Music theory

Iubal, Pythagoras and Philolaus engaged in theoretical investigations, in a woodcut from Franchinus Gaffurius, Theorica musicæ (1492).

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 what is otherwise called 'rudiments', currently taught as the elements of notation, of key signatures, of time signatures, of rhythmic notation, and so on. [...] The second is the study of writings about music from ancient times onwards. [...] The third is an area of current musicological study that seeks to define processes and general principles in music — a sphere of research that can be distinguished from analysis in that it takes as its starting-point not the individual work or performance but the fundamental materials from which it is built."[1]

Music theory is frequently concerned with describing how musicians and composers make music, including tuning systems and composition methods among other topics. Because of the ever-expanding conception of what constitutes music (see Definition of music), a more inclusive definition could be that music theory is the consideration of any sonic phenomena, including silence, as they relate to music. This is not an absolute guideline; for example, the study of "music" in the Quadrivium liberal arts university curriculum that was common in medieval Europe was an abstract system of proportions that was carefully studied at a distance from actual musical practice.[2] However, this medieval discipline became the basis for tuning systems in later centuries, and it is generally included in modern scholarship on the history of music theory.[3]

Music theory as a practical discipline encompasses the methods and concepts composers and other musicians use in creating music. The development, preservation, and transmission of music theory in this sense may be found in oral and written music-making traditions, musical instruments, and other artifacts. For example, ancient instruments from Mesopotamia, China,[4] and prehistoric sites around the world reveal details about the music they produced and potentially something of the musical theory that might have been used by their makers (see History of music and Musical instrument). In ancient and living cultures around the world, the deep and long roots of music theory are clearly visible in instruments, oral traditions, and current music making. Many cultures, at least as far back as ancient Mesopotamia and ancient China, have also considered music theory in more formal ways such as written treatises and music notation. Practical and scholarly traditions overlap, as many practical treatises about music place themselves within a tradition of other treatises, which are cited regularly just as scholarly writing cites earlier research.

In modern academia, music theory is a subfield of musicology, the wider study of musical cultures and history. Etymologically, music theory is an act of contemplation of music, from the Greek θεωρία, a looking at, viewing, contemplation, speculation, theory, also a sight, a spectacle.[5] As such, it is often concerned with abstract musical aspects such as tuning and tonal systems, scales, consonance and dissonance, and rhythmic relationships, but there is also a body of theory concerning practical aspects, such as the creation or the performance of music, orchestration, ornamentation, improvisation, and electronic sound production.[6] A person who researches, teaches, or writes articles about music theory is a music theorist. University study, typically to the M.A. or Ph.D level, is required to teach as a tenure-track music theorist in a US or Canadian university. Methods of analysis include mathematics, graphic analysis, and especially analysis enabled by Western music notation. Comparative, descriptive, statistical, and other methods are also used. Music theory textbooks, especially in the United States of America, often include elements of musical acoustics, considerations of musical notation, and techniques of tonal composition (Harmony and Counterpoint), among other topics.

History

Prehistory

Preserved prehistoric instruments, artifacts, and later depictions of performance in artworks can give clues to the structure of pitch systems in prehistoric cultures. See for instance Paleolithic flutes, Gǔdí, and Anasazi flute.

Antiquity

Mesopotamia

Several surviving Sumerian and Akkadian clay tablets include musical information of a theoretical nature, mainly lists of intervals and tunings.[7] The scholar Sam Mirelman reports that the earliest of these texts dates from before 1500 BCE, a millennium earlier than surviving evidence from any other culture of comparable musical thought. Further, "All the Mesopotamian texts [about music] are united by the use of a terminology for music that, according to the approximate dating of the texts, was in use for over 1,000 years."[8]

China

Much of Chinese music history and theory remains unclear.[9]

The earliest texts about Chinese music theory are inscribed on the stone and bronze bells excavated in 1978 from the tomb of Marquis Yi (died 433 BCE) of the Zeng state. They include more than 2800 words describing theories and practices of music pitches of the time. The bells produce two intertwined pentatonic scales three tones apart with additional pitches completing the chromatic scale.[10]

Chinese theory starts from numbers, the main musical numbers being twelve, five and eight. Twelve refers to the number of pitches on which the scales can be constructed. The Lüshi chunqiu from about 239 BCE recalls the legend of Ling Lun. On order of the Yellow Emperor, Ling Lun collected twelve bamboo lengths with thick and even nodes. Blowing on one of these like a pipe, he found its sound agreeable and named it huangzhong, the "Yellow Bell." He then heard phoenixes singing. The male and female phoenix each sang six tones. Ling Lun cut his bamboo pipes to match the pitches of the phoenixes, producing twelve pitch pipes in two sets: six from the male phoenix and six from the female: these were called the lülü or later the shierlü.[11]

The lülü formed the ritual scale to which many instruments were tuned. The name of the lowest sound, huangzhong also implyed 'musical correctness.' Its pitch formed a pitch standard, setting the base pitch of zithers, flutes and singers of imperial court orchestras. Straight-walled pitch pipes without finger holes were made of cast metal, their lengths specified by court regulations.[12] The resulting chromatic scale provided twelve fundamental notes for the construction of the musical scales themselves. The lülü also has a cosmological value: its notes describe the energetic frequency of the twelve months of the year, the daily rhythm of the twelve bi-hours of the Chinese clock, the twelve main acupuncture meridians, etc.[13]

The two sets of tones (male and female) dividing the twelve-tone scale were generated by the "Method of Subtracting and Adding Thirds," or sanfen sunyi, which involved alternately rising a fifth and descending a fourth through the subtraction or addition of a third of the length of the preceding pitch pipe. The resulting pitches produced by adding a third (and descending a fourth) were referred to by Sima Qian in the Records of the Grand Historian (91 BCE) as pitches of "superior generation," that is, the pitches of Ling Lun’s male phoenix; the pitches produced by subtracting a third (and ascending a fifth) were referred to as pitches of "inferior generation," that is, the pitches of Ling Lun’s female phoenix.[11]

"Apart from technical and structural aspects, ancient Chinese music theory also discusses topics such as the nature and functions of music. The Yueji ("Record of music", c1st and 2nd centuries BCE), for example, manifests Confucian moral theories of understanding music in its social context. Studied and implemented by Confucian scholar-officials [...], these theories helped form a musical Confucianism that overshadowed but did not erase rival approaches. These include the assertion of Mozi (c468–c376 BCE) that music wasted human and material resources, and Laozi’s claim that the greatest music had no sounds. [...] Even the music of the qin zither, a genre closely affiliated with Confucian scholar-officials, includes many works with Daoist references, such as Tianfeng huanpei ("Heavenly Breeze and Sounds of Jade Pendants")."[9]

India

The Samaveda and Yajurveda (c. 1200–1000 BCE) are among the earliest testimonies of Indian music, but they contain no theory properly speaking. The Natya Shastra, written between 200 BCE to 200 CE, discusses intervals (Śrutis), scales (Grāmas), consonances and dissonances, classes of melodic structure (Mūrchanās, modes?), melodic types (Jātis), instruments, etc.[14]

Greece

Early preserved Greek writings on music theory include two types of works:[15]

Several names of theorists are known before these works, including Pythagoras (c. 570 – c. 495 BCE), Philolaus (c. 470 – c. 385 BCE), Archytas (428–347 BCE), and others.

