A set (pitch set, pitch-class set, set class, set form, set genus, pitch collection) in

music theory Music theory is the study of the practices and possibilities of music. ''The Oxford Companion to Music'' describes three interrelated uses of the term "music theory". The first is the "rudiments", that are needed to understand music notation (ke ...

, as in

mathematics Mathematics is an area of knowledge that includes the topics of numbers, formulas and related structures, shapes and the spaces in which they are contained, and quantities and their changes. These topics are represented in modern mathematics ...

and general parlance, is a collection of objects. In musical contexts the term is traditionally applied most often to collections of pitches or pitch-classes, but theorists have extended its use to other types of musical entities, so that one may speak of sets of durations or

timbres In music, timbre ( ), also known as tone color or tone quality (from psychoacoustics), is the perceived sound quality of a musical note, sound or tone. Timbre distinguishes different types of sound production, such as choir voices and musica ...

, for example.Wittlich, Gary (1975). "Sets and Ordering Procedures in Twentieth-Century Music", ''Aspects of Twentieth-Century Music'', p.475. Wittlich, Gary (ed.). Englewood Cliffs, New Jersey: Prentice-Hall. . Set theory 3-1 in the chromatic circle

A set by itself does not necessarily possess any additional structure, such as an

ordering Order, ORDER or Orders may refer to: * Categorization, the process in which ideas and objects are recognized, differentiated, and understood * Heterarchy, a system of organization wherein the elements have the potential to be ranked a number of d ...

permutation In mathematics, a permutation of a set is, loosely speaking, an arrangement of its members into a sequence or linear order, or if the set is already ordered, a rearrangement of its elements. The word "permutation" also refers to the act or proc ...

. Nevertheless, it is often musically important to consider sets that are equipped with an order relation (called ''segments''); in such contexts, bare sets are often referred to as "unordered", for the sake of emphasis. Two-element sets are called

dyad Dyad or dyade may refer to: Arts and entertainment * Dyad (music), a set of two notes or pitches * ''Dyad'' (novel), by Michael Brodsky, 1989 * ''Dyad'' (video game), 2012 * ''Dyad 1909'' and ''Dyad 1929'', ballets by Wayne McGregor Other uses ...

s, three-element sets

trichord In music theory, a trichord () is a group of three different pitch classes found within a larger group. A trichord is a contiguous three-note set from a musical scale or a twelve-tone row. In musical set theory there are twelve trichords give ...

s (occasionally "triads", though this is easily confused with the traditional meaning of the word triad). Sets of higher cardinalities are called

tetrachord In music theory, a tetrachord ( el, τετράχορδoν; lat, tetrachordum) is a series of four notes separated by three intervals. In traditional music theory, a tetrachord always spanned the interval of a perfect fourth, a 4:3 frequency pr ...

s (or tetrads),

pentachord A pentachord in music theory may be either of two things. In pitch-class set theory, a pentachord is defined as any five pitch classes, regarded as an unordered collection . In other contexts, a pentachord may be any consecutive five-note section ...

s (or pentads),

hexachord In music, a hexachord (also hexachordon) is a six-note series, as exhibited in a scale (hexatonic or hexad) or tone row. The term was adopted in this sense during the Middle Ages and adapted in the 20th century in Milton Babbitt's serial theor ...

s (or hexads), heptachords (heptads or, sometimes, mixing Latin and Greek roots, "septachords"), octachords (octads), nonachords (nonads), decachords (decads), undecachords, and, finally, the dodecachord. A time-point set is a duration set where the distance in time units between attack points, or time-points, is the distance in semitones between pitch classes.Wittlich (1975), p.476.

Serial

In the theory of

serial music In music, serialism is a method of Musical composition, composition using series of pitches, rhythms, dynamics, timbres or other elements of music, musical elements. Serialism began primarily with Arnold Schoenberg's twelve-tone technique, thou ...

, however, some authors (notably

Milton Babbitt Milton Byron Babbitt (May 10, 1916 – January 29, 2011) was an American composer, music theorist, mathematician, and teacher. He is particularly noted for his Serialism, serial and electronic music. Biography Babbitt was born in Philadelphia t ...

) use the term "set" where others would use "row" or "series", namely to denote an ordered collection (such as a

twelve-tone row In music, a tone row or note row (german: Reihe or '), also series or set, is a non-repetitive ordering of a set of pitch-classes, typically of the twelve notes in musical set theory of the chromatic scale, though both larger and smaller sets ar ...

) used to structure a work. These authors speak of "twelve tone sets", "time-point sets", "derived sets", etc. (See below.) This is a different usage of the term "set" from that described above (and referred to in the term "

set theory Set theory is the branch of mathematical logic that studies sets, which can be informally described as collections of objects. Although objects of any kind can be collected into a set, set theory, as a branch of mathematics, is mostly conce ...

