music Music is the arrangement of sound to create some combination of Musical form, form, harmony, melody, rhythm, or otherwise Musical expression, expressive content. Music is generally agreed to be a cultural universal that is present in all hum ...

, the undertone series or subharmonic series is a sequence of

notes Note, notes, or NOTE may refer to: Music and entertainment * Musical note, a pitched sound (or a symbol for a sound) in music * ''Notes'' (album), a 1987 album by Paul Bley and Paul Motian * ''Notes'', a common (yet unofficial) shortened versi ...

that results from inverting the intervals of the

overtone series The harmonic series (also overtone series) is the sequence of harmonics, musical tones, or pure tones whose frequency is an integer multiple of a ''fundamental frequency''. Pitched musical instruments are often based on an acoustic resonator s ...

. While overtones naturally occur with the physical production of music on instruments, undertones must be produced in unusual ways. While the overtone series is based upon arithmetic multiplication of frequencies, resulting in a harmonic series, the undertone series is based on arithmetic division. Nattiez shows the undertone series on E, as Riemann (''Handbuch der Harmonielehre'', 10th ed., 1929, p. 4) and D'Indy (''Cours de composition musicale'', vol. I, 1912, p. 100) had done.

Terminology

The hybrid term ''subharmonic'' is used in

in a few different ways. In its pure sense, the term ''subharmonic'' refers strictly to any member of the subharmonic series (, , , , etc.). When the subharmonic series is used to refer to frequency relationships, it is written with f representing some highest known reference frequency (, , , , etc.). As such, one way to define subharmonics is that they are "... integral submultiples of the fundamental (driving) frequency". The complex tones of acoustic instruments do not produce partials that resemble the subharmonic series, unless they are played or designed to induce non-linearity. However, such tones can be produced artificially with audio software and electronics. Subharmonics can be contrasted with

harmonics In physics, acoustics, and telecommunications, a harmonic is a sinusoidal wave with a frequency that is a positive integer multiple of the ''fundamental frequency'' of a periodic signal. The fundamental frequency is also called the ''1st harm ...

. While harmonics can "... occur in any linear system", there are "... only fairly restricted conditions" that will lead to the "nonlinear phenomenon known as subharmonic generation". In a second sense, ''subharmonic'' does not relate to the subharmonic series, but instead describes an instrumental technique for lowering the pitch of an acoustic instrument below what would be expected for the resonant frequency of that instrument, such as a violin string that is driven and damped by increased bow pressure to produce a fundamental frequency lower than the normal pitch of the same open string. The human voice can also be forced into a similar driven resonance, also called "undertone singing" (which similarly has nothing to do with the undertone series), to extend the range of the voice below what is normally available. However, the frequency relationships of the component partials of the tone produced by the acoustic instrument or voice played in such a way still resemble the harmonic series, not the subharmonic series. In this sense, ''subharmonic'' is a term created by reflection from the second sense of the term ''harmonic'', which in that sense refers to an instrumental technique for making an instrument's pitch seem higher than normal by eliminating some lower partials by damping the resonator at the antinodes of vibration of those partials (such as placing a finger lightly on a string at certain locations). In a very loose third sense, ''subharmonic'' is sometimes used or misused to represent any frequency lower than some other known frequency or frequencies, no matter what the frequency relationship is between those frequencies and no matter the method of production.

Methods for producing an undertone series

The overtone series can be produced physically in two ways – either by overblowing a

wind instrument A wind instrument is a musical instrument that contains some type of resonator (usually a tube) in which a column of air is set into vibration by the player blowing into (or over) a mouthpiece set at or near the end of the resonator. The pitch ...

, or by dividing a

monochord A monochord, also known as sonometer (see below), is an ancient musical and scientific laboratory instrument, involving one (mono-) string ( chord). The term ''monochord'' is sometimes used as the class-name for any musical stringed instrument ...

string. If a monochord string is lightly damped at the halfway point, then at , then , , etc., then the string will produce the overtone series, which includes the

major triad In music theory, a major chord is a chord that has a root, a major third, and a perfect fifth. When a chord comprises only these three notes, it is called a major triad. For example, the major triad built on C, called a C major triad, has pitch ...

