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'''TAMNAMS''' (read "tame names"; from '''''T'''emperament-'''A'''gnostic '''M'''OS '''NAM'''ing '''S'''ystem''), devised by the XA Discord, is an attempt at a system of temperament-agnostic names for octave-MOS scales and their associated generator ranges, taking into account the relative sizes of large and small steps.  
{{Mbox|text=The content of this page is maintained by '''members of the Xenharmonic Alliance Discord'''. If you have any questions, spot any errors, or have any suggestions, be sure to ask there!}}
 
'''TAMNAMS''' (from '''''T'''emperament-'''A'''gnostic '''M'''os '''NAM'''ing '''S'''ystem'', read as /ˈteɪmneɪmz/ or /ˈtæmnæmz/), devised by the XA Discord in 2021, is a system of temperament-agnostic names for scales—primarily [[Octave equivalence|octave-equivalent]] [[moment of symmetry]] scales—as well as their intervals, their associated generator ranges, and the ratios describing the proportions of large and small steps.
 
The goal of TAMNAMS is to allow musicians and theorists to discuss moment-of-symmetry scales, or mosses, independent of the language of [[regular temperament theory]]. For example, the names ''flattone[7]'', ''meantone[7]'', ''pythagorean[7]'', and ''superpyth[7]'' all describe the same step pattern of 5L 2s, with different proportions of large and small steps. Under TAMNAMS parlance, these names can be described broadly as ''soft 5L 2s'' (for flattone and meantone) and ''hard 5L 2s'' (for pythagorean and superpyth). For discussions of the step pattern itself, the name ''5L 2s'' or, in this example, ''diatonic'', is used.
 
== Credits ==
This page and its associated pages were mainly written by [[User:Godtone]], [[User:SupahstarSaga]], [[User:Inthar]], and [[User:Ganaram inukshuk]].
 
== Step ratio spectrum ==
== Step ratio spectrum ==
The TAMNAMS system names nine specific simple L:s ratios.
{{Main| Step ratio }}TAMNAMS names nine specific simple [[Blackwood's R|L:s ratios]] tabulated below, which correspond to the simplest edos that have the mos scale. The two extremes, equalized and collapsed, are degenerate cases and define the boundaries for valid tuning ranges. An equalized mos has large and small steps be the same size ({{nowrap|L {{=}} s}}), so the mos pattern is no longer apparent. A collapsed mos has small steps shrunken down to zero ({{nowrap|s {{=}} 0}}), merging adjacent tones s apart into a single tone. In both cases, the mos structure is no longer valid.
{| class="wikitable"
 
|+Step ratio names
In between the nine specific ratios there are eight named intermediate ranges of step ratios. These names are useful for classifying mos tunings which don't match any of the nine simple step ratios. There are also two additional terms for broader ranges: the term ''hyposoft'' describes step ratios that are ''soft-of-basic'' but not as soft as 3:2; similarly, the term ''hypohard'' describes step ratios that are ''hard-of-basic'' but not as hard as 3:1.
!TAMNAMS Name
 
!Ratio
By default, all ranges include their endpoints. For example, a hard tuning is considered a quasihard tuning. To exclude endpoints, the modifier ''strict'' can be used, for example ''strict hyposoft''.
!Diatonic example
 
In some cases it can be clearer to name step ratio ranges by their ranges in hardness (for example, 1-1.33 for ultrasoft) or by their boundary step ratios (for example, equalized-to-supersoft for ultrasoft) than by the step ratio ranges tabulated here.
 
{| class="wikitable center-all"
|+ style="font-size: 105%;" | Spectrum of step ratio ranges and specific step ratios
|-
|-
|Equalized
! colspan="3" | Step ratio ranges
|L:s = 1:1
! Specific<br />step ratios
|7edo
! Hardness
! Notes
|-
|-
|Supersoft
|  
|L:s = 4:3
|  
|26edo
|
| '''1:1<br />(equalized)'''
| 1
| Trivial/pathological
|-
|-
|Soft
| rowspan="7" | 1:1 to 2:1<br />(soft-of-basic)
|L:s = 3:2
| colspan="2" | 1:1 to 4:3<br />(ultrasoft)
|19edo
|
|
| Step ratios especially close to 1:1 may be called pseudoequalized
|-
|-
|Semisoft
|  
|L:s = 5:3
|  
|31edo
| '''4:3<br />(supersoft)'''
| 1.33
|  
|-
|-
|Basic (or quintessential)
| colspan="2" | 4:3 to 3:2<br />(parasoft)
|L:s = 2:1
|  
|12edo
|  
|
|-
|-
|Semihard
|  
|L:s = 5:2
|  
|29edo
| '''3:2<br />(soft)'''
| 1.5
| Also called monosoft
|-
|-
|Hard
| rowspan="3" | 3:2 to 2:1<br />(hyposoft)
|L:s = 3:1
| 3:2 to 5:3<br />(quasisoft)
|17edo
|
|
|  
|-
|-
|Superhard
|  
|L:s = 4:1
| '''5:3<br />(semisoft)'''
|22edo
| 1.67
|-
|  
|Paucitonic (from "few tones")
|L:s = 1:0
|5edo
|}
For example, the 5L2s (diatonic) scale of 19edo has a step ratio of 3:2, which is "soft". We call the 19edo diatonic scale "soft diatonic". Tunings of a MOS with L:s larger are "harder", and tunings with L:s smaller are "softer".
 
The two extremes, equalized and paucitonic, are degenerate cases. An equalized MOS has L equal to s, so the MOS pattern is no longer apparent. A paucitonic MOS has s = 0, merging adjacent tones s apart into a single tone. In both cases, the MOS structure is no longer valid.
 
In between the nine specific ratios there are eight ranges of ratios. Each range has a name. These names are useful for classifying MOS tunings which don't match any of the nine simple step ratios. ''Hypohard'' could be used for tunings that are harder than basic but not as hard as the 3:1 tuning; similarly, ''hyposoft'' can be used for the range between soft and basic. Finally, there is ''pan-hard'' and ''pan-soft'' for the whole 'hard-of-basic' range and the whole 'soft-of-basic' range,respectively.
 