Works of the first type (technical manuals) include

More philosophical treatises of the second type include

Middle Ages

China

Some imported early Chinese instruments became important components of the entertainment music of the Sui (581–618) and Tang (618–907) courts: the bent-neck pipa (quxiang pipa), the bili, the konghou and the jiegu. They generated not only new repertories and performing practices but also new music theories. The pipa, for example, carried with it a theory of musical modes that subsequently led to the Sui and Tang theory of 84 musical modes.[17]

Arabic countries

Medieval Arabic music theorists include:[18]

Europe

The Latin treatise De institutione musica by the Roman philosopher Boethius (written c. 500) was a touchstone for other writings on music in medieval Europe. Boethius represented Classical authority on music during the Middle Ages, as the Greek writings on which he based his work were not read or translated by later Europeans until the 15th century.[28] This treatise carefully maintains distance from the actual practice of music, focusing mostly on the mathematical proportions involved in tuning systems and on the moral character of particular modes. Several centuries later, treatises began to appear which dealt with the actual composition of pieces of music in the plainchant tradition.[29] At the end of the ninth century, Hucbald worked towards more precise pitch notation for the neumes used to record plainchant.

Guido d'Arezzo' wrote in 1028 a letter to Michael of Pomposa, entitled Epistola de ignoto cantu,[30] in which he introduced the practice of using syllables to describe notes and intervals. This was the source of the hexachordal solmization that was to be used until the end of the Middle Ages. Guido also wrote about emotional qualities of the modes, the phrase structure of plainchant, the temporal meaning of the neumes, etc.; his chapters on polyphony "come closer to describing and illustrating real music than any previous account" in the Western tradition.[28]

During the thirteenth century, a new rhythm system called mensural notation grew out of an earlier, more limited method of notating rhythms in terms of fixed repetitive patterns, the so-called rhythmic modes, which were developed in France around 1200. An early form of mensural notation was first described and codified in the treatise Ars cantus mensurabilis ("The art of measured chant") by Franco of Cologne (c. 1280). Mensural notation used different note shapes to specify different durations, allowing scribes to capture rhythms which varied instead of repeating the same fixed pattern; it is a proportional notation, in the sense that each note value is equal to two or three times the shorter value, or half or a third of the longer value. This same notation, transformed through various extensions and improvements during the Renaissance, forms the basis for rhythmic notation in European classical music today.

Modern

Arabic countries

D'Erlanger divulges that the Arabic music scale is derived from the Greek music scale, and that Arabic music is connected to certain features of Arabic culture, such as astrology. [27]

Europe

Renaissance
Baroque
1750–1900

As Western musical influence spread throughout the world in the 1800s, musicians adopted Western theory as an international standard—but other theoretical traditions in both textual and oral traditions remain in use. For example, the long and rich musical traditions unique to ancient and current cultures of Africa are primarily oral, but describe specific forms, genres, performance practices, tunings, and other aspects of music theory.[31][32]

Sacred Harp music uses a different kind of scale and theory in practice. The music focuses around the solfege "fa, sol, la" on the music scale. Sacred Harp also employs a different notation involving "shape notes", or notes that are shaped to correspond to a certain solfege syllable on the music scale. Sacred Harp music and its music theory originated with Reverend Thomas Symmes in 1720, where he developed a system for "singing by note" in order to help his church members with note accuracy.[33]

Contemporary

Fundamentals of music

Music is composed of aural phenomena; "music theory" considers how those phenomena apply in music. Music theory considers melody, rhythm, counterpoint, harmony, form, tonal systems, scales, tuning, intervals, consonance, dissonance, durational proportions, the acoustics of pitch systems, composition, performance, orchestration, ornamentation, improvisation, electronic sound production, etc.[34]

Pitch

Middle C (261.626 Hz)  Play .

Pitch is the lowness or highness of a tone, for example the difference between middle C and a higher C. The frequency of the sound waves producing a pitch can be measured precisely, but the perception of pitch is more complex because single notes from natural sources are usually a complex mix of many frequencies. Accordingly, theorists often describe pitch as a subjective sensation.[35]

Specific frequencies are often assigned letter names. Today most orchestras assign Concert A (the A above middle C on the piano) to the frequency of 440 Hz. This assignment is somewhat arbitrary; for example, in 1859 France, the same A was tuned to 435 Hz. Such differences can have a noticeable effect on the timbre of instruments and other phenomena. Thus, in historically informed performance of older music, tuning is often set to match the tuning used in the period when it was written. Additionally, many cultures do not attempt to standardize pitch, often considering that it should be allowed to vary depending on genre, style, mood, etc.

The difference in frequency between two pitches is called an interval. The most basic interval is the unison, which is simply two notes of the same pitch. The octave interval is two pitches that are either double or half the frequency of one another. The unique characteristics of octaves gave rise to the concept of pitch class: pitches of the same letter name that occur in different octaves may be grouped into a single "class" by ignoring the difference in octave. For example, a high C and a low C are members of the same pitch class—the class that contains all C's. [36]

Musical tuning systems, or temperaments, determine the precise size of intervals. Tuning systems vary widely within and between world cultures. In Western culture, there have long been several competing tuning systems, all with different qualities. Internationally, the system known as equal temperament is most commonly used today because it is considered the most satisfactory compromise that allows instruments of fixed tuning (e.g. the piano) to sound acceptably in tune in all keys.

Scales and modes

A pattern of whole and half steps in the Ionian mode or major scale on C  Play .

Notes can be arranged in a variety of scales and modes. Western music theory generally divides the octave into a series of twelve tones, called a chromatic scale, within which the interval between adjacent tones is called a half step or semitone. Selecting tones from this set of 12 and arranging them in patterns of semitones and whole tones creates other scales.[37]

The most commonly encountered scales are the seven-toned major, the harmonic minor, the melodic minor, and the natural minor. Other examples of scales are the octatonic scale and the pentatonic or five-tone scale, which is common in folk music and blues. Non-Western cultures often use scales that do not correspond with an equally divided twelve-tone division of the octave. For example, classical Ottoman, Persian, Indian and Arabic musical systems often make use of multiples of quarter tones (half the size of a semitone, as the name indicates), for instance in 'neutral' seconds (three quarter tones) or 'neutral' thirds (seven quarter tones)—they do not normally use the quarter tone itself as a direct interval.[37]

In traditional Western notation, the scale used for a composition is usually indicated by a key signature at the beginning to designate the pitches that make up that scale. As the music progresses, the pitches used may change and introduce a different scale. Music can be transposed from one scale to another for various purposes, often to accommodate the range of a vocalist. Such transposition raises or lowers the overall pitch range, but preserves the intervallic relationships of the original scale. For example, transposition from the key of C major to D major raises all pitches of the scale of C major equally by a whole tone. Since the interval relationships remain unchanged, transposition may be unnoticed by a listener, however other qualities may change noticeably because transposition changes the relationship of the overall pitch range compared to the range of the instruments or voices that perform the music. This often affects the music's overall sound, as well as having technical implications for the performers.[38]

The interrelationship of the keys most commonly used in Western tonal music is conveniently shown by the circle of fifths. Unique key signatures are also sometimes devised for a particular composition. During the Baroque period, emotional associations with specific keys, known as the doctrine of the affections, were an important topic in music theory, but the unique tonal colorings of keys that gave rise to that doctrine were largely erased with the adoption of equal temperament. However, many musicians continue to feel that certain keys are more appropriate to certain emotions than others. Indian classical music theory continues to strongly associate keys with emotional states, times of day, and other extra-musical concepts and notably, does not employ equal temperament.