. If instead, the length of the string is multiplied in the opposite ratios, the undertones series is produced. Vocal subharmonics or subharmonic singing is a vocal technique that lets singers produce notes below the fundamental and follows the undertone series. It can extend down from the regular

vocal range Vocal range is the range of pitches that a human voice can phonate. A common application is within the context of singing, where it is used as a defining characteristic for classifying singing voices into voice types. It is also a topic of stud ...

an octave and further below when well controlled. It can be described as having a stable vocal fry-like sound. These pitches are produced by a combination of oscillations of turbulent airflow in the vocal tract. Coming from multiple sound sources such as the true and false vocal cords. Singers often describe it as feeling like stable points below regularly sung notes where it snaps or jumps specific intervals. This technique might also happen by accident when talking or singing in a fry voice.

String quartet The term string quartet refers to either a type of musical composition or a group of four people who play them. Many composers from the mid-18th century onwards wrote string quartets. The associated musical ensemble consists of two Violin, violini ...

s by composers

George Crumb George Henry Crumb Jr. (24 October 1929 – 6 February 2022) was an American composer of avant-garde contemporary classical music. Early in his life he rejected the widespread modernist usage of serialism, developing a highly personal musical ...

and Daniel James Wolf, as well as works by violinist and composer

Mari Kimura (; born 1962) is a Japanese violinist and composer best known for her use of subharmonics, which, achieved through special bowing techniques, allow pitches below the instrument's normal range. She is credited with "introducing" the use of violin ...

, include undertones, "produced by bowing with great pressure to create pitches below the lowest open string on the instrument." These require string instrument players to bow with sufficient pressure that the strings vibrate in a manner causing the sound waves to modulate and demodulate by the instrument's resonating horn with frequencies corresponding to subharmonics. The tritare, a guitar with Y-shaped strings, cause subharmonics too. This can also be achieved by the

extended technique In music, extended technique is unconventional, unorthodox, or non-traditional methods of singing or of playing musical instruments employed to obtain unusual sounds or timbres.Burtner, Matthew (2005).Making Noise: Extended Techniques after Exper ...

of crossing two strings as some experimental jazz guitarists have developed. Also third bridge preparations on guitars cause timbres consisting of sets of high pitched overtones combined with a subharmonic resonant tone of the unplugged part of the string. Subharmonics can be produced by signal amplification through

loudspeakers A loudspeaker (commonly referred to as a speaker or, more fully, a speaker system) is a combination of one or more speaker drivers, an enclosure, and electrical connections (possibly including a crossover network). The speaker driver is an ...

. They are also a common effect in both digital and analog

signal processing Signal processing is an electrical engineering subfield that focuses on analyzing, modifying and synthesizing ''signals'', such as audio signal processing, sound, image processing, images, Scalar potential, potential fields, Seismic tomograph ...

Octave effect Octave effect boxes are a type of special effects unit which mix the input signal with a synthesized signal whose musical tone is an octave lower or higher than the original. The synthesised octave signal is derived from the original input signa ...

processors synthesize a subharmonic tone at a fixed interval to the input.

Subharmonic synthesizer A subharmonic synthesizer is a device or system that generates subharmonics of an input signal. The ''n''th subharmonic of a signal of fundamental frequency ''F'' is a signal with frequency ''F''/''n''. This differs from ordinary harmonics, where th ...

systems used in audio production and mastering work on the same principle. By a similar token,

analog synthesizers An analog synthesizer () is a synthesizer that uses analog circuits and analog signals to generate sound electronically. The earliest analog synthesizers in the 1920s and 1930s, such as the Trautonium, were built with a variety of vacuum-tub ...

such as the Serge synthesizer and many modern Eurorack synthesizers can produce undertone series as a side effect of the solid state timing circuits (e.g. the

555 timer IC The 555 timer IC is an integrated circuit used in a variety of timer, delay, pulse generation, and Electronic oscillator, oscillator applications. It is one of the most popular timing ICs due to its flexibility and price. Derivatives provide two ...

) in their envelope generators not being able to re-trigger until their cycle is complete. As an example, sending a clock of period into an envelope generator where the sum of the rise and fall time is greater than and less than would result in an output waveform that tracks at of the frequency of the input clock.

