''', and can be denoted simply by ''/p''. Zhea also uses various adjectives for specific primodalities, such as ''septimal, undecimal, tridecimal, septendecimal, novem(decimal)'' for /7, /11, /13, /17, and /19 respectively, which are not to be confused with the use of these adjectives to denote prime limits. (If disambiguation is needed, one can say ''over-7'' and ''7-limit'' respectively for the two meanings of ''septimal'', for instance.) Zhea's ideas are new in that she not only treats higher JI as different from close irrational tunings (as some, like [[Johnny Reinhard]], previously have done), but also claims that each prime comes with its own unique timbral "gestalt" which is in all chords built from small multiples of ''p'' (particularly 2''p'') as the tonic. The gestalt aspect is critical: while individual intervals in a primodal tuning may not be recognizable for what they are (using methods like harmonic entropy), when considered as a whole, their shared relationship to /p becomes apparent.
-Most importantly, primodality sees any overtone as valuable on its own, rather than relative to some fundamental. Taking a specific overtone as a tonic we can get its particular scales and colors and even versions of "non-xenharmonic" scales, even when the corresponding fundamental is too low to be audible. In particular, primodality discards the concept of [[harmonic limit]], which Zhea considers an artificial way to look at JI harmony. Zhea argues that prime families are a more natural way to categorize intervals; intervals from the same prime family (intervals with a common denominator for example, all /2, all /11 or all /13) tend to blend better together. For example, it is preferable to add 21/16 to 4:5:6:7, rather than 4/3.
+Most importantly, primodality sees any [[overtone]] as valuable on its own, rather than relative to some fundamental. Taking a specific overtone as a tonic, even "non-xenharmonic" scales are said to gain the gestalt identity particular to the overtone, even when the corresponding fundamental is too low to be audible. In particular, primodality discards the concept of [[harmonic limit]], which Zhea considers an artificial way to look at JI harmony. Zhea argues that prime families are a more natural way to categorize intervals; intervals from the same prime family (intervals with a common denominator for example, all /2, all /11 or all /13) tend to blend better together. For example, it is preferable to add [[21/16]] to 4:5:6:7 rather than [[4/3]], if one wants to retain the /2 gestalt (otherwise an /3 gestalt emerges from 12:15:16:18:21).
-To construct a primodal scale, we fix a prime p to be the denominator and take intervals of the form n/p, where n ≥ p. Zhea often takes n to range over a certain "lineal segment" (Mode mp of the harmonic series where m is a positive integer) or a subset thereof.. For example, if we use p = 13 and take all n between 13 and 26 (inclusive), this would result in the scale 13:14:15:16:17:18:19:20:21:22:23:24:25:26. We may add a 3/2 to the scale root, which corresponds to adding 3p/p.  (3/2 is a natural "halfway point" for harmonic scales, since if N is even, Mode N has a 3/2 as its N/2-th note.)
+To construct a primodal scale, we fix a prime ''p'' to be the denominator and take intervals of the form ''n/p'', where ''n ≥ p''. Zhea often takes n to range over a certain "lineal segment" (Mode mp of the harmonic series where m is a positive integer) or a subset thereof. For example, if we use ''p = 13'' and take all ''n'' between 13 and 26 (inclusive), this would result in the scale ''13:14:15:16:17:18:19:20:21:22:23:24:25:26''. We may add a [[3/2]] to the scale root, which corresponds to adding 3p/p.  (3/2 is a natural "halfway point" for harmonic scales, since if N is even, Mode N has a 3/2 as its N/2-th note.)
-Primodality, and Zhea's microtonal theory overall, emphasize subtle timbral effects, as opposed to lower-complexity JI identities such as 4:5:6:7:9 that are more common in composite modes. Mode p and Mode 2p (called respectively the ''first'' and ''second octaves of /p'') are considered the most important for the identity of /p; those intervals are the most recognizable as distinct identities. For any prime p, the set of harmonics from p to 2p is unique in the sense that the sets {p/p, ..., 2p/p} and {n/n, ..., 2n/n} only intersect at {1/1, 2/1} for any positive integer n < p. Similarly, the second octaves of p and the second octave of any n < p only intersect at {1/1, 3/2, 2/1}.
+Primodality, and Zhea's microtonal theory overall, emphasize subtle timbral effects, as opposed to lower-complexity JI identities such as 4:5:6:7:9 that are more common in composite modes. Mode p and Mode 2p (called respectively the ''first'' and ''second octaves of /p'') are considered the most important for the identity of /p; those [[interval]]s are the most recognizable as distinct identities. For any prime p, the set of harmonics from p to 2p is unique in the sense that the sets {p/p, ..., 2p/p} and {n/n, ..., 2n/n} only intersect at {1/1, 2/1} for any positive integer n < p. Similarly, the second octaves of p and the second octave of any n < p only intersect at {1/1, 3/2, 2/1}.