Consonance and dissonance

A consonance
The perfect octave, a consonant interval  Play 
A dissonance
The minor second, a dissonance  Play 

Consonance and dissonance are subjective qualities of the sonority of intervals that vary widely in different cultures and over the ages. Consonance (or concord) is the quality of an interval or chord that seems stable and complete in itself. Dissonance (or discord) is the opposite in that it feels incomplete and "wants to" resolve to a consonant interval. Dissonant intervals seem to clash. Consonant intervals seem to sound comfortable together. Commonly, perfect fourths, fifths, and octaves and all major and minor thirds and sixths are considered consonant. All others are dissonant to greater or lesser degree.[39]

Context and many other aspects can affect apparent dissonance and consonance. For example, in a Debussy prelude, a major second may sound stable and consonant, while the same interval may sound dissonant in a Bach fugue. In the Common Practice era, the perfect fourth is considered dissonant when not supported by a lower third or fifth. Since the early 20th century, Arnold Schoenberg’s concept of "emancipated" dissonance, in which traditionally dissonant intervals can be treated as "higher," more remote consonances, has become more widely accepted.[40]

Rhythm

Metric levels: beat level shown in middle with division levels above and multiple levels below.

Rhythm is produced by the sequential arrangement of sounds and silences in time. Meter measures music in regular pulse groupings, called measures or bars. The time signature or meter signature specifies how many beats are in a measure, and which value of written note is counted or felt as a single beat.

Through increased stress, or variations in duration or articulation, particular tones may be accented. There are conventions in most musical traditions for regular and hierarchical accentuation of beats to reinforce a given meter. Syncopated rhythms contradict those conventions by accenting unexpected parts of the beat.[41] Playing simultaneous rhythms in more than one time signature is called polyrhythm.[42]

In recent years, rhythm and meter have become an important area of research among music scholars. The most highly-cited of these recent scholars are Fred Lerdahl and Ray Jackendoff,[43] and Jonathan Kramer.[44], and Justin London.[45]

Melody

A melody is a series of tones sounding in succession that typically move toward a climax of tension then resolve to a state of rest. Because melody is such a prominent aspect in so much music, its construction and other qualities are a primary interest of music theory.

The basic elements of melody are pitch, duration, rhythm, and tempo. The tones of a melody are usually drawn from pitch systems such as scales or modes. Melody may consist, to increasing degree, of the figure, motive, semi-phrase, antecedent and consequent phrase, and period or sentence. The period may be considered the complete melody, however some examples combine two periods, or use other combinations of constituents to create larger form melodies.[47]

Chord

A chord, in music, is any harmonic set of three or more notes that is heard as if sounding simultaneously.[48][49] These need not actually be played together: arpeggios and broken chords may, for many practical and theoretical purposes, constitute chords. Chords and sequences of chords are frequently used in modern Western, West African,[50] and Oceanian[51] music, whereas they are absent from the music of many other parts of the world.[52]

The most frequently encountered chords are triads, so called because they consist of three distinct notes: further notes may be added to give seventh chords, extended chords, or added tone chords. The most common chords are the major and minor triads and then the augmented and diminished triads. The descriptions major, minor, augmented, and diminished are sometimes referred to collectively as chordal quality. Chords are also commonly classed by their root note—so, for instance, the chord C major may be described as a triad of major quality built on the note C. Chords may also be classified by inversion, the order in which the notes are stacked.

A series of chords is called a chord progression. Although any chord may in principle be followed by any other chord, certain patterns of chords have been accepted as establishing key in common-practice harmony. To describe this, chords are numbered, using Roman numerals (upward from the key-note),[53] per its diatonic function. Common ways of notating or representing chords[54] in western music other than conventional staff notation include Roman numerals, figured bass (much used in the Baroque era), macro symbols (sometimes used in modern musicology), and various systems of chord charts typically found in the lead sheets used in popular music to lay out the sequence of chords so that the musician may play accompaniment chords or improvise a solo.

Harmony

Barbershop quartets, such as this US Navy group, sing 4-part pieces, made up of a melody line (normally the second-highest voice, called the "lead") and 3 harmony parts.

In music, harmony is the use of simultaneous pitches (tones, notes), or chords.[52] The study of harmony involves chords and their construction and chord progressions and the principles of connection that govern them.[55] Harmony is often said to refer to the "vertical" aspect of music, as distinguished from melodic line, or the "horizontal" aspect.[56] Counterpoint, which refers to the interweaving of melodic lines, and polyphony, which refers to the relationship of separate independent voices, are thus sometimes distinguished from harmony.

In popular and jazz harmony, chords are named by their root plus various terms and characters indicating their qualities. For example, a lead sheet may indicate chords such as C major, D minor, and G dominant seventh. In many types of music, notably Baroque, Romantic, modern, and jazz, chords are often augmented with "tensions". A tension is an additional chord member that creates a relatively dissonant interval in relation to the bass. Typically, in the classical common practice period a dissonant chord (chord with tension) "resolves" to a consonant chord. Harmonization usually sounds pleasant to the ear when there is a balance between the consonant and dissonant sounds. In simple words, that occurs when there is a balance between "tense" and "relaxed" moments.

Timbre

Spectrogram of the first second of an E9 chord played on a Fender Stratocaster guitar with noiseless pickups. Below is the E9 chord audio:

Timbre, sometimes called "color", or "tone color," is the principal phenomenon that allows us to distinguish one instrument from another when both play at the same pitch and volume, a quality of a voice or instrument often described in terms like bright, dull, shrill, etc. It is of considerable interest in music theory, especially because it is one component of music that has as yet, no standardized nomenclature. It has been called "...the psychoacoustician's multidimensional waste-basket category for everything that cannot be labeled pitch or loudness,"[57] but can be accurately described and analyzed by Fourier analysis and other methods[58] because it results from the combination of all sound frequencies, attack and release envelopes, and other qualities that a tone comprises.

Timbre is principally determined by two things: (1) the relative balance of overtones produced by a given instrument due its construction (e.g. shape, material), and (2) the envelope of the sound (including changes in the overtone structure over time). Timbre varies widely between different instruments, voices, and to lesser degree, between instruments of the same type due to variations in their construction, and significantly, the performer's technique. The timbre of most instruments can be changed by employing different techniques while playing. For example, the timbre of a trumpet changes when a mute is inserted into the bell, the player changes their embouchure, or volume.

A voice can change its timbre by the way the performer manipulates their vocal apparatus, (e.g. the shape of the vocal cavity or mouth). Musical notation frequently specifies alteration in timbre by changes in sounding technique, volume, accent, and other means. These are indicated variously by symbolic and verbal instruction. For example, the word dolce (sweetly) indicates a non-specific, but commonly understood soft and "sweet" timbre. Sul tasto instructs a string player to bow near or over the fingerboard to produce a less brilliant sound. Cuivre instructs a brass player to produce a forced and stridently brassy sound. Accent symbols like marcato (^) and dynamic indications (pp) can also indicate changes in timbre.

Dynamics

An illustration of hairpins in musical notation.

In music, "dynamics" normally refers to variations of intensity or volume, as may be measured by physicists and audio engineers in decibels or phons. In music notation, however, dynamics are not treated as absolute values, but as relative ones. Because they are usually measured subjectively, there are factors besides amplitude that affect the performance or perception of intensity, such as timbre, vibrato, and articulation.

