User:Ganaram inukshuk/MOS scale: Difference between revisions
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|changes=general rewrites; definition; wrangle different ways to say "mos" | |changes=general rewrites; definition; wrangle different ways to say "mos" | ||
}}A '''moment-of-symmetry scale''' (also called '''moment-of-symmetry''', commonly abbreviated as '''MOS scale''', '''MOSS''', or '''MOS''', pronounced "em-oh-ess"; also spelled as '''mos''', pronounced "moss"; plural '''MOS scales''', '''MOSes''', or '''mosses''') is a type of [[binary]], [[Periods and generators|periodic scale constructed using a generator]]. | }}A '''moment-of-symmetry scale''' (also called '''moment-of-symmetry''', commonly abbreviated as '''MOS scale''', '''MOSS''', or '''MOS''', pronounced "em-oh-ess"; also spelled as '''mos''', pronounced "moss"; plural '''MOS scales''', '''MOSes''', or '''mosses''') is a type of [[binary]], [[Periods and generators|periodic scale constructed using a generator]] originally invented by [[Erv Wilson]]. | ||
== Definition == | == Definition == | ||
=== Erv Wilson's original definition === | === Erv Wilson's original definition === | ||
The concept of MOS scales were invented by | The concept of MOS scales were invented by Erv Wilson in 1975 in his paper ''Moments of Symmetry''. A moment-of-symmetry scale consists of: | ||
* A generator and an [[equivalence interval]], called the period, usually the octave. | * A generator and an [[equivalence interval]], called the period, which is usually the [[octave]]. | ||
** The generator is commonly denoted using a quantity of steps from an [[EDO|equal division of the octave]], where both the edo and generator are coprime. | ** The generator is commonly denoted using a quantity of steps from an [[EDO|equal division of the octave]], where both the edo and generator are coprime, meaning they do not share any common factors greater than 1. | ||
* Two unique step sizes, called ''large'' and ''small'', commonly denoted using the letters L and s. | * Two unique step sizes, called ''large'' and ''small'', commonly denoted using the letters L and s. | ||
** The quantities of these steps are coprime | ** The quantities of these steps are also coprime. | ||
The prototypical example of a moment-of-symmetry is the common diatonic scale of [[12edo]], which can be produced using a generator of 7 edosteps. | The prototypical example of a moment-of-symmetry is the common diatonic scale of [[12edo]], which can be produced using a generator of 7 edosteps. | ||
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|The common diatonic scale, denoted as '''5L 2s'''. This is the lydian mode, equivalent to WWWHWWH. | |The common diatonic scale, denoted as '''5L 2s'''. This is the lydian mode, equivalent to WWWHWWH. | ||
|} | |} | ||
=== Equivalent definitions === | |||
There are several equivalent definitions of MOS scales: | |||
* | |||
*[[Maximum variety]] 2: every interval that spans the same number of steps has two distinct varieties. | |||
*Binary and [[distributionally even]]: there are two distinct step sizes that are distributed as evenly as possible. This is equivalent to maximum variety 2. | |||
*Binary and [[balanced]]: every interval that spans the same number of steps differs by having one large step being replaced with one small step. | |||
The term ''well-formed'', from Norman Carey and David Clampitt's paper ''Aspects of well-formed scales'', is sometimes used to equivalently describe the above definitions, and is used in academic research. | |||
=== Single-period and multi-period MOS scales === | === Single-period and multi-period MOS scales === | ||
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MOS scales in which the equivalence interval is a multiple of the period (or alternatively, the step pattern repeats multiple times within the equivalence interval), is commonly called a '''multi-MOS''' or '''multi-period MOS'''. This is to distinguish them from what Wilson had defined, called '''strict MOS''' or '''single-period MOS'''. | MOS scales in which the equivalence interval is a multiple of the period (or alternatively, the step pattern repeats multiple times within the equivalence interval), is commonly called a '''multi-MOS''' or '''multi-period MOS'''. This is to distinguish them from what Wilson had defined, called '''strict MOS''' or '''single-period MOS'''. | ||
An alternate definition of a multi-period MOS scale is a MOS scale in which the quantities of large and small steps are ''not'' coprime. | |||
== Notation == | == Notation == | ||
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== Properties == | == Properties == | ||
== | === Step ratio and basic properties === | ||
=== Advanced discussion === | |||
== Non-tuning applications == | == Non-tuning applications == | ||
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<original stuff below here> | <original stuff below here> | ||
==History and terminology== | ==History and terminology== | ||
The term ''MOS'', and the method of scale construction it entails, were invented by [[Erv Wilson]] in 1975. His original paper is archived on Anaphoria.com here: [http://anaphoria.com/mos.PDF ''Moments of Symmetry'']. There is also an introduction by Kraig Grady here: [http://anaphoria.com/wilsonintroMOS.html ''Introduction to Erv Wilson's Moments of Symmetry'']. | The term ''MOS'', and the method of scale construction it entails, were invented by [[Erv Wilson]] in 1975. His original paper is archived on Anaphoria.com here: [http://anaphoria.com/mos.PDF ''Moments of Symmetry'']. There is also an introduction by Kraig Grady here: [http://anaphoria.com/wilsonintroMOS.html ''Introduction to Erv Wilson's Moments of Symmetry'']. | ||
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As for using MOS scales in practice for making music, the period and equivalence interval are often taken to be the octave, but an additional parameter is required for defining a scale: the ''step ratio'', which is the ratio of the small step (usually denoted ''s'') to the large step (usually denoted ''L''). This is usually written as ''L''/''s'', however, using ''s''/''L'' has the advantage of avoiding division by zero in the trivial case where ''s'' = 0. Different step ratios can produce very varied sounding scales (and very varied corresponding potential temperament interpretations) for a given MOS pattern and period, so it's useful to consider a spectrum of simple step ratios for tunings. The [[TAMNAMS #Step ratio spectrum|TAMNAMS]] system has names for both specific ratios and ranges of ratios. | As for using MOS scales in practice for making music, the period and equivalence interval are often taken to be the octave, but an additional parameter is required for defining a scale: the ''step ratio'', which is the ratio of the small step (usually denoted ''s'') to the large step (usually denoted ''L''). This is usually written as ''L''/''s'', however, using ''s''/''L'' has the advantage of avoiding division by zero in the trivial case where ''s'' = 0. Different step ratios can produce very varied sounding scales (and very varied corresponding potential temperament interpretations) for a given MOS pattern and period, so it's useful to consider a spectrum of simple step ratios for tunings. The [[TAMNAMS #Step ratio spectrum|TAMNAMS]] system has names for both specific ratios and ranges of ratios. | ||
==Properties== | ==Properties== | ||
===Basic properties=== | ===Basic properties=== | ||