+Primodality could be understood as the use of ''prime'' [[Overtone scale|modes of the harmonic series]] (hence "prime" + "mode" + "-ality") which is of musical interest because using a prime as the mode maximizes irreducible intervals; and as an additional step away from the exhibition of obvious low-limit JI intervals, primodality suggests the use of very ''large'' modes of the harmonic series (or subsets thereof), which as in [[8th Octave Overtone Tuning|higher harmonic tuning]] leverages JI instead for the "harmonic cloud" effect of a shared very low (sometimes infrasonic) fundamental.
 == Neji ==
-A '''neji''' (pronounced /nɛdʒi/ "nedgy"; for "near-equal JI") is an overtone series approximation of an [[EDO]].
+Primodality is often used in combination with another Zhea Erose technique: [[neji]] (or '''N'''ear-'''E'''qual '''J'''ust '''I'''ntonation) tunings, which can be used to preserve the primodal aspects while producing tunings with the benefit of near-equal intervals.
-Nejis can be used to explore a prime family, while keeping the transposability, scale structures, rank-2 harmonic theory, notation, etc. associated with that edo. (The neji's denominator need not be prime.)
+== Music ==
+; [[Benyamind]]
+* "A Story" from ''Microtonal archive'' (2018–2020) – [https://benyamind.bandcamp.com/track/a-story-novemdecimal-ji Bandcamp] | [https://youtu.be/KpiOqPr4m9M YouTube] – in the ''Novemdeca'' tuning
-Zhea Erose's theory also deals with modulations between different prime families, and combining different prime families into one scale.
+; [[Budjarn Lambeth]]
+* [https://youtu.be/Qo3zR_s0H2o ''Music in Over-5 Just Intonation''] (2024) – in [[80afdo]]
+; [[Francium]]
+* [https://www.youtube.com/watch?v=PwvKS0RhTgs ''Spring Your Miracle''] (2026) – 23-primodal doubled by 88/87
+; [[Zhea Erose]]
+* ''Eurybia'' (2020) – [https://zheaerosemusic.bandcamp.com/track/eurybia Bandcamp] | [https://www.youtube.com/watch?v=ubPwKxcp87g YouTube] – 12-tone undecimal tuning
+* [https://youtu.be/ZIn6uis5duw ''Novemdeca''] (2020) – 12-tone novemdecimal tuning
+* [https://youtu.be/ZSUdXVI0tO0 ''Pandelia''] (2020) – in 2*17-primodal + 3/2
+* ''WXTCHCRXFT'' (2020) – [https://zheaerosemusic.bandcamp.com/track/wxtchcrxft Bandcamp] | [https://www.youtube.com/watch?v=a63V_fAPNaA YouTube] –  29-tone [[neji]], 19*11 novemdecimal-undecimal hybrid + 8-tone, [[Interseptimal intervals|hypernaiadic]] /41
+* [https://www.youtube.com/watch?v=3iWRlf3wrPs ''Spiritualistica''] (2020) – 12-tone undecimal tuning
+* [https://www.youtube.com/watch?v=PIhFupdwv3M Timelessness](2021) – 12-tone undecimal tuning
+* [https://www.youtube.com/watch?v=4BBdJly4-OY ''Fluorescence''] (2021) – 12-tone undecimal tuning for acoustic piano
-== Music ==
-*[https://youtu.be/ZIn6uis5duw Zhea Erose - Novemdeca (in a 12-note 19-primodal scale)]
-*[https://youtu.be/ZSUdXVI0tO0 Zhea Erose - Pandelia (in 2*17-primodal + 3/2)]
-*[https://youtu.be/KpiOqPr4m9M benyamind - A Story (in the Novemdeca tuning)]
 == See also ==
 * '''[[Primodal Archive]]''': Zhea's chord archive
-* [[Oneirotonic#Primodal theory]]: An attempt to apply Zhea's theory to oneirotonic ([[5L 3s]] MOS) and its MODMOSes.
+* [[Undecimal Primodality]]
+* [https://www.youtube.com/live/KKxXdD-lkwI?si=2xbZJ7SD80bF6nWI Theory of Primodality]: Zhea’s educational livestream about primodality
+** [https://sites.google.com/view/budjarnsarchive/home Google Sites archive including a transcript of the livestream]
+** [https://web.archive.org/web/20240218055951/https://sites.google.com/view/budjarnsarchive/home Archive.org backup of the Google Site]
 [[Category:Just intonation]]
-[[Category:Primodality]]
+[[Category:Primodality| ]] <!--main article-->