By default, all ranges include their endpoints. For example, a hard tuning is considered a quasihard tuning. To exclude endpoints, the modifier "strict" can be used, for example "strict hyposoft".
{| class="wikitable"
|+Intermediate ranges
!TAMNAMS Name
!Range
|-
|-
|Pansoft
| 5:3 to 2:1<br />(minisoft)
|1:1 ≤ L:s ≤ 2:1
|
|
|
|-
|-
|Ultrasoft
|  
|1:1 ≤ L:s ≤ 4:3
|  
|
| '''2:1<br />(basic)'''
| 2
|
|-
|-
|Parasoft
| rowspan="7" | 2:1 to 1:0<br />(hard-of-basic)
|4:3 ≤ L:s ≤ 3:2
| rowspan="3" | 2:1 to 3:1<br />(hypohard)
| 2:1 to 5:2<br />(minihard)
|
|
|
|-
|-
|Quasisoft
|  
|3:2 ≤ L:s ≤ 5:3
| '''5:2<br />(semihard)'''
| 2.5
|
|-
|-
|Minisoft
| 5:2 to 3:1<br />(quasihard)
|5:3 ≤ L:s ≤ 2:1
|
|
|
|-
|-
|Minihard
|  
|2:1 ≤ L:s ≤ 5:2
|  
| '''3:1<br />(hard)'''
| 3
| Also called monohard
|-
|-
|Quasihard
| colspan="2" | 3:1 to 4:1<br />(parahard)
|5:2 ≤ L:s ≤ 3:1
|
|
|
|-
|-
|Parahard
|  
|3:1 ≤ L:s ≤ 4:1
|  
| '''4:1<br />(superhard)'''
| 4
|
|-
|-
|Ultrahard
| colspan="2" | 4:1 to 1:0<br />(ultrahard)
|4:1 ≤ L:s ≤ 1:0
|
|
| Step ratios especially close to 1:0 may be called pseudocollapsed
|-
|-
|Panhard
|  
|2:1 ≤ L:s ≤ 1:0
|  
|
| '''1:0<br />(collapsed)'''
| infinity
| Trivial/pathological
|}
|}
=== Derivation ===
The idea is to start with the simplest ratios (L/s = 1/0 and L/s = 1/1) and derive more complex ratios through repeated application of the [[mediant]] (aka Farey addition) to adjacent fractions.
* Applying the mediant to the starting intervals 1/0 and 1/1 gives (1+1)/(1+0) = 2/1, and as this is the simplest possible ratio where the large and small step are distinguished and nonzero, it is called the "quintessential" ("quintess." or "essential" for short) or "basic" tuning. (Note that if applying the mediant to 1/0 seems confusing, think of it as equivalent to applying the mediant to 0/1 and 1/1 and the ratios as flipped, thus representing s/L rather than L/s when written this way.)
* As L/s = 1/1 represents L and s being equal in size, it is called "equalized".
* As L/s = 1/0 represents s = 0, it is called "paucitonic", meaning "few tones", as the resulting scale is also equalized but with fewer tones per period than expected.
* The mediant of 1/1 and 2/1 is 3/2, thus making the scale sound mellower/softer, and as this is the simplest (in the sense of lowest [[Odd limit#Relationship_to_other_limits|integer limit]]) ratio to represent such a property, it is simply called the "soft" tuning.
* Analogously, the mediant of 2/1 and 1/0, 3/1, is called the "hard" tuning. Thus you can say that a step ratio tuning is "hard of" or "soft of" another step ratio tuning.
* To get something between soft and basic we take the mediant again and get 5/3 for "semisoft", and analogously 5/2 for "semihard". To get something more extreme we take the mediant of 1/0 with 3/1 for a harder-than-hard tuning, giving us 4/1 for "superhard" and analogously 4/3 for "supersoft".
There are also tertiary names beyond the above:
* Anything softer than supersoft is "ultrasoft," and anything harder than superhard is "ultrahard". Something between soft and supersoft is "parasoft", as "para-" means both "beyond" and "next to". Something between hard and superhard is "parahard".
* Something between soft and basic is "hyposoft" as it is less soft than soft. Something between hard and basic is "hypohard" for the same reason. Between semisoft and quintessential is "minisoft" and between semihard and quintessential is "minihard".
* Finally, between soft and semisoft is "quasisoft" as such scales may potentially be mistaken for soft or semisoft while not being either - hence the use of the prefix "quasi-", and between hard and semihard is "quasihard" for the same reason.
The reasoning for the "para- super- ultra-" progression (note that "super-" is the odd one out as it refers to an exact ratio) is it mirrors naming for shades of musical intervals and because "parapythagorean" is between "pythagorean" and "superpythagorean".
This results in the "central spectrum" below - an elegant system which names all exact L/s ratios in the 5-integer-limit excepting only 5/1 and 5/4 which are disincluded intentionally for a variety of reasons: to keep the maximum corresponding notes per period in an [[EPD|equal pitch division]] low, because it keeps the 'tree' of mediants complete to a certain number of layers, and because their disinclusion gives a roughly-equally-spaced set of ratios, with the regions between 4/3 and 1/1 and between 4/1 and 1/0 being the only exceptions - corresponding to extreme tunings. Note that filling in those extreme regions is the purpose of the extended spectrum, detailed after.
=== Central spectrum ===
'''Equalized''': L/s = 1/1 (trivial/pathological)
::: ('''Ultrasoft''' range here, may also be called "pseudoequalized" if especially close to equalized.)
:: '''Supersoft''': L/s = 4/3
::: ('''Parasoft''' range here.)
: '''Soft''': L/s = 3/2
::: (Beginning of '''hyposoft''' range here.)
::: ('''Quasisoft''' range here.)
:: '''Semisoft''': L/s = 5/3
::: ('''Minisoft''' range here.)
::: (End of '''hyposoft''' range here.)
'''Quintesssential''': L/s = 2/1
::: (Beginning of '''hypohard''' range here.)
::: ('''Minihard''' range here.)
:: '''Semihard''': L/s = 5/2
::: ('''Quasihard''' range here.)
::: (End of '''hypohard''' range here.)
: '''Hard''': L/s = 3/1
::: ('''Parahard''' range here.)
:: '''Superhard''': L/s = 4/1
::: ('''Ultrahard''' range here, may also be called "pseudopaucitonic" if especially close to paucitonic.)
'''Paucitonic''': L/s = 1/0 = infinity (trivial/pathological)
=== Extending the spectrum's edges ===
Extending the spectrum builds on the central spectrum and relies on a few key observations. Firstly, as periods and MOSSes come in wildly different shapes and sizes, and as we want to represent a somewhat representative variety of "simple" tunings for the step ratio for a given MOS pattern and period, the notion of "simple" used will correspond to the number of equally-spaced tones per period required. This is expressed as [number of large steps in pattern]*L + [number of small steps in pattern]*s, where L and s are from the step ratio itself, L/s, and are assumed to be coprime. Then, in order to not introduce bias to MOS patterns with more L's or more s's, we should assume that both are equally likely and thus weight both equally, which means that the resulting minimum number of tones per period for a ratio L/s is L+s. The next observation is that the large values of L/s can be a lot more consequential than the ones close to 1/1 due to the fact that small steps are guaranteed to be smaller than large steps and that we don't know how many small steps there are compared to large steps, and therefore the "hard" end of the spectrum is more vast, and analogously, L/s values close to 1/1 will tend to be inconsequential and for very close values likely impractical to distinguish - in the extremes only serving small tuning adjustments rather than melodic properties. This leads to another observation: MOS patterns with periods tuned to step ratios, while related to temperaments, ''are not'' temperaments - instead forming a sort of amalgamative superset of temperaments if you want to force a temperament interpretation, and thus their main function is in melodic structure, with temperaments informing potential harmonies and microtunings. Thus, the spectrum should be kept minimal and simple so that it is both generally hearable and not too specific.
The most obvious adjustment to the edges is to draw a distinction between "ultrasoft" and "pseudoequalized" by adding a step ratio corresponding to "semiequalized", and between "ultrahard" and "pseudopaucitonic" by adding a step ratio corresponding to "semipaucitonic". Thus:
'''Ultrasoft''' is between '''supersoft''' and '''semiequalized''' and '''pseudoequalized''' is between '''semiequalized''' and '''equalized'''.
'''Ultrahard''' is between '''superhard''' and '''semipaucitonic''', and '''pseudopaucitonic''' is between '''semipaucitonic''' and '''paucitonic'''.
Then all that's left is to decide what the step ratios for semipaucitonic and semiequalized should be. In order to keep the spacing (of the s/L ratios when graphed, or to a lesser extent the L/s ratios if you see the roughly gradual increase in spacing in that form) roughly consistent with all the other ratios, '''semiequalized''' should be L/s = 6/5 rather than L/s = 5/4. Then note the complexity of L/s = 6/5 is 6+5=11, so to find the corresponding complexity for '''semipaucitonic''' we use L/s = 10/1 as 10+1=11 too. Then finally, to preserve some of the symmetry, we include L/s = 6/1 as '''extrahard'''. Although L/s = 10/1 for '''semipaucitonic''' may seem a little extreme of a boundary, L/s = 12/1 would actually be what is the most "equally spaced" continuing on from 6/1 for the same reason that L/s = 6/5 is the most "equally spaced". Note that while the range from '''superhard''' to '''semipaucitonic''' is '''ultrahard''', the region may be split into two sub-ranges:
'''superhard''' (L/s=4/1) to '''extrahard''' (L/s=6/1) is '''hyperhard''' (4 < L/s < 6).
'''extrahard''' (L/s=6/1) to '''semipaucitonic''' (L/s=10/1) is '''clustered''' (6 < L/s < 10).
With the inclusion of these 3 new L/s rations nearer the edges of the spectrum and names for the range divisions they create, we get the extended spectrum, summarised and detailed below, just for the regions affected to avoid repetition.


=== Extended spectrum ===
=== Extended spectrum ===
'''Equalized''': L/s = 1/1 (trivial/pathological)
{{Main|TAMNAMS/Appendix#Extended spectrum}}
See [[TAMNAMS/Appendix#Extended spectrum]] which details a more complete glossary that this set of terms is a subset of.


::: ('''Pseudoequalized''' range here.)
== Naming mos intervals ==
Mos intervals are denoted as a ''quantity'' of '''mossteps''', large or small. An interval that is k mossteps wide is referred to as a ''k-mosstep interval'' or simply ''k-mosstep'' (abbreviated as ''k''ms). A mos's intervals are a 0-mosstep or [[1/1|''unison'']], followed by a 1-mosstep, then a 2-mosstep, and so on, until an n-mosstep interval equal to the ''period'' is reached, where n is thus the number of pitches in the mos per period. If a positive integer multiple of the period equals an octave (or some close approximation thereof), that interval can be referred to plainly as an octave if one prefers, but ''mosoctave'' should not be used unless there is exactly 7 notes per octave. The prefix of mos- in the term mosstep may be replaced with the mos's prefix, specified in the section mos pattern names.


:: '''Semiequalized''': L/s = 6/5
In contexts where it doesn't cause ambiguity, the term ''k-mosstep'' can be shortened to ''k-step'', which allows for generalizing terminology described here to non-mos scales. Additionally, for [[non-octave]] scales that assume some generalisation of [[octave equivalence]], the term ''octave'' is replaced with the term ''equave''. Note this also means that if an n-mosstep interval is an octave, this can be referred to as the ''mosequave'' unambiguously and unconfusingly, regardless of what positive integer ''n'' is.


::: ('''Ultrasoft''' range here.)
This section's running example will be [[3L&nbsp;4s]].


