SN scale: Difference between revisions

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~~== Definition ==~~

A '''step-nested scale''', '''SN scale''', or '''SNS''' is a scale generated through iteratively performing the following two moves:

A ~~Step~~-nested scale, or SN scale (or SNS) is a scale generated through iteratively performing the following two moves:

a) Add a new smaller step at the top or bottom of every existing step, or

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Each iteration of a) increases the rank of the scale by 1.

An SN scale of rank 2, a 2-SN scale, is a [[MOS scale]]. Accordingly, SN scales are a generalization of MOS scales into arbitrary rank. [[ET]]~~<nowiki/>~~s ~~can be considered to be~~ 1-SN scales, which can be generated by applying a) once, introducing a step of a single degree of the ET.

An SN scale of rank 2, a 2-SN scale, is a [[MOS scale]]. Accordingly, SN scales are a generalization of MOS scales into arbitrary rank. [[Equal division]]s are rank-1 SN scales, which can be generated by applying a) once, introducing a step of a single degree of the ET.

SN scales are [[chirality|mirror-symmetric]], and may be uniquely defined by a ''step signature'' - a generalization of the MOS signature into arbitrary rank.

==Examples ==

== Examples ==

The diatonic scale can be generated by iterating a) twice, introducing first the octave, then the perfect fifth, and then iterating b) 3 times. It has step signature 5'''L'''2'''s''', and in the symmetric mode, it has step arrangement '''LsLLLsL'''. No other arrangement of 5 large and 2 small step sizes results in a SN scale.

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If at any point in the application of T a negative number is reached, that combination of step incidences does not correspond to an SN scale. Accordingly, though for rank-2, any possible step signature corresponds to an SN scale, for higher ranks only a small portion of possible step signatures correspond to SN scales. The step signature (2,2,3), for example, does not correspond to an SN scale, as the iterative application of T leads to a negative number, i.e., (2,2,3)->(2,2,-1).

TODO: Prove that this algorithm yields the same result as the definition given ~~in the Definitions section~~.

TODO: Prove that this algorithm yields the same result as the first definition given.

== Step-nested differential scales ==

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SNDS ((2/1, 3/2)[5], ''x''))[10] - (2/1, 3/2)[5] = SNS (2/1, 3/2)[5] (dipentatonic SNS)

[[Category:~~Step-nested scales|~~ ]] ~~~~

[[Category:Scale]]

[[Category:MOS scale]]

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-== Definition ==
+A '''step-nested scale''', '''SN scale''', or '''SNS''' is a scale generated through iteratively performing the following two moves:
-A Step-nested scale, or SN scale (or SNS) is a scale generated through iteratively performing the following two moves:
 a) Add a new smaller step at the top or bottom of every existing step, or
@@ Line 8: / Line 7: @@
 Each iteration of a) increases the rank of the scale by 1. <!-- In any of the steps, "bottom" may be replaced with "top", but the choice of "bottom" and "top" must be consistent. Todo: Prove this or find relevant literature on episturmian words to clarify this.-->
-An SN scale of rank 2, a 2-SN scale, is a [[MOS scale]]. Accordingly, SN scales are a generalization of MOS scales into arbitrary rank. [[ET]]<nowiki/>s can be considered to be 1-SN scales, which can be generated by applying a) once, introducing a step of a single degree of the ET.
+An SN scale of rank 2, a 2-SN scale, is a [[MOS scale]]. Accordingly, SN scales are a generalization of MOS scales into arbitrary rank. [[Equal division]]s are rank-1 SN scales, which can be generated by applying a) once, introducing a step of a single degree of the ET.
 SN scales are [[chirality|mirror-symmetric]], and may be uniquely defined by a ''step signature'' - a generalization of the MOS signature into arbitrary rank.
-==Examples ==
+== Examples ==
 The diatonic scale can be generated by iterating a) twice, introducing first the octave, then the perfect fifth, and then iterating b) 3 times. It has step signature 5'''L'''2'''s''', and in the symmetric mode, it has step arrangement '''LsLLLsL'''. No other arrangement of 5 large and 2 small step sizes results in a SN scale.
@@ Line 82: / Line 81: @@
 If at any point in the application of T a negative number is reached, that combination of step incidences does not correspond to an SN scale. Accordingly, though for rank-2, any possible step signature corresponds to an SN scale, for higher ranks only a small portion of possible step signatures correspond to SN scales. The step signature (2,2,3), for example, does not correspond to an SN scale, as the iterative application of T leads to a negative number, i.e., (2,2,3)->(2,2,-1).
-TODO: Prove that this algorithm yields the same result as the definition given in the Definitions section.
+TODO: Prove that this algorithm yields the same result as the first definition given.
 == Step-nested differential scales ==
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 SNDS ((2/1, 3/2)[5], ''x''))[10] - (2/1, 3/2)[5] = SNS (2/1, 3/2)[5] (dipentatonic SNS)
-[[Category:Step-nested scales| ]] <!-- main article -->
+[[Category:Scale]]
 [[Category:MOS scale]]