Equivalence class (music)

This article is about equivalency in music; for equivalency in mathematics see Equality (mathematics) and equivalence class.

In music theory, equivalence class is an equality (=) or equivalence between sets or twelve-tone rows. A relation rather than an operation, it may be contrasted with derivation.[1] "It is not surprising that music theorists have different concepts of equivalence [from each other]..."[2] "Indeed, an informal notion of equivalence has always been part of music theory and analysis. Pitch class set theory, however, has adhered to formal definitions of equivalence."[1]

A definition of equivalence between two twelve-tone series that Schuijer describes as informal despite its air of mathematical precision, and that shows its writer considered equivalence and equality as synonymous:

Two sets [twelve-tone series], P and P will be considered equivalent [equal] if and only if, for any pi,j of the first set and pi,j of the second set, for all is and js [order numbers and pitch class numbers], if i=i, then j=j. (= denotes numeral equality in the ordinary sense).

Milton Babbitt, (1992). The Function of Set Structure in the Twelve-Tone System, 8-9, cited in[3]

Forte (1963, p. 76) similarly uses equivalent to mean identical, "considering two subsets as equivalent when they consisted of the same elements. In such a case, mathematical set theory speaks of the 'equality,' not the 'equivalence,' of sets."[4]

Other equivalencies in music include:

See also

Sources

  1. 1 2 Schuijer (2008). Analyzing Atonal Music: Pitch-Class Set Theory and Its Contexts, p.85. ISBN 978-1-58046-270-9.
  2. Schuijer (2008), p.86.
  3. Schuijer (2008), p.87.
  4. Schuijer (2008), p.89.


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