Comparison to the overtone series

Subharmonic frequencies are frequencies below the fundamental frequency of an oscillator in a ratio of 1/, with a positive

integer An integer is the number zero (0), a positive natural number (1, 2, 3, ...), or the negation of a positive natural number (−1, −2, −3, ...). The negations or additive inverses of the positive natural numbers are referred to as negative in ...

. For example, if the fundamental frequency of an oscillator is 440 Hz, sub-harmonics include 220 Hz (), ~146.6 Hz () and 110 Hz (). Thus, they are a mirror image of the harmonic series, the overtone series.

Notes in the series

In the overtone series, if we consider C as the fundamental, the first five notes that follow are: C (one

octave In music, an octave (: eighth) or perfect octave (sometimes called the diapason) is an interval between two notes, one having twice the frequency of vibration of the other. The octave relationship is a natural phenomenon that has been referr ...

higher), G (

perfect fifth In music theory, a perfect fifth is the Interval (music), musical interval corresponding to a pair of pitch (music), pitches with a frequency ratio of 3:2, or very nearly so. In classical music from Western culture, a fifth is the interval f ...

higher than previous note), C (

perfect fourth A fourth is a interval (music), musical interval encompassing four staff positions in the music notation of Western culture, and a perfect fourth () is the fourth spanning five semitones (half steps, or half tones). For example, the ascending int ...

higher than previous note), E (

major third In music theory, a third is a Interval (music), musical interval encompassing three staff positions (see Interval (music)#Number, Interval number for more details), and the major third () is a third spanning four Semitone, half steps or two ...

higher than previous note), and G (

minor third In music theory, a minor third is a interval (music), musical interval that encompasses three half steps, or semitones. Staff notation represents the minor third as encompassing three staff positions (see: interval (music)#Number, interval numb ...

higher than previous note). The pattern occurs in the same manner using the undertone series. Again we will start with C as the fundamental. The first five notes that follow will be: C (one

lower), F (

lower than previous note), C (

lower than previous note), A (

lower than previous note), and F (

lower than previous note).

Triads

If the first five notes of both series are compared, a pattern is seen: *Overtone series: C C G C E G *Undertone series: C C F C A F The undertone series in C contains the F minor triad. Elizabeth Godley argued that the minor triad is also implied by the undertone series and is also a naturally occurring thing in

acoustics Acoustics is a branch of physics that deals with the study of mechanical waves in gases, liquids, and solids including topics such as vibration, sound, ultrasound and infrasound. A scientist who works in the field of acoustics is an acoustician ...

. "According to this theory the ''upper'' and not the lower tone of a minor chord is the generating tone on which the unity of the chord is conditioned." Whereas the major chord consists of a generator with upper major third and perfect fifth, the minor chord consists of a generator with lower major third and fifth.

Resonance

Hermann von Helmholtz Hermann Ludwig Ferdinand von Helmholtz (; ; 31 August 1821 – 8 September 1894; "von" since 1883) was a German physicist and physician who made significant contributions in several scientific fields, particularly hydrodynamic stability. The ...

observed in ''On the Sensations of Tone'' that the tone of a string tuned to C on a piano changes more noticeably when the notes of its undertone series (C, F, C, A, F, D, C, etc.) are struck than those of its overtones. Helmholtz argued that sympathetic resonance is at least as active in under partials as in over partials. Henry Cowell discusses a "Professor Nicolas Garbusov of the Moscow Institute for Musicology" who created an instrument "on which at least the first nine undertones could be heard without the aid of resonators." The phenomenon is described as occurring in resonators of instruments; :"the original sounding body does not produce the undertones but it is difficult to avoid them in resonation ... such resonators under certain circumstances respond to only every other vibration producing a half tone ... even if the resonator responds normally to every vibration ... under other circumstances the body resonates at only every third vibration ... the fact that such underpartials are often audible in music makes them of importance in understanding certain musical relationships ... the subdominant ... the minor triad."

Importance in musical composition

First proposed by Zarlino in ''Instituzione armoniche'' (1558), the undertone series has been appealed to by theorists such as Riemann and D'Indy to explain phenomena such as the

minor chord In music theory, a minor chord is a chord that has a root, a minor third, and a perfect fifth. When a chord comprises only these three notes, it is called a minor triad. For example, the minor triad built on A, called an A minor triad, has pit ...

