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An incomposite interval (; (ドイツ語:ungeteilte Intervall, einfache Intervall)) is a concept in the Ancient Greek theory of music concerning melodic musical intervals () between neighbouring notes in a tetrachord or scale which, for that reason, do not encompass smaller intervals. ( means "uncompounded".)〔Henry George Liddell and Robert Scott, ''A Greek–English Lexicon'', revised and augmented throughout by Sir Henry Stuart Jones and Roderick McKenzie (Oxford: Clarendon Press; New York: Oxford University Press, 1996). ISBN 0-19-864226-1.〕 Aristoxenus (fl. 335 BCE) defines melodically incomposite intervals in the following context: In another place, Aristoxenus clarifies that It is thus not an issue of the voice being physically incapable of singing a note within an incomposite interval. For example, in the enharmonic genus the distance from the neighbouring scale degrees ''lichanos'' () to ''mesē'' () is a ditone—a gap equivalent to the major-third interval between F and A in the modern scale. In such a case the function of the note λιχανός is such that "the 'nature of μελῳδία' somehow requires that it should leap forward at least as far as μέση, without touching down anywhere in between. Any smaller distance is melodically impossible or unintelligible, ἐκμελής".〔Andrew Barker, "The Journeying Voice: Melody and Metaphysics in Aristoxenian Science", ''Apeiron: A Journal for Ancient Philosophy and Science'' 38, no. 3 (September 2005): 161–84. Citation on 173.〕 The nature of the chromatic genus, too, is an attribute of the ''kinēsis phonēs'' (, "potentiality of the sounds"), so that certain melody types are "brought into being". In other words, "being composite" and "being incomposite" are attributes of the dynamic character of melodic motion. "None of these consists in the voice's coming to rest at points separated by distances of specific and determinate sizes".〔Andrew Barker, "The Journeying Voice: Melody and Metaphysics in Aristoxenian Science", ''Apeiron: A Journal for Ancient Philosophy and Science'' 38, no. 3 (September 2005): 161–84. Citation on 175.〕 An incomposite interval is "bounded by successive notes" in a scale: "If the bounding notes are successive, no note has been left out; if none has been left out, none will intervene; if none intervenes, none will divide the interval; and what does not admit of division will not be composite".〔Aristoxenus, ''Harmonic Introduction'' III:2, translated in Andrew Barker, ''Greek Musical Writings: Volume 2, Harmonic and Acoustic Theory'', Cambridge Readings in the Literature of Music 2 (Cambridge and New York: Cambridge University Press, 1989): 172. ISBN 978-0-521-61697-3.〕 Gaudentius (before the 6th century CE) explains incomposite intervals as scale-building elements: Aristides Quintilianus (writing probably in the 3rd century AD) enumerates the incomposite intervals: "the smallest, so far as their use in melody is concerned, is the enharmonic diesis, followed—to speak rather roughly—by the semitone, which is twice the diesis, the tone, which is twice the semitone, and finally the ditone, which is twice the tone".〔Aristides Quintilianus, ''De musica'', translation from Andrew Barker, ''Greek Musical Writings: Volume 2, Harmonic and Acoustic Theory'', Cambridge Readings in the Literature of Music 2 (Cambridge and New York: Cambridge University Press, 1989): 410. ISBN 978-0-521-61697-3.〕 These various sizes of incomposite interval depend on the genus of the tetrachord, as explained by Nicomachus in the first century AD: Thus whether an interval is composite or incomposite is a matter of context (that is, the genus in effect at that point in the melody). A semitone is an incomposite interval in the diatonic or chromatic genera, but not because quarter tone intervals may be difficult to sing in tune. It is a composite interval in the enharmonic genus, where the semitone occurs only as the outer interval of the ''pyknon'', made of two quarter tones. Following the strict definition found in Nicola Vicentino's ''L'antica musica ridotta alla moderna prattica'' (1555), all intervals larger than the major third (or ditone) are necessarily composite. However, for the purpose of his discussion of the "modern practice" of the 16th century, he extended the definition to include larger intervals within the octave. Accordingly, a perfect fourth is "composite" if it is filled in stepwise in a composition (C-D-E-F), but is "incomposite" when it occurs as a melodic leap or harmonic interval, without any intermediary tones.〔Henry W. Kaufmann, "Vicentino and the Greek Genera", ''Journal of the American Musicological Society'' 16, no. 3 (Autumn 1963): 325–46. Citation on 331.〕 One 20th-century interpretation is more restrictive than the definitions found in Ancient Greek sources, referring to "a large interval which appears as a melodic step or second in a scale, but which is a skip in other parts of the scale."〔John H. Chalmers, ''Divisions of the Tetrachord'' (Lebanon, New Hampshire: Frog Peak Music, 1993): 209. ISBN 978-0-945996-04-0.〕 For example the augmented second in the harmonic minor scale, on A, occurs as a step between F and G, though the equivalent minor third occurs elsewhere, such as a skip between A & C. ==See also== *Octave species 抄文引用元・出典: フリー百科事典『 ウィキペディア(Wikipedia)』 ■ウィキペディアで「Incomposite interval」の詳細全文を読む スポンサード リンク
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