The conventional indications of dynamics are abbreviations for Italian words like forte (f) for loud and piano (p) for soft. These two basic notations are modified by indications including mezzo piano (mp) for moderately soft (literally "half soft") and mezzo forte (mf) for moderately loud, sforzando or sforzato (sfz) for a surging or "pushed" attack, or fortepiano (fp) for a loud attack with a sudden decrease to a soft level. The full span of these markings usually range from a nearly inaudible pianissississimo (pppp) to a loud-as-possible fortissississimo (ffff).

Greater extremes of pppppp and fffff and nuances such as p+ or più piano are sometimes found. Other systems of indicating volume are also used in both notation and analysis: dB (decibels), numerical scales, colored or different sized notes, words in languages other than Italian, and symbols such as those for progressively increasing volume (crescendo) or decreasing volume (decrescendo), often called "hairpins" when indicated with diverging or converging lines as shown in the graphic above.

Articulation

Examples of articulation marks. From left to right: staccato, staccatissimo, martellato, marcato, tenuto.

Articulation is the way the performer sounds notes. For example, staccato is the shortening of duration compared to the written note value, legato performs the notes in a smoothly joined sequence with no separation. Articulation is often described rather than quantified, therefore there is room to interpret how to execute precisely each articulation.

For example, staccato is often referred to as "separated" or "detached" rather than having a defined or numbered amount by which to reduce the notated duration. Violin players use a variety of techniques to perform different qualities of staccato. The manner in which a performer decides to execute a given articulation is usually based on the context of the piece or phrase, but many articulation symbols and verbal instructions depend on the instrument and musical period (e.g. viol, wind; classical, baroque; etc.).

There are a set of articulations that most instruments and voices perform in common. They are—from long to short: legato (smooth, connected); tenuto (pressed or played to full notated duration); marcato (accented and detached); staccato ("separated", "detached"); martelé (heavily accented or "hammered"). Many of these can be combined to create certain "in-between" articulations. For example, portato is the combination of tenuto and staccato. Some instruments have unique methods by which to produce sounds, such as spicatto for bowed strings, where the bow bounces off the string.

Texture

Introduction to Sousa's "Washington Post March," mm. 1–7 Play  features octave doubling [59] and a homorhythmic texture.

In music, texture is how the melodic, rhythmic, and harmonic materials are combined in a composition, thus determining the overall quality of the sound in a piece. Texture is often described in regard to the density, or thickness, and range, or width, between lowest and highest pitches, in relative terms as well as more specifically distinguished according to the number of voices, or parts, and the relationship between these voices. For example, a thick texture contains many "layers" of instruments. One of these layers could be a string section, or another brass.

The thickness also is affected by the amount and the richness of the instruments playing the piece. The thickness varies from light to thick. A lightly textured piece will have light, sparse scoring. A thickly or heavily textured piece will be scored for many instruments. A piece's texture may be affected by the number and character of parts playing at once, the timbre of the instruments or voices playing these parts and the harmony, tempo, and rhythms used.[60] The types categorized by number and relationship of parts are analyzed and determined through the labeling of primary textural elements: primary melody, secondary melody, parallel supporting melody, static support, harmonic support, rhythmic support, and harmonic and rhythmic support.[61]

Common types included monophonic texture (a single melodic voice, such as a piece for solo soprano or solo flute), biphonic texture (two melodic voices, such as a duo for bassoon and flute in which the bassoon plays a drone note and the flute plays the melody), polyphonic texture and homophonic texture (chords accompanying a melody).

Form or structure

A musical canon. Encyclopaedia Britannica calls a "canon" both a compositional technique and a musical form.[62]

The term musical form (or musical architecture) refers to the overall structure or plan of a piece of music, and it describes the layout of a composition as divided into sections.[63] In the tenth edition of The Oxford Companion to Music, Percy Scholes defines musical form as "a series of strategies designed to find a successful mean between the opposite extremes of unrelieved repetition and unrelieved alteration."[64] According to Richard Middleton, musical form is "the shape or structure of the work." He describes it through difference: the distance moved from a repeat; the latter being the smallest difference. Difference is quantitative and qualitative: how far, and of what type, different. In many cases, form depends on statement and restatement, unity and variety, and contrast and connection.[65]

Expression

A violinist performing.

Musical expression is the art of playing or singing music with emotional communication. The elements of music that comprise expression include dynamic indications, such as forte or piano, phrasing, differing qualities of timbre and articulation, color, intensity, energy and excitement. All of these devices can be incorporated by the performer. A performer aims to elicit responses of sympathetic feeling in the audience, and to excite, calm or otherwise sway the audience's physical and emotional responses. Musical expression is sometimes thought to be produced by a combination of other parameters, and sometimes described as a transcendent quality that is more than the sum of measurable quantities such as pitch or duration.

Expression on instruments can be closely related to the role of the breath in singing, and the voice's natural ability to express feelings, sentiment and deep emotions. Whether these can somehow be categorized is perhaps the realm of academics, who view expression as an element of musical performance that embodies a consistently recognizable emotion, ideally causing a sympathetic emotional response in its listeners.[66] The emotional content of musical expression is distinct from the emotional content of specific sounds (e.g., a startlingly-loud 'bang') and of learned associations (e.g., a national anthem), but can rarely be completely separated from its context.

The components of musical expression continue to be the subject of extensive and unresolved dispute.[67][68][69][70][71][72]

Notation

Tibetan musical score from the 19th century.

Musical notation is the written or symbolized representation of music. This is most often achieved by the use of commonly understood graphic symbols and written verbal instructions and their abbreviations. There are many systems of music notation from different cultures and different ages. Traditional Western notation evolved during the Middle Ages and remains an area of experimentation and innovation.[73]In the 2000s, computer file formats have become important as well.[74] Spoken language and hand signs are also used to symbolically represent music, primarily in teaching.

In standard Western music notation, tones are represented graphically by symbols (notes) placed on a staff or staves, the vertical axis corresponding to pitch and the horizontal axis corresponding to time. Note head shapes, stems, flags, ties and dots are used to indicate duration. Additional symbols indicate keys, dynamics, accents, rests, etc. Verbal instructions from the conductor are often used to indicate tempo, technique, and other aspects.

In Western music, a range of different music notation systems are used. In Western Classical music, conductors use printed scores that show all of the instruments' parts and orchestra members read parts with their musical lines written out. In popular styles of music, much less of the music may be notated. A rock band may go into a recording session with just a handwritten chord chart indicating the song's chord progression using chord names (e.g., C major, D minor, G7, etc.). All of the chord voicings, rhythms and accompaniment figures are improvised by the band members.

