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Distance model

From Wikipedia, the free encyclopedia
1:2 distance models on E, D, and D. Also known as octatonic scales.
"Ode-to-Napoleon" hexachord[1] in prime form[2] Play. It is also Ernő Lendvai's "1:3 Model" scale and one of Milton Babbitt's six all-combinatorial hexachord "source sets".[2]

In music a distance model is the alternation of two different intervals to create a non-diatonic musical mode such as the 1:3 distance model, the alternation of semitones and minor thirds: C-E-E-G-A-B-C. This scale is also an example of polymodal chromaticism as it includes both the tonic and dominant as well as "'two of the most typical degrees from both major and minor' (E and B, E and A, respectively) ([Kárpáti 1975] p.132)".[3][4]

The most common distance model is the 1:2, also known as the octatonic scale (set type 8-28), followed by 1:3 and 1:5, also known as set type 4-9, which is a subset of the 1:2 model.[5] Set type 4-9 has also been referred to as a "Z-Cell."[6]

See also

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References

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  1. ^ Lewin, David (1959). "Re: Intervallic Relations Between Two Collections of Notes". Journal of Music Theory 3, no. 2 (November 1959): 298–301. p.300.
  2. ^ Jump up to: a b Van den Toorn, Pieter C. (1996). Music, Politics, and the Academy, p.128-29. ISBN 0-520-20116-7.
  3. ^ Kárpáti, János (1975). Bartók's String Quartets, p.132. Translated by Fred MacNicol. Budapest: Corvina Press. Cited in Wilson 1992.
  4. ^ Wilson, Paul (1992). The Music of Béla Bartók, p. 8-9. ISBN 0-300-05111-5.
  5. ^ Wilson (1992), p. 25-26.
  6. ^ "Analyzing atonal music".