:: '''Supersoft''': L/s = 4/3
=== Naming specific mos intervals ===
The phrase ''k-mosstep'' by itself does not specify the exact size of an interval. To refer to specific intervals, the familiar modifiers of ''major'', ''minor'', ''augmented'', ''diminished'' and ''perfect'' are used. As mosses have [[maximum variety]] 2, every interval (except for the [[1/1|unison]] and multiples of the [[period]] which is usually the [[2/1|octave]]) will be in no more than two sizes.


(4/3 < L/s < 4/1 range here, called the '''nonextreme''' range, detailed by central spectrum.)
The modifiers of ''major'', ''minor'', ''augmented'', ''perfect'', and ''diminished'' (abbreviated as M, m, A, P, and d respectively) are given as such:
* Integer multiples of the period, such as the unison and (often but not always) the octave, are '''perfect''' because they only have one size each.
* The generating intervals, or generators, are referred to as '''perfect'''. Note that a mos actually has two generators—a bright and dark generator—and both generators have two sizes each, specifically, the only time the less common size appears is at the end of the generator chain. For our running example of 3L&nbsp;4s, the generators are a 2-mosstep and 5-mosstep (the following subsection explains how to find these). Referring to a mos's generating intervals usually implies its perfect form (a.k.a the common form); specifically:
** The large size of the bright generator is '''perfect''', and the small size is '''diminished'''.
** The large size of the dark generator is '''augmented''', and the small size is '''perfect'''.
* For all other intervals, the large size is '''major''' and the small size is '''minor'''.
* For k-mossteps where k is greater than the number of pitches in the mos, those intervals have the same modifiers as an octave-reduced interval. Similarly, multiples of the octave are perfect, as are generators raised by some multiple of the octave.
For multi-period mosses, note that both the bright and dark generators appear in every period, not just every octave, as what it means for a mos to be multi-period is that there is multiple periods per octave so that some number of periods is (intended to be interpreted to) equal the octave. Therefore, generators that are raised or lowered by some integer multiple of the mos's period are also '''perfect'''. There is an important exception in interval naming for ''n''L&nbsp;''n''s mosses, in which the generators are '''major''' and '''minor''' (for the bright and dark generator respectively) rather than augmented, perfect and diminished, and all other intervals (the octave, unison and multiples of the period) are perfect as would be expected. This is to prevent ambiguity over calling every interval present perfect.


:: '''Superhard''': L/s = 4/1
{| class="wikitable"
|+ style="font-size: 105%;" | Names for mos intervals for 3L&nbsp;4s
|-
! Interval classes
! Specific intervals
! Interval size
! Abbreviation
! Gens up
|-
| 0-mosstep (unison)
| Perfect unison
| 0
| P0ms
| 0
|-
| rowspan="2" | 1-mosstep
| Minor mosstep (or small mosstep)
| s
| m1ms
| −3
|-
| Major mosstep (or large mosstep)
| L
| M1ms
| 4
|-
| rowspan="2" | '''2-mosstep'''
| Diminished 2-mosstep
| 2s
| d2ms
| −6
|-
| '''Perfect 2-mosstep'''
| L + s
| P2ms
| 1
|-
| rowspan="2" | 3-mosstep
| Minor 3-mosstep
| 1L + 2s
| m3ms
| −2
|-
| Major 3-mosstep
| 2L + s
| M3ms
| 5
|-
| rowspan="2" | 4-mosstep
| Minor 4-mosstep
| 1L + 3s
| m4ms
| −5
|-
| Major 4-mosstep
| 2L + 2s
| M4ms
| 2
|-
| rowspan="2" | '''5-mosstep'''
| '''Perfect 5-mosstep'''
| 2L + 3s
| P5ms
| −1
|-
| Augmented 5-mosstep
| 3L + 2s
| A5ms
| 6
|-
| rowspan="2" | 6-mosstep
| Minor 6-mosstep
| 2L + 4s
| m6ms
| −4
|-
| Major 6-mosstep
| 3L + 3s
| M6ms
| 3
|-
| 7-mosstep (octave)
| Perfect octave
| 3L + 4s
| P7ms
| 0
|}


::: (Beginning of '''ultrahard''' range here.)
=== Naming alterations by a chroma ===
TAMNAMS also uses the modifiers of ''augmented'' and ''diminished'' to refer to ''alterations'' of a mos interval, much like with using sharps and flats in standard notation. Mos intervals are altered by raising or lowering it by a ''moschroma'' (or simply ''chroma'', if context allows), a generalized sharp/flat that is the difference between a large step and a small step. Raising a minor mos interval by a chroma makes it major; the reverse is true. Raising a major or perfect mos interval repeatedly makes an augmented, doubly-augmented, and a triply-augmented mos interval. Likewise, lowering a minor or perfect mos interval repeatedly makes a diminished, doubly-diminished, and a triply-diminished mos interval. A unison, period or equave that is itself augmented or diminished may also be referred to a ''mosaugmented'' or ''mosdiminished'' unison, period or equave, respectively. Here, the meaning of unison and octave does not change depending on the mos pattern, but the meanings of augmented and diminished do.


::: ('''Hyperhard''' range here.)
Repetition of "A" or "d" is used to denote repeatedly augmented/diminished mos intervals, and is sufficient in most cases. It's typically uncommon to alter an interval more than three times, such as with a quadruply-augmented and quadruply-diminished interval; in such cases, it's preferable to use a shorthand such as A^n and d^n, or to use alternate notation or terminology.


:: '''Extrahard''': L/s = 6/1
{| class="wikitable"
|+ style="font-size: 105%;" | Table of alterations, with abbreviations
|-
! Number of chromas
! Perfect intervals
! Major/minor intervals
|-
| +3 chromas
| Triply-augmented (AAA, A³, or A^3)
| Triply-augmented (AAA, A³, or A^3)
|-
| +2 chromas
| Doubly-augmented (AA)
| Doubly-augmented (AA)
|-
| +1 chroma
| Augmented (A)
| Augmented (A)
|-
| rowspan="2" | 0 chromas (unaltered)
| rowspan="2" | Perfect (P)
| Major (M)
|-
| Minor (m)
|-
| −1 chroma
| Diminished (d)
| Diminished (d)
|-
| −2 chromas
| Doubly-diminished (dd)
| Doubly-diminished (dd)
|-
| −3 chromas
| Triply-diminished (ddd, d³, or d^3)
| Triply-diminished (ddd, d³, or d^3)
|}


::: ('''Clustered''' range here.)
=== Smaller intervals ===
 
{| class="wikitable"
::: (End of '''ultrahard''' range here.)
|+ style="font-size: 105%;" | Mos intervals smaller than a moschroma
|-
! Interval name
! Absolute value of a...
|-
| Moschroma (generalized [[chroma]], provided for reference)
| Large step minus a small step
|-
| Mosdiesis (generalized [[Diesis (scale theory)|diesis]])
| Large step minus two small steps
|-
| Moskleisma (generalized [[kleisma]])
| Mosdiesis minus a moschroma
|-
| Mosgothma (generalized gothma)
| Mosdiesis minus a small step
|}


:: '''Semipaucitonic''': L/s = 10/1
=== Naming neutral and interordinal intervals===
For a discussion of semi-moschroma-altered versions of mos intervals, see [[Neutral and interordinal k-mossteps]].


::: ('''Pseudopaucitonic''' range here.)
=== Other terminology ===
The tonic (unison), the period, the generator and the period-complement of the generator make up all the intervals in any given mos scale that might be labelled "perfect". With the exception of the tonic and the period, they may also be "imperfect". Therefore, the degrees of a mos scale which come in a "perfect" variety are called ''perfectable'' degrees and the degrees of a mos scale which do not come in a "perfect" variety are called ''non-perfectable'' degrees.


'''Paucitonic''': L/s = 1/0 = infinity (trivial/pathological)
== Naming mos degrees ==
Individual mos degrees, (that is, specific notes of a mos scale,) or '''k-mosdegrees''' (abbreviated ''k''md), are based on the modifiers given to intervals using the process for naming mos intervals and alterations. Mosdegrees are 0-indexed and are enumerated starting at the 0-mosdegree, the tonic/root of the scale. For example, if you go up a major k-mosstep up from the root, then the mos degree reached this way is a major k-mosdegree. Much like mossteps, the prefix of mos- may also be replaced with the mos's prefix. If context allows, ''k-mosdegree'' may also be shortened to ''k-degree'' to allow generalization to non-mos scales. When the modifiers major/minor or augmented/perfect/diminished are omitted, they are assumed to be the unmodified degrees of the current mode.