Basics of common-practice part writing

An important skill in music theory is common-practice part writing. While common practice is not incorporated into modern law, its rules are still helpful in understanding and analyzing music. Common law is based on the rules of counterpoint, which is the set of rules that were popularized in the 18th and 19th centuries.[27] Counterpoint aims to create harmonies and progressions that were considered acceptable and enjoyable during that time period.  Users of counterpoint included Bach, Handel, Mozart, Beethoven, and Brahms.[27] This style of writing is often practiced using two parts and divided into different species: 1st, 2nd, 3rd, and 4th, each one encompassing different ways that parts interact with certain rhythms.This practice is best represented in four-part writing, usually chorale style with two voice parts per clef. This writing centers around bass, tenor, soprano, and alto voice parts, the bass and tenor notes being written in the bass clef, and the alto and soprano in the treble. These four voices are used to create chordal progressions. Common practice does not just apply to four part writing; this can apply to a two part piece as well. There are, however, many rules to how these progressions must move.[27]

At the beginning of writing, a composer must concentrate on voice or instrument range and spacing. Whether it is an instrument or a voice, it is important to try to not stretch the range of a part higher or lower than an instrument is usually used to. Spacing is also an important aspect of part writing. Voice crossing, which is when a part goes higher or lower than the part that is above and below them, is forbidden in common practice part writing. An example of this would be the soprano part going lower that the alto part. A subset of this rule is voice overlapping, in which instead of crossing in tandem a voice will go higher and lower than their neighbor just was. For example, the soprano going lower than the alto was the beat immediately before it.[27]

In part writing, the usage of Conjunct Melodic Motion is important, in which the parts generally move in stepwise motion, and in counterpoint, if there is a leap (a jump of a fourth or above), the part will progress the opposite direction it just leapt in stepwise motion.[75] Parts also must progress together in contrary motion, meaning the parts are going in different directions. This is preferable to parallel motion, where the parts move together, or oblique motion, where one part doesn’t move and another does. Parallel motion can be used, but it is important to pay attention to intervals in order to avoid breaking counterpoint rules. Dissonant intervals, both melodic and harmonic intervals are not preferable in most cases.[75] This includes augmented or diminished intervals, tritones, and seventh chords, simply because they sound very jarring in a piece that is meant to sound pleasant to the ear. Parallel intervals, which occur when two parts move the same distance creating the same interval twice in a row, are also important to be aware of. However, this is only a problem when the intervals are either a perfect fifth or a perfect octave. These also can sound uncomfortable to the ear as they tend to have an open or hollow sound.[27]

While consonant intervals (intervals of a third or sixth) and perfect intervals (intervals of a fourth, fifth, eighth) are greatly important, dissonant intervals can occur within music, which is why resolutions are vital. The most basic rule of resolution is to always resolve the leading tone upwards (the leading tones being the 7th scales degree of the key that the piece is in).[27] When resolving the seventh scale degree to the tonic, it creates a sense of satisfaction and completion, relieving the tension that it created. Tritones also must be resolved correctly. These can occur in triads or seventh chords that are based on scale degree seven, and they must be resolved correctly. A tritone can either be an augmented fourth intervals or a diminished fifth based on the voicing that the composer uses. In common practice, an augmented fourth must resolve out, meaning the top voice resolves up and the bottom voice resolves down, creating a sixth Opposite of that a diminished fifth must resolve in, where the top voice resolves down and the bottom voice resolves up, creating an interval of a third. [27]

Music theory as academic discipline

The scholarly study of music theory in the twentieth century has a number of different subfields, each of which takes a different perspective on what are the primary phenomenon of interest and the most useful methods for investigation.

Analysis

Typically a given work is analyzed by more than one person and different or divergent analyses are created. For instance, the first two bars of the prelude to Claude Debussy's Pelléas et Melisande are analyzed differently by Leibowitz, Laloy, van Appledorn, and Christ. Leibowitz analyses this succession harmonically as D minor:I-VII-V, ignoring melodic motion, Laloy analyses the succession as D:I-V, seeing the G in the second measure as an ornament, and both van Appledorn and Christ analyses the succession as D:I-VII.  Play 

Musical analysis is the attempt to answer the question how does this music work? The method employed to answer this question, and indeed exactly what is meant by the question, differs from analyst to analyst, and according to the purpose of the analysis. According to Ian Bent, "analysis, as a pursuit in its own right, came to be established only in the late 19th century; its emergence as an approach and method can be traced back to the 1750s. However, it existed as a scholarly tool, albeit an auxiliary one, from the Middle Ages onwards."[76] Adolf Bernhard Marx was influential in formalising concepts about composition and music understanding towards the second half of the 19th century. The principle of analysis has been variously criticized, especially by composers, such as Edgard Varèse's claim that, "to explain by means of [analysis] is to decompose, to mutilate the spirit of a work".[77]

Schenkerian analysis is a method of musical analysis of tonal music based on the theories of Heinrich Schenker (1868–1935). The goal of a Schenkerian analysis is to interpret the underlying structure of a tonal work and to help reading the score according to that structure. The theory's basic tenets can be viewed as a way of defining tonality in music. A Schenkerian analysis of a passage of music shows hierarchical relationships among its pitches, and draws conclusions about the structure of the passage from this hierarchy. The analysis makes use of a specialized symbolic form of musical notation that Schenker devised to demonstrate various techniques of elaboration. The most fundamental concept of Schenker's theory of tonality may be that of tonal space.[78] The intervals between the notes of the tonic triad form a tonal space that is filled with passing and neighbour notes, producing new triads and new tonal spaces, open for further elaborations until the surface of the work (the score) is reached.

Although Schenker himself usually presents his analyses in the generative direction, starting from the fundamental structure (Ursatz) to reach the score, the practice of Schenkerian analysis more often is reductive, starting from the score and showing how it can be reduced to its fundamental structure. The graph of the Ursatz is arrhythmic, as is a strict-counterpoint cantus firmus exercise.[79] Even at intermediate levels of the reduction, rhythmic notation (open and closed noteheads, beams and flags) shows not rhythm but the hierarchical relationships between the pitch-events. Schenkerian analysis is subjective. There is no mechanical procedure involved and the analysis reflects the musical intuitions of the analyst.[80] The analysis represents a way of hearing (and reading) a piece of music.

Transformational theory is a branch of music theory developed by David Lewin in the 1980s, and formally introduced in his 1987 work, Generalized Musical Intervals and Transformations. The theory, which models musical transformations as elements of a mathematical group, can be used to analyze both tonal and atonal music. The goal of transformational theory is to change the focus from musical objects—such as the "C major chord" or "G major chord"—to relations between objects. Thus, instead of saying that a C major chord is followed by G major, a transformational theorist might say that the first chord has been "transformed" into the second by the "Dominant operation." (Symbolically, one might write "Dominant(C major) = G major.") While traditional musical set theory focuses on the makeup of musical objects, transformational theory focuses on the intervals or types of musical motion that can occur. According to Lewin's description of this change in emphasis, "[The transformational] attitude does not ask for some observed measure of extension between reified 'points'; rather it asks: 'If I am at s and wish to get to t, what characteristic gesture should I perform in order to arrive there?'"[81]

Music perception and cognition

Deutsch's scale illusion: an auditory illusion in which two scales are presented with successive tones alternating between each ear but are perceived as simultaneous, unbroken scales.[82]

Music psychology or the psychology of music may be regarded as a branch of both psychology and musicology. It aims to explain and understand musical behavior and experience, including the processes through which music is perceived, created, responded to, and incorporated into everyday life.[83][84] Modern music psychology is primarily empirical; its knowledge tends to advance on the basis of interpretations of data collected by systematic observation of and interaction with human participants. Music psychology is a field of research with practical relevance for many areas, including music performance, composition, education, criticism, and therapy, as well as investigations of human aptitude, skill, intelligence, creativity, and social behavior.

Music psychology can shed light on non-psychological aspects of musicology and musical practice. For example, it contributes to music theory through investigations of the perception and computational modelling of musical structures such as melody, harmony, tonality, rhythm, meter, and form. Research in music history can benefit from systematic study of the history of musical syntax, or from psychological analyses of composers and compositions in relation to perceptual, affective, and social responses to their music. Ethnomusicology can benefit from psychological approaches to the study of music cognition in different cultures.

Genre and technique

A Classical piano trio is a group that plays chamber music, including sonatas. The term "piano trio" also refers to works composed for such a group.