"). For these authors, a ''set form'' (or ''row form'') is a particular arrangement of such an ordered set: the

prime form In algebraic geometry, the Schottky–Klein prime form ''E''(''x'',''y'') of a compact Riemann surface ''X'' depends on two elements ''x'' and ''y'' of ''X'', and vanishes if and only if ''x'' = ''y''. The prime form ''E'' is not quite ...

(original order), inverse (upside down), retrograde (backwards), and retrograde inverse (backwards and upside down). A derived set is one which is generated or derived from consistent operations on a subset, for example

Webern Anton Friedrich Wilhelm von Webern (3 December 188315 September 1945), better known as Anton Webern (), was an Austrian composer and conductor whose music was among the most radical of its milieu in its sheer concision, even aphorism, and stead ...

's ''

Concerto A concerto (; plural ''concertos'', or ''concerti'' from the Italian plural) is, from the late Baroque era, mostly understood as an instrumental composition, written for one or more soloists accompanied by an orchestra or other ensemble. The typi ...

'', Op.24, in which the last three subsets are derived from the first:Wittlich (1975), p.474. : This can be represented numerically as the integers 0 to 11: 0 11 3 4 8 7 9 5 6 1 2 10 The first subset (B B D) being: 0 11 3 prime-form, interval-string = The second subset (E G F) being the retrograde-inverse of the first, transposed up one semitone: 3 11 0 retrograde, interval-string = mod 12 3 7 6 inverse, interval-string = mod 12 + 1 1 1 ------ = 4 8 7 The third subset (G E F) being the retrograde of the first, transposed up (or down) six semitones: 3 11 0 retrograde + 6 6 6 ------ 9 5 6 And the fourth subset (C C A) being the inverse of the first, transposed up one semitone: 0 11 3 prime form, interval-vector = mod 12 0 1 9 inverse, interval-string = mod 12 + 1 1 1 ------- 1 2 10 Each of the four trichords (3-note sets) thus displays a relationship which can be made obvious by any of the four serial row operations, and thus creates certain

invariances ''Invariances'' is a 2001 book by American philosopher Robert Nozick, his last book before his death in 2002. Introduction In the introduction, Nozick assumes "orthodox quantum mechanics" and draws inferences from it about indeterminism and nonl ...

. These invariances in serial music are analogous to the use of common-tones and common-chords in tonal music.

Non-serial

The fundamental concept of a non-serial set is that it is an unordered collection of

pitch class In music, a pitch class (p.c. or pc) is a set of all pitches that are a whole number of octaves apart; for example, the pitch class C consists of the Cs in all octaves. "The pitch class C stands for all possible Cs, in whatever octave positio ...

es. The normal form of a set is the most compact ordering of the pitches in a set.Tomlin, Jay
"All About Set Theory: What is Normal Form?"
''JayTomlin.com''. Tomlin defines the "most compact" ordering as the one where, "the largest of the intervals between any two consecutive pitches is between the first and last pitch listed". For example, the set (0,2) (a

major second In Western music theory, a major second (sometimes also called whole tone or a whole step) is a second spanning two semitones (). A second is a musical interval encompassing two adjacent staff positions (see Interval number for more deta ...

) is in normal form while the set (0,10) (a

minor seventh In music theory, a minor seventh is one of two musical intervals that span seven staff positions. It is ''minor'' because it is the smaller of the two sevenths, spanning ten semitones. The major seventh spans eleven. For example, the interval f ...

, the

inversion Inversion or inversions may refer to: Arts * , a French gay magazine (1924/1925) * ''Inversion'' (artwork), a 2005 temporary sculpture in Houston, Texas * Inversion (music), a term with various meanings in music theory and musical set theory * ...

of a major second) is not, its normal form being (10,0). Rather than the "original" (untransposed, uninverted) form of the set the prime form may be considered either the normal form of the set or the normal form of its inversion, whichever is more tightly packed. Forte (1973) and Rahn (1980) both list the prime forms of a set as the most left-packed possible version of the set. Forte packs from the left and Rahn packs from the right ("making the small numbers smaller," versus making, "the larger numbers ... smaller"Nelson, Paul (2004).
Two Algorithms for Computing the Prime Form
, ''ComposerTools.com''.). For many years it was accepted that there were only five instances in which the two algorithms differ.Tsao, Ming (2007). ''Abstract Musical Intervals: Group Theory for Composition and Analysis'', p.99, n.32. . Algorithms given in Morris, Robert (1991). ''Class Notes for Atonal Music Theory'', p.103. Frog Peak Music. However, in 2017, music theorist Ian Ring discovered that there is a sixth set class where Forte and Rahn's algorithms arrive at different prime forms. Ian Ring also established a much simpler algorithm for computing the prime form of a set, which produces the same results as the more complicated algorithm previously published by John Rahn.

Vectors

References

External links

"Set Theory Calculator"
''JayTomlin.com''. Calculates normal form, prime form,

, and interval class vector for a given set and vice versa.
PC Set Calculator
, ''MtA.Ca''. {{Set theory (music) Musical set theory

Serial

Non-serial

Vectors

See also

References

Further reading

External links