=== Terminology and final notes ===
=== Naming mos chords ===
A ratio of L/s = k/1 can be called ''k-hard'' and a ratio of L/s = k/(k-1) can analogously be called ''k-soft'', so the simplest ultrasoft tuning is 5-soft or "pentasoft", the simplest hyperhard tuning is 5-hard or "pentahard", the simplest clustered tuning is 7-hard or "heptahard", 8-hard is "octahard", 9-hard is "nonahard", and finally, the characteristic simple ultrahard tuning is 6-hard or "extrahard", as previously discussed, which can be seen to be similar to "hexahard" - hopefully helping with memorisation.
To denote a chord or a mode on a given degree, write the notes of the chord separated by spaces or commas, or the mode, in parentheses after the degree symbol. The most explicit option is to write out the chord in cents, edosteps or mossteps (e.g. in [[13edo]] [[5L&nbsp;3s]], the ({{nowrap|0 369 646}}) chord can be written ({{nowrap|0 4 7}})\13, ({{nowrap|P0ms M2ms M4ms}}), or {{nowrap|7{{!}}0 (0 2 4ms)}} and to write the mode. To save space, you can use whatever names or abbreviations for the chord or mode you have defined for the reader. For example, in the LsLLsLLs mode of 5L&nbsp;3s, we have m2md(0 369 646), or the chord ({{nowrap|0 369 646}}) on the 2-mosdegree which is a minor 2-mosstep. The LsLLsLLs mode also has m2md(7|0), meaning that we have the 7|&nbsp;(LLsLLsLs) mode on the 2-mosdegree which is a minor 2-mosstep in LsLLsLLs (see [[TAMNAMS#Proposal:%20Naming%20mos%20modes|below]] for the convention we have used to name the mode).


A perhaps useful (or otherwise mildly amusing) mnemonic is "2-soft is too soft to be hard and 2-hard is too hard to be soft", representing that 2-soft = 2-hard = 2/1 = '''basic'''.
To analyze a chord as an inversion of another chord (i.e. when the bass is not seen as the root), the following strategies can be used:
# One can write the root degree first: (6s, 0s, 2s, 7s). The first degree is assumed to be the tonic unless the following method is used:
# One can write "T" to the left of the tonic: (0s, 2s, T6s, 7s).
# One can use 0 for the root, using negative numbers for notes below the root. For example, to analyze (0s, 2s, 6s, 7s) on the 7-degree of the LsLLsLLs mode as being rooted on its 6s (thus on the 5-degree of LsLLsLLs), we write 5d(0s, −6s, −4s, 1s). The "5d" here is essential for avoiding confusion with the previous notation.
# If clarity is desired as to what the root position chord is, slash notation can be used as in conventional notation. Thus the above chord can be written 5d(0s 1s 2s 4s)/7d.


Note that often the central spectrum will be sufficient for exploring a MOS pattern-period combination, and the extended spectrum is intended more for (literally) edge cases where it may be useful. Often if a temperament interpretation doesn't seem to show up for a MOS  pattern-period combination, it just means the temperament needs a more complex MOS pattern to narrow down the generator range. An example of this phenomena is the highly complex MOS pattern of [[12L 17s]] represents near-Pythagorean tunings well due to having a generator of a fourth or a fifth bounded between those of [[12edo]] and those of [[29edo]], which are roughly equally off but in opposite directions, and many important near-Pythagorean systems show up in just the ratios of the central spectrum alone.
== Mos pattern names==
TAMNAMS uses the following names for selected small mosses. These names are optional; interval size names and step ratio names can be combined with conventional ''xL ys'' names. For example: ''21edo is the soft [[5L&nbsp;3s]] tuning and its major 2-step is a neutral third of size 342.9 cents.''


== Naming MOS intervals ==
Some of the names come from older temperament-agnostic mos names, such as names (such as ''mosh'') from [[Graham Breed]]'s [[Graham Breed's MOS naming scheme|mos names]]. These names have been coined so that mosses can be discussed more independently of RTT temperaments. Sometimes the prefix has a different source than the scale name for euphonic reasons.
To denote interval classes within the MOS, TAMNAMS uses the generic prefix ''mos-'', or the specific prefixes and abbreviations listed under "MOS pattern names". Usage example: ''In 31edo's ultrasoft mosh scale, the major mossecond is a neutral third and the major mosthird is a perfect fifth.''


TAMNAMS uses the following modifiers to denote different interval sizes within a MOS interval class:
=== Names for mosses with 6-10 steps ===
* For multiples of the period plus or minus 0 or 1 generators: ''perfect''. (Diatonic examples: perfect mos4th (Pmos4th), perfect mos5th (Pmos5th), perfect mos8th (Pmos8th), perfect mos12th (Pmos12th), etc.)
This list is maintained by [[User:Inthar]] and [[User:Godtone]].
* For generic interval classes with 2 specific sizes of intervals therein (which are therefore separated by a chroma of c = L - s), ''major'' and ''minor'' are used to distinguish the larger (L) and smaller (s) intervals. Note that the generator, its period-equivalents, and the generator's period-complement and its period-equivalents are the only intervals excluded from this rule due to their inclusion in the previous rule. Diatonic examples: major mos2nd (abbreviated Lmos2nd), minor mos3rd (abbreviated smos3rd), major mos3rd (Lmos3rd), etc.)
* If you subtract a chroma from a perfect (Pmos) or minor (smos) interval, it becomes ''diminished'' (d; dmos). If you subtract two chromas instead, it becomes ''doubly diminished'' (dd; ddmos). (Diatonic examples: diminished mos3rd (dmos3rd), diminished mos4th (dmos4th), doubly diminished mos5th (ddmos5th), etc.)
* If you add a chroma to a perfect (Pmos) or major (Lmos) interval, it becomes ''augmented'' (A; Amos). If you add two chromas instead, it becomes ''doubly augmented'' (AA; AAmos). (Diatonic examples: augmented mos2nd (Amos2nd), augmented mos4th (Amos4th), doubly augmented mos5th (AAmos5th).)
* The pattern continues, ddd for triply diminished and AAA for triply augmented. Note that applying this operation more than 3 times is an unlikely usecase, and a shorthand notaton of d^3 and A^3 or an alternative notation or terminology entirely would likely be preferable in such circumstances, hence repetition of the corresponding letter is a sufficient system.
 
== MOS pattern names ==
The following names are suggested for octave-equivalent MOSes of sizes between 6 and 10.
 
Some of these come from temperament-agnostic MOS names coined by [[Igliashon Jones]] and others, as well as some of the names (such as "mosh") from [[Graham Breed]]'s names below. Some are named by taking an arbitrary temperament that generates the scale (preferably in the MOS's [[proper]] range) and suffixing ''-oid''. These names have been coined so that MOSes can be discussed more independently of RTT temperaments (while drawing on an established RTT tradition in the xen community which may help make the names more meaningful to more people).
 
1L ns names are intentionally unspecific because the generator can be anywhere from the octave to to 1\(n+1) and can better be viewed as subsets of larger MOSes, for example [[1L 6s]] as a subset of [[7L 1s]].