A music genre is a conventional category that identifies some pieces of music as belonging to a shared tradition or set of conventions.[85] It is to be distinguished from musical form and musical style, although in practice these terms are sometimes used interchangeably.[86]

Music can be divided into different genres in many different ways. The artistic nature of music means that these classifications are often subjective and controversial, and some genres may overlap. There are even varying academic definitions of the term genre itself. In his book Form in Tonal Music, Douglass M. Green distinguishes between genre and form. He lists madrigal, motet, canzona, ricercar, and dance as examples of genres from the Renaissance period. To further clarify the meaning of genre, Green writes, "Beethoven's Op. 61 and Mendelssohn's Op. 64 are identical in genre—both are violin concertos—but different in form. However, Mozart's Rondo for Piano, K. 511, and the Agnus Dei from his Mass, K. 317 are quite different in genre but happen to be similar in form."[87] Some, like Peter van der Merwe, treat the terms genre and style as the same, saying that genre should be defined as pieces of music that came from the same style or "basic musical language."[88]

Others, such as Allan F. Moore, state that genre and style are two separate terms, and that secondary characteristics such as subject matter can also differentiate between genres.[89] A music genre or subgenre may also be defined by the musical techniques, the style, the cultural context, and the content and spirit of the themes. Geographical origin is sometimes used to identify a music genre, though a single geographical category will often include a wide variety of subgenres. Timothy Laurie argues that "since the early 1980s, genre has graduated from being a subset of popular music studies to being an almost ubiquitous framework for constituting and evaluating musical research objects".[90]

Musical technique is the ability of instrumental and vocal musicians to exert optimal control of their instruments or vocal cords to produce precise musical effects. Improving technique generally entails practicing exercises that improve muscular sensitivity and agility. To improve technique, musicians often practice fundamental patterns of notes such as the natural, minor, major, and chromatic scales, minor and major triads, dominant and diminished sevenths, formula patterns and arpeggios. For example, triads and sevenths teach how to play chords with accuracy and speed. Scales teach how to move quickly and gracefully from one note to another (usually by step). Arpeggios teach how to play broken chords over larger intervals. Many of these components of music are found in compositions, for example, a scale is a very common element of classical and romantic era compositions.

Heinrich Schenker argued that musical technique's "most striking and distinctive characteristic" is repetition.[91] Works known as études (meaning "study") are also frequently used for the improvement of technique.

Mathematics

Music theorists sometimes use mathematics to understand music, and although music has no axiomatic foundation in modern mathematics, mathematics is "the basis of sound" and sound itself "in its musical aspects... exhibits a remarkable array of number properties", simply because nature itself "is amazingly mathematical".[92] The attempt to structure and communicate new ways of composing and hearing music has led to musical applications of set theory, abstract algebra and number theory. Some composers have incorporated the golden ratio and Fibonacci numbers into their work.[93][94] There is a long history of examining the relationships between music and mathematics. Though ancient Chinese, Egyptians and Mesopotamians are known to have studied the mathematical principles of sound,[95] the Pythagoreans (in particular Philolaus and Archytas)[96] of ancient Greece were the first researchers known to have investigated the expression of musical scales in terms of numerical ratios.

The first 16 harmonics, their names and frequencies, showing the exponential nature of the octave and the simple fractional nature of non-octave harmonics.

In the modern era, musical set theory uses the language of mathematical set theory in an elementary way to organize musical objects and describe their relationships. To analyze the structure of a piece of (typically atonal) music using musical set theory, one usually starts with a set of tones, which could form motives or chords. By applying simple operations such as transposition and inversion, one can discover deep structures in the music. Operations such as transposition and inversion are called isometries because they preserve the intervals between tones in a set. Expanding on the methods of musical set theory, some theorists have used abstract algebra to analyze music. For example, the pitch classes in an equally tempered octave form an abelian group with 12 elements. It is possible to describe just intonation in terms of a free abelian group.[97]

Serial composition and set theory

Tone row from Alban Berg's Lyric Suite, mov. I.  Play 

In music theory, serialism is a method or technique of composition that uses a series of values to manipulate different musical elements. Serialism began primarily with Arnold Schoenberg's twelve-tone technique, though his contemporaries were also working to establish serialism as one example of post-tonal thinking. Twelve-tone technique orders the twelve notes of the chromatic scale, forming a row or series and providing a unifying basis for a composition's melody, harmony, structural progressions, and variations. Other types of serialism also work with sets, collections of objects, but not necessarily with fixed-order series, and extend the technique to other musical dimensions (often called "parameters"), such as duration, dynamics, and timbre. The idea of serialism is also applied in various ways in the visual arts, design, and architecture[98]

"Integral serialism" or "total serialism" is the use of series for aspects such as duration, dynamics, and register as well as pitch. [99] Other terms, used especially in Europe to distinguish post–World War II serial music from twelve-tone music and its American extensions, are "general serialism" and "multiple serialism".[100]

Musical set theory provides concepts for categorizing musical objects and describing their relationships. Many of the notions were first elaborated by Howard Hanson (1960) in connection with tonal music, and then mostly developed in connection with atonal music by theorists such as Allen Forte (1973), drawing on the work in twelve-tone theory of Milton Babbitt. The concepts of set theory are very general and can be applied to tonal and atonal styles in any equally tempered tuning system, and to some extent more generally than that.

One branch of musical set theory deals with collections (sets and permutations) of pitches and pitch classes (pitch-class set theory), which may be ordered or unordered, and can be related by musical operations such as transposition, inversion, and complementation. The methods of musical set theory are sometimes applied to the analysis of rhythm as well.

Musical semiotics

Semiotician Roman Jakobson.

Music semiology (semiotics) is the study of signs as they pertain to music on a variety of levels. Following Roman Jakobson, Kofi Agawu adopts the idea of musical semiosis being introversive or extroversive—that is, musical signs within a text and without. "Topics," or various musical conventions (such as horn calls, dance forms, and styles), have been treated suggestively by Agawu, among others. The notion of gesture is beginning to play a large role in musico-semiotic enquiry.

"There are strong arguments that music inhabits a semiological realm which, on both ontogenetic and phylogenetic levels, has developmental priority over verbal language."[101][102][103][104][105][106][107][108]

Writers on music semiology include Kofi Agawu (on topical theory, Schenkerian analysis), Robert Hatten (on topic, gesture), Raymond Monelle (on topic, musical meaning), Jean-Jacques Nattiez (on introversive taxonomic analysis and ethnomusicological applications), Anthony Newcomb (on narrativity), and Eero Tarasti (generally considered the founder of musical semiotics).

Roland Barthes, himself a semiotician and skilled amateur pianist, wrote about music in Image-Music-Text, The Responsibilities of Form, and Eiffel Tower, though he did not consider music to be a semiotic system.

Signs, meanings in music, happen essentially through the connotations of sounds, and through the social construction, appropriation and amplification of certain meanings associated with these connotations. The work of Philip Tagg (Ten Little Tunes, Fernando the Flute, Music’s Meanings) provides one of the most complete and systematic analysis of the relation between musical structures and connotations in western and especially popular, television and film music. The work of Leonard Meyer in Style and Music theorizes the relationship between ideologies and musical structures and the phenomena of style change, and focuses on romanticism as a case study.

Education and careers

Columbia University music theorist Pat Carpenter in a 2013 photo.