, that they thought the overtone series would not explain. However, while the overtone series occurs naturally as a result of wave propagation and sound

, musicologists such as

Paul Hindemith Paul Hindemith ( ; ; 16 November 189528 December 1963) was a German and American composer, music theorist, teacher, violist and conductor. He founded the Amar Quartet in 1921, touring extensively in Europe. As a composer, he became a major advo ...

considered the undertone series to be a purely theoretical 'intervallic reflection' of the overtone series. This assertion rests on the fact that undertones do not sound simultaneously with its fundamental tone as the overtone series does. In 1868, Adolf von Thimus showed that an indication by a 1st-century Pythagorean,

Nicomachus of Gerasa Nicomachus of Gerasa (; ) was an Ancient Greek Neopythagorean philosopher from Gerasa, in the Roman province of Syria (now Jerash, Jordan). Like many Pythagoreans, Nicomachus wrote about the mystical properties of numbers, best known for his ...

, taken up by

Iamblichus Iamblichus ( ; ; ; ) was a Neoplatonist philosopher who determined a direction later taken by Neoplatonism. Iamblichus was also the biographer of the Greek mystic, philosopher, and mathematician Pythagoras. In addition to his philosophical co ...

in the 4th century, and then worked out by von Thimus, revealed that Pythagoras already had a diagram that could fill a page with interlocking over- and undertone series. Kathleen Schlesinger pointed out, in 1939, that since the ancient Greek

aulos An ''aulos'' (plural ''auloi''; , plural ) or ''tibia'' (Latin) was a wind instrument in ancient Greece, often depicted in art and also attested by archaeology. Though the word ''aulos'' is often translated as "flute" or as " double flute", ...

, or reed-blown flute, had holes bored at equal distances, it must have produced a section of the undertone series. She said that this discovery not only cleared up many riddles about the original Greek modes, but indicated that many ancient systems around the world must have also been based on this principle. One area of conjecture is that the undertone series might be part of the compositional design phase of the compositional process. The overtone and undertone series can be considered two different arrays, with smaller arrays that contain different major and minor triads. Most experiments with undertones to date have focused largely upon improvisation and performance not compositional design (for example the recent use of negative harmony in jazz, popularised by Jacob Collier and stemming from the research of Ernst Levy), although in 1985/8
Jonathan Parry
used what he called the Inverse Harmonic Series (identical to the Undertone Series) as one stage in his process of Harmonic Translation.

Harry Partch Harry Partch (June 24, 1901 – September 3, 1974) was an American composer, music theorist, and creator of unique musical instruments. He composed using scales of unequal intervals in just intonation, and was one of the first 20th-century com ...

argued that the overtone series and the undertone series are equally fundamental, and his concepts of Otonality and Utonality is based on this idea. Similarly, in 2006 G.H. Jackson suggested that the overtone and undertone series must be seen as a real polarity, representing on the one hand the outer "material world" and on the other, our subjective "inner world". This view is largely based on the fact that the overtone series has been accepted because it can be explained by materialistic science, while the prevailing conviction about the undertone series is that it can only be achieved by taking subjective experience seriously. For instance, the minor triad is usually heard as sad, or at least pensive, because humans habitually hear all chords as based from below. If feelings are instead based on the high "fundamental" of an undertone series, then descending into a minor triad is not felt as melancholy, but rather as overcoming, conquering something. The overtones, by contrast, are then felt as penetrating from outside. Using

Rudolf Steiner Rudolf Joseph Lorenz Steiner (; 27 or 25 February 1861 – 30 March 1925) was an Austrian occultist, social reformer, architect, esotericist, and claimed clairvoyant. Steiner gained initial recognition at the end of the nineteenth century ...

's work, Jackson traces the history of these two series, as well as the main other system created by the

circle of fifths In music theory, the circle of fifths (sometimes also cycle of fifths) is a way of organizing pitches as a sequence of perfect fifths. Starting on a C, and using the standard system of tuning for Western music (12-tone equal temperament), the se ...

, and argues that in hidden form, the series are balanced out in

Bach Johann Sebastian Bach (German: �joːhan zeˈbasti̯an baχ ( – 28 July 1750) was a German composer and musician of the late Baroque period. He is known for his prolific output across a variety of instruments and forms, including the or ...

's harmony.

References

External links

* , with audio clips {{Authority control Acoustics Musical tuning