{| class="wikitable center-all"
{| class="wikitable center-all"
|+ TAMNAMS MOS names
|+ style="font-size: 105%;" | TAMNAMS moss names
|-
|-
!colspan=5| 6-note MOSes
! colspan="5" | 6-note mosses
|-
|-
! Pattern !! Name !! Interval prefix<ref name="prefix">used in interval names, e.g. "perfect oneirofourth"</ref> !! Abbreviation<ref name="abbr">used in abbreviations of interval names, e.g. "Po4"</ref> !! Notes
! Pattern !! Name !! Prefix<ref group="note" name="prefix">used in interval, degree and mode names, e.g. ''perfect 3-oneirostep, perfect 3-oneirodegree, oneiro-3-up''</ref> !! Abbr.<ref group="note" name="abbr">written abbreviations of prefixes, e.g. ''P3oneis, P3oneid, onei-3|4''</ref> !! Etymology
|-
|-
| [[1L 5s]] || || || ||
| [[1L&nbsp;5s]] || antimachinoid || amech- || amk || Opposite pattern of machinoid.
|-
|-
| [[2L 4s]] || || || ||
| [[2L&nbsp;4s]] || malic || mal- || mal || Sister mos of 4L&nbsp;2s; apples have concave ends, whereas lemons/limes have convex ends.
|-
|-
| [[3L 3s]] || triwood || || ||  
| [[3L&nbsp;3s]] || triwood || triwd- || tw || [[Blackwood]][10] and [[whitewood]][14] generalized to 3 periods.
|-
|-
| [[4L 2s]] || || || ||
| [[4L&nbsp;2s]] || citric || citro- || cit || Parent (or subset) mos of 4L&nbsp;6s and 6L&nbsp;4s.
|-
|-
| [[5L 1s]] || || || ||
| [[5L&nbsp;1s]] || machinoid || mech- || mk || From [[machine]] temperament.
|-
|-
!colspan=5| 7-note MOSes
! colspan="5" | 7-note mosses
|-
|-
! Pattern !! Name !! Interval prefix<ref name="prefix"/> !! Abbreviation<ref name="abbr"/> !! Notes
! Pattern !! Name !! Prefix !! Abbr. !! Etymology
|-
|-
| [[1L 6s]] || antiarcheotonic || || ||
| [[1L&nbsp;6s]] || onyx || on- || on || Sounds like "one-six" depending on one's pronunciation; also called ''anti-archeotonic<ref group="note" name="anti-name">Alternate name based on the name of its sister mos, with anti- prefix added.</ref>''.
|-
|-
| [[2L 5s]] || antidiatonic || pel- || pel ||  
| [[2L&nbsp;5s]] || antidiatonic || pel- || pel || Opposite pattern of diatonic; pel- is from pelog.
|-
|-
| [[3L 4s]] || mosh || mosh- || mosh ||
| [[3L&nbsp;4s]] || mosh || mosh- || mosh || From "mohajira-ish", a name from [[Graham Breed's MOS naming scheme|Graham Breed's naming scheme]].
|-
|-
| [[4L 3s]] || smitonic || smi- || smi ||
| [[4L&nbsp;3s]] || smitonic || smi- || smi || From "sharp minor third".
|-
|-
| [[5L 2s]] || diatonic || ''none'' || ''none'' ||
| [[5L&nbsp;2s]] || diatonic || dia- || dia ||  
|-
|-
| [[6L 1s]] || archeotonic || archeo- || ar
| [[6L&nbsp;1s]] || archaeotonic || arch- || arc || Originally a name for 13edo's 6L&nbsp;1s scale; also called ''archæotonic/archeotonic<ref group="note" name="spelling">Spelling variant.</ref>''.
|-
|-
!colspan=5| 8-note MOSes
! colspan="5" | 8-note mosses
|-
|-
! Pattern !! Name !! Interval prefix<ref name="prefix"/> !! Abbreviation<ref name="abbr"/> !! Notes
! Pattern !! Name !! Prefix !! Abbr. !! Etymology
|-
|-
| [[1L 7s]] || || || ||
| [[1L&nbsp;7s]] || antipine || apine- || ap || Opposite pattern of pine.
|-
|-
| [[2L 6s]] || || || ||
| [[2L&nbsp;6s]] || subaric || subar- || sb || Parent (or subset) mos of 2L&nbsp;8s and 8L&nbsp;2s.
|-
|-
| [[3L 5s]] || || || ||
| [[3L&nbsp;5s]] || checkertonic || check- || chk || From the [[Kite Giedraitis's Categorizations of 41edo Scales|Kite guitar checkerboard scale]].
|-
|-
| [[4L 4s]] || tetrawood, "diminished" || || ||
| [[4L&nbsp;4s]] || tetrawood || tetrawd- || ttw || Blackwood[10] and whitewood[14] generalized to 4 periods; also called ''diminished<ref group="note" name="unofficial2">Common name no longer recommend by TAMNAMS due to risk of ambiguity. Provided for reference.</ref>.''
|-
|-
| [[5L 3s]] || oneirotonic || oneiro- || o ||
| [[5L&nbsp;3s]] || oneirotonic || oneiro- || onei || Originally a name for 13edo's 5L&nbsp;3s scale; also called ''oneiro''<ref group="note">Shortened form of name.</ref>.
|-
|-
| [[6L 2s]] || || || ||
| [[6L&nbsp;2s]] || ekic || ek- || ek || From [[echidna]] and [[hedgehog]] temperaments.
|-
|-
| [[7L 1s]] || || || ||
| [[7L&nbsp;1s]] || pine || pine- || p || From [[porcupine]] temperament.
|-
|-
!colspan=5| 9-note MOSes
! colspan="5" | 9-note mosses
|-
|-
! Pattern !! Name !! Interval prefix<ref name="prefix"/> !! Abbreviation<ref name="abbr"/> !! Notes
! Pattern !! Name !! Prefix !! Abbr. !! Etymology
|-
|-
| [[1L 8s]] || || || ||
| [[1L&nbsp;8s]] || antisubneutralic || ablu- || ablu || Opposite pattern of subneutralic.
|-
|-
| [[2L 7s]] || || || ||
| [[2L&nbsp;7s]] || balzano || bal- || bz || Originally a name for 20edo's 2L&nbsp;7s (and 2L 11) scales; bal- is pronounced /bæl/.
|-
|-
| [[3L 6s]] || tcherepnin || tcher- || tch ||
| [[3L&nbsp;6s]] || tcherepnin || cher- || ch || In reference to Tcherepnin's 9-note scale in 12edo.
|-
|-
| [[4L 5s]] || orwelloid || or- || or ||
| [[4L&nbsp;5s]] || gramitonic || gram- || gm || From "grave minor third".
|-
|-
| [[5L 4s]] || semiquartal || sequar- || seq ||
| [[5L&nbsp;4s]] || semiquartal || cthon- || ct || From "half fourth"; cthon- is from "chthonic".
|-
|-
| [[6L 3s]] || || || ||
| [[6L&nbsp;3s]] || hyrulic || hyru- || hy || References [[triforce]] temperament.
|-
|-
| [[7L 2s]] || superdiatonic || || ||
| [[7L&nbsp;2s]] || armotonic || arm- || arm || From [[Armodue]] theory; also called ''superdiatonic<ref group="note" name="unofficial2" />.''
|-
|-
| [[8L 1s]] || || || ||
| [[8L&nbsp;1s]] || subneutralic || blu- || blu || Derived from the generator being between supraminor and neutral quality; blu- is from [[bleu]] temperament.
|-
|-
!colspan=5| 10-note MOSes
! colspan="5" | 10-note mosses
|-
|-
! Pattern !! Name !! Interval prefix<ref name="prefix"/> !! Abbreviation<ref name="abbr"/> !! Notes
! Pattern !! Name !! Prefix !! Abbr. !! Etymology
|-
|-
| [[1L 9s]] || || || ||
| [[1L&nbsp;9s]] || antisinatonic || asina- || asi || Opposite pattern of sinatonic.
|-
|-
| [[2L 8s]] || || || ||
| [[2L&nbsp;8s]] || jaric || jara- || ja || From [[pajara]], [[injera]], and [[diaschismic]] temperaments.
|-
|-
| [[3L 7s]] || || || ||
| [[3L&nbsp;7s]] || sephiroid || seph- || sp || From [[sephiroth]] temperament.
|-
|-
| [[4L 6s]] || || || ||
| [[4L&nbsp;6s]] || lime || lime- || lm || Sister mos of 6L&nbsp;4s; limes are smaller than lemons, as are 4L&nbsp;6s's step sizes compared to 6L&nbsp;4s.
|-
|-
| [[5L 5s]] || pentawood || || ||
| [[5L&nbsp;5s]] || pentawood || pentawd- || pw || Blackwood[10] and whitewood[14] generalized to 5 periods.
|-
|-
| [[6L 4s]] || || || ||
| [[6L&nbsp;4s]] || lemon || lem- || le || From [[lemba]] temperament. Also sister mos of 4L&nbsp;6s.
|-
|-
| [[7L 3s]] || || || ||
| [[7L&nbsp;3s]] || dicoid || dico- || di || From [[Dicot family#Dichotic|dichotic]] and [[dicot]] (dicoid) exotemperaments; pronounced /'daɪˌkɔɪd/.
|-
|-
| [[8L 2s]] || || || ||
| [[8L&nbsp;2s]] || taric || tara- || ta || Sister mos of 2L&nbsp;8s; based off of the [[wikipedia:Hindustani_numerals|Hindi]] word for 18 (aṭhārah), since 18edo contains basic 8L&nbsp;2s.
|-
|-
| [[9L 1s]] || || || ||
| [[9L&nbsp;1s]] || sinatonic || sina- || si || Derived from the generator being within the range of a [[sinaic]].
|}
|}
<references/>
<references group="note" />
 
=== Expansion to smaller mosses ===
For names for mosses with fewer than 6 steps, see [[TAMNAMS/Appendix#Expanding names for smaller mosses|here]].
 
=== Expansion to larger mosses ===
{{see also| TAMNAMS Extension}}
Various users have proposed names for mosses with more than 10 steps, commonly referred to as "TAMNAMS extensions". Chief among these are the following:
 
* [[User:Frostburn/TAMNAMS Extension]]
* [[User:Ganaram inukshuk/TAMNAMS Extension]]
 
== Naming mos modes ==
By default, TAMNAMS uses a simplified version of [[Modal UDP notation]] which specifies the number of generators up and down without multiplying them by the number of periods per equave. This only affects how the modes of multi-period MOS scales are written: for example, the modes of 4L&nbsp;2s are written as 2|0, 1|1, and 0|2, instead of 4|0(2), 2|2(2), and 0|2(4). The modes for single-period MOS scales, such as 5|2 in 5L&nbsp;3s, are written the same way to that of standard UDP notation.
 
Other mode notation schemes or mode names can be used instead, if desired.
{{MOS mode degrees|Scale Signature=5L 3s|MOS Prefix=mos|Mode Names=Default}}
For modes with altered scale degrees, the abbreviations for the scale degrees are listed after the UDP for the mode.
{{MOS mode degrees|Scale Signature=5L 3s|MOS Prefix=mos|MODMOS Step Pattern=LsLsLLLs|Mode Names=Default}}
Notation, such as [[Diamond-mos notation|diamond-mos]], can be used instead of the abbreviation of a mosdegree. For example, LsLsLLLs can be written {{nowrap|"5L 3s 5{{!}}2 m4md"}}. {{nowrap|"5L 3s 5{{!}}2 @4d"}}.
 