Music theory in the practical sense has been a part of education at conservatories and music schools for centuries, but the status music theory currently has within academic institutions is relatively recent. In the 1970s, few universities had dedicated music theory programs, many music theorists had been trained as composers or historians, and there was a belief among theorists that the teaching of music theory was inadequate and that the subject was not properly recognised as a scholarly discipline in its own right.[109] A growing number of scholars began promoting the idea that music theory should be taught by theorists, rather than composers, performers or music historians.[109] This led to the founding of the Society for Music Theory in the United States in 1977. In Europe, the French Société d'Analyse musicale was founded in 1985. It called the First European Conference of Music Analysis for 1989, which resulted in the foundation of the Société belge d'Analyse musicale in Belgium and the Gruppo analisi e teoria musicale in Italy the same year, the Society for Music Analysis in the UK in 1991, the Vereniging voor Muziektheorie in the Netherlands in 1999 and the Gesellschaft für Musiktheorie in Germany in 2000.[110] They were later followed by the Russian Society for Music Theory in 2013 and the Polish Society for Music Analysis in 2015, and others are in construction. These societies coordinate the publication of music theory scholarship and support the professional development of music theory researchers.

As part of their initial training, music theorists will typically complete a B.Mus or a B.A. in music (or a related field) and in many cases an M.A. in music theory. Some individuals apply directly from a bachelor's degree to a Ph.D, and in these cases, they may not receive an M.A. In the 2010s, given the increasingly interdisciplinary nature of university graduate programs, some applicants for music theory Ph.D programs may have academic training both in music and outside of music (e.g., a student may apply with a B.Mus and a Masters in Music Composition or Philosophy of Music).

Most music theorists work as instructors, lecturers or professors in colleges, universities or conservatories. The job market for tenure-track professor positions is very competitive. Applicants must hold a completed Ph.D or the equivalent degree (or expect to receive one within a year of being hired—called an "ABD", for "All But Dissertation" stage) and (for more senior positions) have a strong record of publishing in peer-reviewed journals. Some Ph.D-holding music theorists are only able to find insecure positions as sessional lecturers. The job tasks of a music theorist are the same as those of a professor in any other humanities discipline: teaching undergraduate and/or graduate classes in this area of specialization and, in many cases some general courses (such as Music Appreciation or Introduction to Music Theory), conducting research in this area of expertise, publishing research articles in peer-reviewed journals, authoring book chapters, books or textbooks, traveling to conferences to present papers and learn about research in the field, and, if the program includes a graduate school, supervising M.A. and Ph.D students and giving them guidance on the preparation of their theses and dissertations. Some music theory professors may take on senior administrative positions in their institution, such as Dean or Chair of the School of Music.

See also

Notes

  1. Fallows, David. "Theory". The Oxford Companion to Music. Oxford Music Online. Retrieved 11 September 2016.
  2. See Boethius's De institutione musica, in which he disdains "musica instrumentalis" as beneath the "true" musician who studies music in the abstract: Multo enim est maius atque auctius scire, quod quisque faciat, quam ipsum illud efficere, quod sciat ("It is much better to know what one does than to do what one knows").
  3. See, for example, chapters 4-7 of Christensen, Thomas (2002). The Cambridge History of Western Music Theory. Cambridge, UK: Cambridge University Press.
  4. Latham 2002, 15–17.
  5. OED 2005.
  6. Palisca and Bent n.d., Theory, theorists. 1. Definitions.
  7. Mirelman 2010; Mirelman 2013; Wulstan 1968; Kümmel 1970; Kilmer 1971; Kilmer and Mirelman n.d.
  8. Mirelman 2013, 43–44.
  9. 1 2 Joseph S.C. Lam, "China.", §II, "History and Theory", Grove Music Online. Oxford Music Online. Oxford University Press, accessed November 15, 2015, http://www.oxfordmusiconline.com/subscriber/article/grove/music/43141pg2.
  10. Robert Bagley, "The Prehistory of Chinese Music Theory", Proceedings of the British Academy 131, 2004 (Lectures), pp. 41–90.
  11. 1 2 Service 2013.
  12. Crease 2011, 40–41.
  13. Wu and Wu 2014, 41–42.
  14. The Nāțyaśāstra, A Treatise on Hindu Dramaturgy and Histrionics, attributed to Bharata-Muni, translated from the Sanskrit with introduction and notes by Manomohan Ghosh, vol. II, Calcutta, The Asiatic Society, 1961. See particularly pp. 5-19 of the Introduction, The Ancient Indian Theory and Practice of Music.
  15. Thomas J. Mathiesen, "Greek Music Theory", The Cambridge History of Western Music Theory, Th. Christensen ed., Cambridge, Cambridge University Press, 2002, pp. 112-113.
  16. English translation in Andrew Barker, Greek Musical Writings, vol. 2: Harmonic and Acoustic Theory, Cambridge, Cambridge University Press, 1989, pp. 191-208.
  17. Joseph S.C. Lam, "China.", §II, "History and Theory", Grove Music Online. Oxford Music Online. Oxford University Press, http://www.oxfordmusiconline.com/subscriber/article/grove/music/43141pg2.
  18. See the List of medieval music theorists, which includes several Arabic theorists; see also d'Erlanger & 1930–56, 1:xv-xxiv.
  19. Manik 1969, 24-33.
  20. Wright 2001a; Wright 2001b; Manik 1969, 22-24.
  21. Rodolphe d'Erlanger, La Musique arabe, vol. I, pp. 1-306; vol. II, pp. 1-101.
  22. d'Erlanger & 1930–56, 2:103–245.
  23. Shiloah 1964.
  24. d'Erlanger & 1930–56, 3:1-182.
  25. Anon. LXII in Amnon Shiloah, The Theory of Music in Arabic Writings (c.900–1900): Descriptive Catalogue of Manuscripts in Libraries of Europe and the U.S.A., RISM, München, G. Henle Verlag, 1979. See d'Erlanger & 1930–56, 3:183-566
  26. Ghrab 2009.
  27. 1 2 3 4 5 6 7 8 9 10 Shiloah, Amnon (2003). The Theory of Music in Arabic Writings (c. 900-1900). Germany: G. Henle Verlag Munchen. pp. 48, 58, 60–61. ISBN 0-8203-0426-3.
  28. 1 2 Palisca and Bent n.d., §5 Early Middle Ages.
  29. Palisca and Bent n.d., Theory, theorists §5 Early Middle Ages: "Boethius could provide a model only for that part of theory which underlies but does not give rules for composition or performance. The first surviving strictly musical treatise of Carolingian times is directed towards musical practice, the Musica disciplina of Aurelian of Réôme (9th century)."
  30. For a modern edition of the letter, see .
  31. Kubik 2010, passim.
  32. Ekwueme 1974, passim.
  33. Cobb, Jr., Buell E. (1978). The Sacred Harp: A Tradition and Its Music. United States of America: The University of Georgia Press Athens. pp. 4–5, 60–61. ISBN 0-8203-0426-3.
  34. Palisca and Bent n.d.
  35. Hartmann 2005, .
  36. Bartlette and Laitz 2010, .
  37. 1 2 Touma 1996, .
  38. Forsyth 1935, 73-74.
  39. Latham 2002, .
  40. Latham 2002, .
  41. "Syncopation". Oxford Dictionary of Music. Retrieved 11 August 2017. Syncopation is achieved by accenting a weak instead of a strong beat, by putting rests on strong beats, by holding on over strong beats, and by introducing a sudden change of time‐signature.
  42. "Polyrhythm". Grove Music Online. Oxford University Press. Retrieved 11 August 2017. The superposition of different rhythms or metres.
  43. Lerdahl, Fred; Jackendoff, Ray (1985). A generative theory of tonal music. Cambridge, MA: MIT Press.
  44. Kramer, Jonathan D. (1988). The Time of Music: New Meanings, New Temporalities, New Listening Strategies. New York: Schirmer Books.
  45. London, Justin (2004). Hearing in Time: Psychological Aspects of Musical Meter. Oxford: Oxford University Press.
  46. Kliewer 1975, .
  47. Stein 1979, 3–47.
  48. Benward and Saker 2003, 67, 359.
  49. Károlyi 1965, 63.
  50. Mitchell 2008.
  51. Linkels n.d., .
  52. 1 2 Malm 1996, 15.
  53. Schoenberg 1983, 1–2.
  54. Benward and Saker 2003, 77.
  55. Dahlhaus 2009.
  56. Jamini 2005, 147.
  57. McAdams and Bregman 1979, 34.
  58. Mannell n.d.
  59. Benward and Saker 2003, p. 133.
  60. Benward and Saker 2003, .
  61. Isaac and Russell 2003, 136.
  62. http://www.britannica.com/art/canon-music
  63. Brandt 2007.
  64. Scholes 1977.
  65. Middleton 1999, .
  66. London n.d.
  67. Avison 1752, .
  68. Christiani 1885, .
  69. Lussy 1892, .
  70. Darwin 1913, .
  71. Sorantin 1932, .
  72. Davies 1994, .
  73. Read 1969, ; Stone 1980, .
  74. Castan 2009.
  75. 1 2 Tymoczko, Dmitri (March 2011). Oxford Studies in Music Theory : A Geometry of Music : Harmony and Counterpoint in the Extended Common Practice. Oxford University Press. pp. 193–198. ISBN 9780195336672.
  76. Bent 1987, 6.
  77. Quoted in Bernard 1981, 1
  78. Schenker described the concept in a paper titled Erläuterungen ("Elucidations"), which he published four times between 1924 and 1926: Der Tonwille vol. 8–9, pp. 49–51, vol. 10, pp. 40–2; Das Meisterwerk in der Musik, vol. 1, pp. 201–05; 2, p. 193-97. English translation, Der Tonwille, vol. 2, p. 117-18 (the translation, although made from vols. 8–9 of the German original, gives as original pagination that of Das Meisterwerk 1; the text is the same). The concept of tonal space is still present in Schenker (n.d., especially § 13), but less clearly than in the earlier presentation.
  79. Schenker n.d., § 21.
  80. Snarrenberg 1997, .
  81. Lewin 1987, 159.
  82. Bregman 1994, 76.
  83. Tan, Peter, and Rom 2010, 2.
  84. Thompson n.d., 320.
  85. Samson n.d.
  86. Wong 2011.
  87. Green 1979, 1.
  88. van der Merwe 1989, 3.
  89. Moore 2001, 432-33.
  90. Laurie 2014, 284.
  91. Kivy 1993, 327.
  92. Smith Brindle 1987, 42–43.
  93. Smith Brindle 1987, chapter 6, passim.
  94. Garland and Kahn 1995, .
  95. Smith Brindle 1987, 42.
  96. Purwins 2005, 22–24.
  97. Wohl 2005.
  98. Bandur 2001, 5, 12, 74; Gerstner 1964, passim
  99. Whittall 2008, 273.
  100. Grant 2001, 5–6.
  101. Middleton 1990, 172.
  102. Nattiez 1976.
  103. Nattiez 1990.
  104. Nattiez1989.
  105. Stefani 1973.
  106. Stefani 1976.
  107. Baroni 1983.
  108. Semiotica 1987, 66:13.
  109. 1 2 McCreless, Patrick. "Society for Music Theory". Grove Music Online. Oxford University Press.
  110. N. Meeùs, "Épistémologie d’une musicologie analytique", Musurgia XXII/3-4 (2015), p. 111.

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Further reading

  • Apel, Willi, and Ralph T. Daniel (1960). The Harvard Brief Dictionary of Music. New York: Simon & Schuster Inc. ISBN 0-671-73747-3
  • Baur, John (2014). Practical Music Theory. Dubuque: Kendall-Hunt Publishing Company. ISBN 978-1-4652-1790-5
  • Benward, Bruce, Barbara Garvey Jackson, and Bruce R. Jackson. (2000). Practical Beginning Theory: A Fundamentals Worktext, 8th edition, Boston: McGraw-Hill. ISBN 0-697-34397-9. [First edition 1963]
  • Brown, James Murray (1967). A Handbook of Musical Knowledge, 2 vols. London: Trinity College of Music.
  • Chase, Wayne (2006). How Music REALLY Works!, second edition. Vancouver, Canada: Roedy Black Publishing. ISBN 1-897311-55-9 (book).
  • Dunbar, Brian (2010). Practical Music Theory: A Guide to Music as Art, Language, and Life. Rochester, Minn., USA: Factum Musicae. ISBN 978-0578062471.
  • Hewitt, Michael (2008). Music Theory for Computer Musicians. USA: Cengage Learning. ISBN 978-1-59863-503-4.
  • Lawn, Richard J., and Jeffrey L. Hellmer (1996). Jazz Theory and Practice. [N.p.]: Alfred Publishing Co. ISBN 0-88284-722-8.
  • Mazzola, Guerino (1985). Gruppen und Kategorien in der Musik: Entwurf einer mathematischen Musiktheorie. Heldermann. ISBN 978-3-88538-210-2. Retrieved 26 February 2012. 
  • Mazzola, Guerino; Daniel Muzzulini (1990). Geometrie der Töne: Elemente der mathematischen Musiktheorie. Birkhäuser. ISBN 978-3-7643-2353-0. Retrieved 26 February 2012. 
  • Mazzola, Guerino, Stefan Göller, and Stefan Müller (2002). The Topos of Music: Geometric Logic of Concepts, Theory, and Performance, Vol. 1. Basel, Boston, and Berlin: Birkhäuser. ISBN 978-3-7643-5731-3. (Basel). ISBN 978-0-8176-5731-4 (Boston). Retrieved 26 February 2012. 
  • Olson, Harry F. (1967). Music, Physics and Engineering. New York: Dover Publications. ISBN 0-486-21769-8. 
  • Miguel, Roig-Francoli (2011). Harmony in Context, Second edition, McGraw-Hill Higher Education. ISBN 0073137944.
  • Mirelman, Sam, and Theo Krispijn (2009). "The Old Babylonian Tuning Text UET VI/3 899". Iraq 71:43–52.
  • Owen, Harold (2000). Music Theory Resource Book. Oxford University Press. ISBN 0-19-511539-2.
  • Seashore, Carl (1933). Approaches to the Science of Music and Speech. Iowa City: The University.
  • Seashore, Carl (1938). Psychology of Music. New York, London: McGraw-Hill Book Company, Inc.
  • Sorce, Richard (1995). Music Theory for the Music Professional. [N.p.]: Ardsley House. ISBN 1-880157-20-9.
  • Taruskin, Richard (2009). "Music from the Earliest Notations to the Sixteenth Century: The Oxford History of Western Music." Oxford University Press ISBN 0195384814.
  • Taylor, Eric (1989). AB Guide to Music Theory, Part 1. London: Associated Board of the Royal Schools of Music. ISBN 1-85472-446-0.
  • Taylor, Eric (1991). AB Guide to Music Theory, Part 2. London: Associated Board of the Royal Schools of Music. ISBN 1-85472-447-9.
  • Yamaguchi, Masaya (2006). The Complete Thesaurus of Musical Scales, revised edition. New York: Masaya Music Services. ISBN 0-9676353-0-6.
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