For a mos pattern given a name in TAMNAMS, there is also the option of using the prefix for the pattern instead of saying "xL ys": the 5L&nbsp;3s mode LsLLsLLs can be written "onei-5|2".
 
== Generalization to non-mos scales ==
=== Intervals in arbitrary scales ===
Zero-indexed interval names are also used for arbitrary scales, so we can still call a k-step interval a ''k-step'' and the corresponding degree the ''k-degree''. But instead of ''k-mosstep'' and ''k-mosdegree'', we use ''k-scalestep'' and ''k-scaledegree'' for arbitrary scales.
 
=== Proposal: Naming ternary scales' step ratios===
Analogously to binary scales including mosses, ternary scales, i.e. those with three step sizes {{nowrap|L &gt; M &gt; S}}, including [[MV3]] scales, can also be defined by their L:M:S ratios. Here TAMNAMS names the L/M ratio and then the M/S ratio as if these were mos step ratios: for example, [[21edo]] [[diasem]] (5L&nbsp;2M&nbsp;2s, LMLSLMLSL or its inverse) has a step ratio of {{nowrap|L:M:S {{=}} 3:2:1}}, so we name it ''soft-basic diasem''. If the ratios are the same, repetition may optionally be omitted, so that [[26edo]] diasem, 4:2:1, may optionally be called "basic diasem" instead of "basic-basic diasem". Not to be confused with step ratios where one ratio is unspecified; for that, use:
 
* x:y:z (where x:y is known but y:z is not) is called ''(hardness term for x/y)-any''. x:x:1 is called ''equalized-any'' or ''LM-equalized'' (where {{nowrap|x &ge; 1}} represents a free variable).
* x:y:z (where y:z is known but x:y is not) is called ''any-(hardness term for y/z)''. x:1:1 is called ''any-equalized'' or ''MS-equalized'' (where {{nowrap|x &ge; 1}} represents a free variable).
* x:y:z (where x:z is known but x:y and y:z are not) is called ''outer-(hardness term for x/z)-any''. x:1:x is called ''outer-equalized-any'' or ''LS-equalized''. (where {{nowrap|x &ge; 0}} represents a free variable).
 
=== Naming MV3 intervals ===
[[MV3]] scales, such as [[diasem]], have at most 3 sizes for each interval class. For every interval class that occurs in exactly 3 sizes, we use ''large'', ''medium'', and ''small k-step''. For every interval class that occurs in 2 sizes, we use ''large k-step'' and ''small k-step''.  If an interval class only has one size, then we call it ''perfect k-step''.
 
== Appendix==
=== Reasoning for step ratio names ===
{{Main|TAMNAMS/Appendix#Reasoning for step ratio names}}
 
=== Reasoning for mos interval names ===
{{Main|TAMNAMS/Appendix#Reasoning for mos interval names}}
 
=== Reasoning for mos pattern names ===
{{Main|TAMNAMS/Appendix#Reasoning for mos pattern names}}
 
[[Category:TAMNAMS]]

Latest revision as of 03:43, 22 March 2026

The content of this page is maintained by members of the Xenharmonic Alliance Discord. If you have any questions, spot any errors, or have any suggestions, be sure to ask there!

TAMNAMS (from Temperament-Agnostic Mos NAMing System, read as /ˈteɪmneɪmz/ or /ˈtæmnæmz/), devised by the XA Discord in 2021, is a system of temperament-agnostic names for scales—primarily octave-equivalent moment of symmetry scales—as well as their intervals, their associated generator ranges, and the ratios describing the proportions of large and small steps.

The goal of TAMNAMS is to allow musicians and theorists to discuss moment-of-symmetry scales, or mosses, independent of the language of regular temperament theory. For example, the names flattone[7], meantone[7], pythagorean[7], and superpyth[7] all describe the same step pattern of 5L 2s, with different proportions of large and small steps. Under TAMNAMS parlance, these names can be described broadly as soft 5L 2s (for flattone and meantone) and hard 5L 2s (for pythagorean and superpyth). For discussions of the step pattern itself, the name 5L 2s or, in this example, diatonic, is used.

Credits

This page and its associated pages were mainly written by User:Godtone, User:SupahstarSaga, User:Inthar, and User:Ganaram inukshuk.

Step ratio spectrum

Main article: Step ratio
TAMNAMS names nine specific simple L:s ratios tabulated below, which correspond to the simplest edos that have the mos scale. The two extremes, equalized and collapsed, are degenerate cases and define the boundaries for valid tuning ranges. An equalized mos has large and small steps be the same size (L = s), so the mos pattern is no longer apparent. A collapsed mos has small steps shrunken down to zero (s = 0), merging adjacent tones s apart into a single tone. In both cases, the mos structure is no longer valid.

In between the nine specific ratios there are eight named intermediate ranges of step ratios. These names are useful for classifying mos tunings which don't match any of the nine simple step ratios. There are also two additional terms for broader ranges: the term hyposoft describes step ratios that are soft-of-basic but not as soft as 3:2; similarly, the term hypohard describes step ratios that are hard-of-basic but not as hard as 3:1.

By default, all ranges include their endpoints. For example, a hard tuning is considered a quasihard tuning. To exclude endpoints, the modifier strict can be used, for example strict hyposoft.

In some cases it can be clearer to name step ratio ranges by their ranges in hardness (for example, 1-1.33 for ultrasoft) or by their boundary step ratios (for example, equalized-to-supersoft for ultrasoft) than by the step ratio ranges tabulated here.

Spectrum of step ratio ranges and specific step ratios
Step ratio ranges Specific
step ratios 		Hardness Notes
1:1
(equalized) 		1 Trivial/pathological
1:1 to 2:1
(soft-of-basic) 		1:1 to 4:3
(ultrasoft) 		Step ratios especially close to 1:1 may be called pseudoequalized
4:3
(supersoft) 		1.33
4:3 to 3:2
(parasoft)
3:2
(soft) 		1.5 Also called monosoft
3:2 to 2:1
(hyposoft) 		3:2 to 5:3
(quasisoft)
5:3
(semisoft) 		1.67
5:3 to 2:1
(minisoft)
2:1
(basic) 		2
2:1 to 1:0
(hard-of-basic) 		2:1 to 3:1
(hypohard) 		2:1 to 5:2
(minihard)
5:2
(semihard) 		2.5
5:2 to 3:1
(quasihard)
3:1
(hard) 		3 Also called monohard
3:1 to 4:1
(parahard)
4:1
(superhard) 		4
4:1 to 1:0
(ultrahard) 		Step ratios especially close to 1:0 may be called pseudocollapsed
1:0
(collapsed) 		infinity Trivial/pathological

Extended spectrum

Main article: TAMNAMS/Appendix § Extended spectrum

See TAMNAMS/Appendix#Extended spectrum which details a more complete glossary that this set of terms is a subset of.

Naming mos intervals

Mos intervals are denoted as a quantity of mossteps, large or small. An interval that is k mossteps wide is referred to as a k-mosstep interval or simply k-mosstep (abbreviated as kms). A mos's intervals are a 0-mosstep or unison, followed by a 1-mosstep, then a 2-mosstep, and so on, until an n-mosstep interval equal to the period is reached, where n is thus the number of pitches in the mos per period. If a positive integer multiple of the period equals an octave (or some close approximation thereof), that interval can be referred to plainly as an octave if one prefers, but mosoctave should not be used unless there is exactly 7 notes per octave. The prefix of mos- in the term mosstep may be replaced with the mos's prefix, specified in the section mos pattern names.

In contexts where it doesn't cause ambiguity, the term k-mosstep can be shortened to k-step, which allows for generalizing terminology described here to non-mos scales. Additionally, for non-octave scales that assume some generalisation of octave equivalence, the term octave is replaced with the term equave. Note this also means that if an n-mosstep interval is an octave, this can be referred to as the mosequave unambiguously and unconfusingly, regardless of what positive integer n is.

This section's running example will be 3L 4s.

Naming specific mos intervals

The phrase k-mosstep by itself does not specify the exact size of an interval. To refer to specific intervals, the familiar modifiers of major, minor, augmented, diminished and perfect are used. As mosses have maximum variety 2, every interval (except for the unison and multiples of the period which is usually the octave) will be in no more than two sizes.

The modifiers of major, minor, augmented, perfect, and diminished (abbreviated as M, m, A, P, and d respectively) are given as such:

  • Integer multiples of the period, such as the unison and (often but not always) the octave, are perfect because they only have one size each.
  • The generating intervals, or generators, are referred to as perfect. Note that a mos actually has two generators—a bright and dark generator—and both generators have two sizes each, specifically, the only time the less common size appears is at the end of the generator chain. For our running example of 3L 4s, the generators are a 2-mosstep and 5-mosstep (the following subsection explains how to find these). Referring to a mos's generating intervals usually implies its perfect form (a.k.a the common form); specifically:
    • The large size of the bright generator is perfect, and the small size is diminished.
    • The large size of the dark generator is augmented, and the small size is perfect.
  • For all other intervals, the large size is major and the small size is minor.
  • For k-mossteps where k is greater than the number of pitches in the mos, those intervals have the same modifiers as an octave-reduced interval. Similarly, multiples of the octave are perfect, as are generators raised by some multiple of the octave.

For multi-period mosses, note that both the bright and dark generators appear in every period, not just every octave, as what it means for a mos to be multi-period is that there is multiple periods per octave so that some number of periods is (intended to be interpreted to) equal the octave. Therefore, generators that are raised or lowered by some integer multiple of the mos's period are also perfect. There is an important exception in interval naming for nns mosses, in which the generators are major and minor (for the bright and dark generator respectively) rather than augmented, perfect and diminished, and all other intervals (the octave, unison and multiples of the period) are perfect as would be expected. This is to prevent ambiguity over calling every interval present perfect.

Names for mos intervals for 3L 4s
Interval classes Specific intervals Interval size Abbreviation Gens up
0-mosstep (unison) Perfect unison 0 P0ms 0
1-mosstep Minor mosstep (or small mosstep) s m1ms −3
Major mosstep (or large mosstep) L M1ms 4
2-mosstep Diminished 2-mosstep 2s d2ms −6
Perfect 2-mosstep L + s P2ms 1
3-mosstep Minor 3-mosstep 1L + 2s m3ms −2
Major 3-mosstep 2L + s M3ms 5
4-mosstep Minor 4-mosstep 1L + 3s m4ms −5
Major 4-mosstep 2L + 2s M4ms 2
5-mosstep Perfect 5-mosstep 2L + 3s P5ms −1
Augmented 5-mosstep 3L + 2s A5ms 6
6-mosstep Minor 6-mosstep 2L + 4s m6ms −4
Major 6-mosstep 3L + 3s M6ms 3
7-mosstep (octave) Perfect octave 3L + 4s P7ms 0

Naming alterations by a chroma

TAMNAMS also uses the modifiers of augmented and diminished to refer to alterations of a mos interval, much like with using sharps and flats in standard notation. Mos intervals are altered by raising or lowering it by a moschroma (or simply chroma, if context allows), a generalized sharp/flat that is the difference between a large step and a small step. Raising a minor mos interval by a chroma makes it major; the reverse is true. Raising a major or perfect mos interval repeatedly makes an augmented, doubly-augmented, and a triply-augmented mos interval. Likewise, lowering a minor or perfect mos interval repeatedly makes a diminished, doubly-diminished, and a triply-diminished mos interval. A unison, period or equave that is itself augmented or diminished may also be referred to a mosaugmented or mosdiminished unison, period or equave, respectively. Here, the meaning of unison and octave does not change depending on the mos pattern, but the meanings of augmented and diminished do.

Repetition of "A" or "d" is used to denote repeatedly augmented/diminished mos intervals, and is sufficient in most cases. It's typically uncommon to alter an interval more than three times, such as with a quadruply-augmented and quadruply-diminished interval; in such cases, it's preferable to use a shorthand such as A^n and d^n, or to use alternate notation or terminology.

Table of alterations, with abbreviations
Number of chromas Perfect intervals Major/minor intervals
+3 chromas Triply-augmented (AAA, A³, or A^3) Triply-augmented (AAA, A³, or A^3)
+2 chromas Doubly-augmented (AA) Doubly-augmented (AA)
+1 chroma Augmented (A) Augmented (A)
0 chromas (unaltered) Perfect (P) Major (M)
Minor (m)
−1 chroma Diminished (d) Diminished (d)
−2 chromas Doubly-diminished (dd) Doubly-diminished (dd)
−3 chromas Triply-diminished (ddd, d³, or d^3) Triply-diminished (ddd, d³, or d^3)

Smaller intervals

Mos intervals smaller than a moschroma
Interval name Absolute value of a...
Moschroma (generalized chroma, provided for reference) Large step minus a small step
Mosdiesis (generalized diesis) Large step minus two small steps
Moskleisma (generalized kleisma) Mosdiesis minus a moschroma
Mosgothma (generalized gothma) Mosdiesis minus a small step

Naming neutral and interordinal intervals

For a discussion of semi-moschroma-altered versions of mos intervals, see Neutral and interordinal k-mossteps.

Other terminology

The tonic (unison), the period, the generator and the period-complement of the generator make up all the intervals in any given mos scale that might be labelled "perfect". With the exception of the tonic and the period, they may also be "imperfect". Therefore, the degrees of a mos scale which come in a "perfect" variety are called perfectable degrees and the degrees of a mos scale which do not come in a "perfect" variety are called non-perfectable degrees.

Naming mos degrees

Individual mos degrees, (that is, specific notes of a mos scale,) or k-mosdegrees (abbreviated kmd), are based on the modifiers given to intervals using the process for naming mos intervals and alterations. Mosdegrees are 0-indexed and are enumerated starting at the 0-mosdegree, the tonic/root of the scale. For example, if you go up a major k-mosstep up from the root, then the mos degree reached this way is a major k-mosdegree. Much like mossteps, the prefix of mos- may also be replaced with the mos's prefix. If context allows, k-mosdegree may also be shortened to k-degree to allow generalization to non-mos scales. When the modifiers major/minor or augmented/perfect/diminished are omitted, they are assumed to be the unmodified degrees of the current mode.

Naming mos chords

To denote a chord or a mode on a given degree, write the notes of the chord separated by spaces or commas, or the mode, in parentheses after the degree symbol. The most explicit option is to write out the chord in cents, edosteps or mossteps (e.g. in 13edo 5L 3s, the (0 369 646) chord can be written (0 4 7)\13, (P0ms M2ms M4ms), or 7|0 (0 2 4ms) and to write the mode. To save space, you can use whatever names or abbreviations for the chord or mode you have defined for the reader. For example, in the LsLLsLLs mode of 5L 3s, we have m2md(0 369 646), or the chord (0 369 646) on the 2-mosdegree which is a minor 2-mosstep. The LsLLsLLs mode also has m2md(7|0), meaning that we have the 7| (LLsLLsLs) mode on the 2-mosdegree which is a minor 2-mosstep in LsLLsLLs (see below for the convention we have used to name the mode).

To analyze a chord as an inversion of another chord (i.e. when the bass is not seen as the root), the following strategies can be used:

  1. One can write the root degree first: (6s, 0s, 2s, 7s). The first degree is assumed to be the tonic unless the following method is used:
  2. One can write "T" to the left of the tonic: (0s, 2s, T6s, 7s).
  3. One can use 0 for the root, using negative numbers for notes below the root. For example, to analyze (0s, 2s, 6s, 7s) on the 7-degree of the LsLLsLLs mode as being rooted on its 6s (thus on the 5-degree of LsLLsLLs), we write 5d(0s, −6s, −4s, 1s). The "5d" here is essential for avoiding confusion with the previous notation.
  4. If clarity is desired as to what the root position chord is, slash notation can be used as in conventional notation. Thus the above chord can be written 5d(0s 1s 2s 4s)/7d.

Mos pattern names

TAMNAMS uses the following names for selected small mosses. These names are optional; interval size names and step ratio names can be combined with conventional xL ys names. For example: 21edo is the soft 5L 3s tuning and its major 2-step is a neutral third of size 342.9 cents.

Some of the names come from older temperament-agnostic mos names, such as names (such as mosh) from Graham Breed's mos names. These names have been coined so that mosses can be discussed more independently of RTT temperaments. Sometimes the prefix has a different source than the scale name for euphonic reasons.

Names for mosses with 6-10 steps

This list is maintained by User:Inthar and User:Godtone.

TAMNAMS moss names
6-note mosses
Pattern Name Prefix[note 1] Abbr.[note 2] Etymology
1L 5s antimachinoid amech- amk Opposite pattern of machinoid.
2L 4s malic mal- mal Sister mos of 4L 2s; apples have concave ends, whereas lemons/limes have convex ends.
3L 3s triwood triwd- tw Blackwood[10] and whitewood[14] generalized to 3 periods.
4L 2s citric citro- cit Parent (or subset) mos of 4L 6s and 6L 4s.
5L 1s machinoid mech- mk From machine temperament.
7-note mosses
Pattern Name Prefix Abbr. Etymology
1L 6s onyx on- on Sounds like "one-six" depending on one's pronunciation; also called anti-archeotonic[note 3].
2L 5s antidiatonic pel- pel Opposite pattern of diatonic; pel- is from pelog.
3L 4s mosh mosh- mosh From "mohajira-ish", a name from Graham Breed's naming scheme.
4L 3s smitonic smi- smi From "sharp minor third".
5L 2s diatonic dia- dia
6L 1s archaeotonic arch- arc Originally a name for 13edo's 6L 1s scale; also called archæotonic/archeotonic[note 4].
8-note mosses
Pattern Name Prefix Abbr. Etymology
1L 7s antipine apine- ap Opposite pattern of pine.
2L 6s subaric subar- sb Parent (or subset) mos of 2L 8s and 8L 2s.
3L 5s checkertonic check- chk From the Kite guitar checkerboard scale.
4L 4s tetrawood tetrawd- ttw Blackwood[10] and whitewood[14] generalized to 4 periods; also called diminished[note 5].
5L 3s oneirotonic oneiro- onei Originally a name for 13edo's 5L 3s scale; also called oneiro[note 6].
6L 2s ekic ek- ek From echidna and hedgehog temperaments.
7L 1s pine pine- p From porcupine temperament.
9-note mosses
Pattern Name Prefix Abbr. Etymology
1L 8s antisubneutralic ablu- ablu Opposite pattern of subneutralic.
2L 7s balzano bal- bz Originally a name for 20edo's 2L 7s (and 2L 11) scales; bal- is pronounced /bæl/.
3L 6s tcherepnin cher- ch In reference to Tcherepnin's 9-note scale in 12edo.
4L 5s gramitonic gram- gm From "grave minor third".
5L 4s semiquartal cthon- ct From "half fourth"; cthon- is from "chthonic".
6L 3s hyrulic hyru- hy References triforce temperament.
7L 2s armotonic arm- arm From Armodue theory; also called superdiatonic[note 5].
8L 1s subneutralic blu- blu Derived from the generator being between supraminor and neutral quality; blu- is from bleu temperament.
10-note mosses
Pattern Name Prefix Abbr. Etymology
1L 9s antisinatonic asina- asi Opposite pattern of sinatonic.
2L 8s jaric jara- ja From pajara, injera, and diaschismic temperaments.
3L 7s sephiroid seph- sp From sephiroth temperament.
4L 6s lime lime- lm Sister mos of 6L 4s; limes are smaller than lemons, as are 4L 6s's step sizes compared to 6L 4s.
5L 5s pentawood pentawd- pw Blackwood[10] and whitewood[14] generalized to 5 periods.
6L 4s lemon lem- le From lemba temperament. Also sister mos of 4L 6s.
7L 3s dicoid dico- di From dichotic and dicot (dicoid) exotemperaments; pronounced /'daɪˌkɔɪd/.
8L 2s taric tara- ta Sister mos of 2L 8s; based off of the Hindi word for 18 (aṭhārah), since 18edo contains basic 8L 2s.
9L 1s sinatonic sina- si Derived from the generator being within the range of a sinaic.
  1. used in interval, degree and mode names, e.g. perfect 3-oneirostep, perfect 3-oneirodegree, oneiro-3-up
  2. written abbreviations of prefixes, e.g. P3oneis, P3oneid, onei-3|4
  3. Alternate name based on the name of its sister mos, with anti- prefix added.
  4. Spelling variant.
  5. 5.0 5.1 Common name no longer recommend by TAMNAMS due to risk of ambiguity. Provided for reference.
  6. Shortened form of name.

Expansion to smaller mosses

For names for mosses with fewer than 6 steps, see here.

Expansion to larger mosses

See also: TAMNAMS Extension

Various users have proposed names for mosses with more than 10 steps, commonly referred to as "TAMNAMS extensions". Chief among these are the following:

Naming mos modes

By default, TAMNAMS uses a simplified version of Modal UDP notation which specifies the number of generators up and down without multiplying them by the number of periods per equave. This only affects how the modes of multi-period MOS scales are written: for example, the modes of 4L 2s are written as 2|0, 1|1, and 0|2, instead of 4|0(2), 2|2(2), and 0|2(4). The modes for single-period MOS scales, such as 5|2 in 5L 3s, are written the same way to that of standard UDP notation.

Other mode notation schemes or mode names can be used instead, if desired.

Scale degrees of the modes of 5L 3s
UDP Cyclic
order 		Step
pattern 		Scale degree (oneirodegree)
0 1 2 3 4 5 6 7 8
7|0 1 LLsLLsLs Perf. Maj. Maj. Perf. Maj. Aug. Maj. Maj. Perf.
6|1 4 LLsLsLLs Perf. Maj. Maj. Perf. Maj. Perf. Maj. Maj. Perf.
5|2 7 LsLLsLLs Perf. Maj. Min. Perf. Maj. Perf. Maj. Maj. Perf.
4|3 2 LsLLsLsL Perf. Maj. Min. Perf. Maj. Perf. Maj. Min. Perf.
3|4 5 LsLsLLsL Perf. Maj. Min. Perf. Min. Perf. Maj. Min. Perf.
2|5 8 sLLsLLsL Perf. Min. Min. Perf. Min. Perf. Maj. Min. Perf.
1|6 3 sLLsLsLL Perf. Min. Min. Perf. Min. Perf. Min. Min. Perf.
0|7 6 sLsLLsLL Perf. Min. Min. Dim. Min. Perf. Min. Min. Perf.

For modes with altered scale degrees, the abbreviations for the scale degrees are listed after the UDP for the mode.

Scale degrees of the modes of 5L 3s (LsLsLLLs)
UDP and
alterations 		Cyclic
order 		Step
pattern 		Scale degree (oneirodegree)
0 1 2 3 4 5 6 7 8
5|2 m4md
3|4 M7md 		1 LsLsLLLs Perf. Maj. Min. Perf. Min. Perf. Maj. Maj. Perf.
2|5 d3md
0|7 M6md 		2 sLsLLLsL Perf. Min. Min. Dim. Min. Perf. Maj. Min. Perf.
7|0 m2md
5|2 A5md 		3 LsLLLsLs Perf. Maj. Min. Perf. Maj. Aug. Maj. Maj. Perf.
4|3 m1md
2|5 M4md 		4 sLLLsLsL Perf. Min. Min. Perf. Maj. Perf. Maj. Min. Perf.
7|0 A3md 5 LLLsLsLs Perf. Maj. Maj. Aug. Maj. Aug. Maj. Maj. Perf.
6|1 m7md
4|3 M2md 		6 LLsLsLsL Perf. Maj. Maj. Perf. Maj. Perf. Maj. Min. Perf.
3|4 m6md
1|6 M1md 		7 LsLsLsLL Perf. Maj. Min. Perf. Min. Perf. Min. Min. Perf.
0|7 d5md 8 sLsLsLLL Perf. Min. Min. Dim. Min. Dim. Min. Min. Perf.

Notation, such as diamond-mos, can be used instead of the abbreviation of a mosdegree. For example, LsLsLLLs can be written "5L 3s 5|2 m4md". "5L 3s 5|2 @4d".

For a mos pattern given a name in TAMNAMS, there is also the option of using the prefix for the pattern instead of saying "xL ys": the 5L 3s mode LsLLsLLs can be written "onei-5|2".

Generalization to non-mos scales

Intervals in arbitrary scales

Zero-indexed interval names are also used for arbitrary scales, so we can still call a k-step interval a k-step and the corresponding degree the k-degree. But instead of k-mosstep and k-mosdegree, we use k-scalestep and k-scaledegree for arbitrary scales.

Proposal: Naming ternary scales' step ratios

Analogously to binary scales including mosses, ternary scales, i.e. those with three step sizes L > M > S, including MV3 scales, can also be defined by their L:M:S ratios. Here TAMNAMS names the L/M ratio and then the M/S ratio as if these were mos step ratios: for example, 21edo diasem (5L 2M 2s, LMLSLMLSL or its inverse) has a step ratio of L:M:S = 3:2:1, so we name it soft-basic diasem. If the ratios are the same, repetition may optionally be omitted, so that 26edo diasem, 4:2:1, may optionally be called "basic diasem" instead of "basic-basic diasem". Not to be confused with step ratios where one ratio is unspecified; for that, use:

  • x:y:z (where x:y is known but y:z is not) is called (hardness term for x/y)-any. x:x:1 is called equalized-any or LM-equalized (where x ≥ 1 represents a free variable).
  • x:y:z (where y:z is known but x:y is not) is called any-(hardness term for y/z). x:1:1 is called any-equalized or MS-equalized (where x ≥ 1 represents a free variable).
  • x:y:z (where x:z is known but x:y and y:z are not) is called outer-(hardness term for x/z)-any. x:1:x is called outer-equalized-any or LS-equalized. (where x ≥ 0 represents a free variable).

Naming MV3 intervals

MV3 scales, such as diasem, have at most 3 sizes for each interval class. For every interval class that occurs in exactly 3 sizes, we use large, medium, and small k-step. For every interval class that occurs in 2 sizes, we use large k-step and small k-step. If an interval class only has one size, then we call it perfect k-step.

Appendix

Reasoning for step ratio names

Main article: TAMNAMS/Appendix § Reasoning for step ratio names

Reasoning for mos interval names

Main article: TAMNAMS/Appendix § Reasoning for mos interval names

Reasoning for mos pattern names

Main article: TAMNAMS/Appendix § Reasoning for mos pattern names
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