Do Music and Language Obey the Same Rules?

Emre Sevinc writes "Ever felt as though a piece of music is speaking to you? You could be right: musical notes are strung together in the same patterns as words in a piece of literature, according to an Argentinian physicist. This article in Nature states that Damián H. Zanette's analysis also reveals a key difference between tonal compositions, which are written in a particular key, and atonal ones, which are not. This sheds light on why many people find it so hard to make sense of atonal works. In both written text and speech, the frequency with which different words are used follows a striking pattern. In the 1930s, American social scientist George Kingsley Zipf discovered that if he ranked words in literary texts according to the number of times they appeared, a word's rank was roughly proportional to the inverse of the its frequency squared. Herbert Simon later offered an explanation for this mathematical relationship. He argued that as a text progresses, it creates a meaningful context within which words that have been used already are more likely to appear than other, random words. For example, it is more likely that the rest of this article will contain the word 'music' than the word 'sausage'. Physicist Damian Zanette of the Balseiro Institute in Bariloche, Argentina, used this idea to test whether different types of music create a semantic context in a similar fashion."

AP Music Theory finals applies to someting...

[supersandra]

Total agreement that musicians already know that music is indeed a language.

When we were learning about cadences in music theory, my teacher likened them to punctuation. Half cadences are like commas, often predictably placed and leaving the need for resolution of an idea. Deceptive cadences are often like semicolons; you think the idea is going to end and then it catches you off-guard and keeps going (unless the piece/movement is simply ending in minor after being in major, but hush, you.) Plagal and authentic cadences are like periods because they give a feeling of resolution to the music ending on the tonic (I) chord. And finally, perfect authentic cadences are like exclamation points because they have extra power behind their resolution.

Of course, the fact that phrases have a rythmic rise and fall is quite accurate. That music can tell a story... very true. Where do you think musical pieces like Romeo and Juliet or the Legend of Alcobaca come from?

music as a language

[miles+zarathustra]

Learning music at the age when the mind is open to acquiring language skills seems to make a difference. The same part of the brain processes both. I read once that people who learn music at an early age tend to have more connections between the right/left brain.

In my opinion, music has taught me way more about programming than the other way around. (and music is more difficult to do effectively -- it's all real-time -- even though the pay is much better for programming)

As a piano player for 37 years now, I always get a kick out of when I can play stuff that's just notes, and it makes people laugh. It's all about expectation and fulfillment.

Partly, my ability to do so springs from my experience playing musical underscore for melodrama shows (e.g. the Gaslighter theatre in Campbell back in the '80's), which is a lot of fun -- translating dramatic dialog into musical themes.

The funny thing is how artificial the harmonic language we think of as natural is. The urge our ears feel to resolve along the cycle of 5ths evolved over centuries, and only seems natural because we grew up hearing music that spoke in it.

Nominally, it's based on the overtone series, but the actual scale we use is based on exponents of the twelfth root of two. A chromatic scale is defined mathematically as the frequencies:

F * 2^(1/12); F * 2^(2/12); F * 2^(3/12)...

Whereas the overtones are simply multiples :

F 2F 3F 4F ...

One is rational integers, the other irrational exponents.

And when you look at how neatly the key signatures and the cycle of 5ths fit together, it's quite amazing ... and the fact that it works emotionally is remarkable when you understand how entirely artificial it is.

I heard once (from my analytic geometry teacher) that Chopin objected to people's emotional reaction to some of his pieces. The semantic world that he lived in, of advanced harmonic modulation, didn't entirely connect with the emotional content he was conveying.

Re:Blah blah blah.

[Ohreally_factor]

Well, if we get back to Derrida and those other annoying french intellectuals. . .

They were moving past de Sausure's model of signifier/signified, claiming a Nietzchean absence of the signified. Instead of underlying meaning, we have the text as a thing itself, that might suggest a deeper meaning (which is illusory), but really only "contains" "meaning" in the inter-relationships of it's components, in the concatenations.

Further, from a semiotic point of view, music or anything else created or even observed by man is a language of sorts.

Anyway, if I think about this crap any further, my little brain will have a big hurt.

Fractal Math

[serutan]

I'm surprised there is no mention of fractal mathematics in all this. Back in the 80s there was a big article in Scientific American trying to explain why music sounds good. Music doesn't sound like anything in nature. Individual notes might, but melodies don't. So what does it sound like? Popular music, whether classical, jazz, rock or whatever, tends to have a fractal mathematical property. It's in the middle between brown noise, in which each sound is highly dependent on the preceding sound, and white noise, in which there is no relationship. This pattern seems to mimic something about the way we perceive changes in the world around us. If you take two radar scans of an organic landscape -- trees waving, people walking around -- and subtract one from the other, the difference is fractal. If you measure nerve activity with electrical probes you will get white noise on the peripheral nerves, but the closer you get to the central nervous system the more fractal the signal becomes, as if our nervous systems filter out random noise and let the fractal component of our perceptions pass through. Patterns in music might mimic the patterns used by our brains store memories and emotions. This would explain why a piece of music can make you feel a certain way.

Re:Smallest unit of musical meaning

[Muttley]

From the article at arXiv.org the author states [included below] some reasoning for choosing single notes, or at least shows he thought about it. After the passage quoted below he goes on to mention that from a statistical point of view it makes more sense to use notes, seeing as each composition will have thousands of notes. I would argue that these compositions would probably not have all 156 (13x12, within one octave) intervals possible in them at least once.

I agree completely however, saying a piece has 572 As in it says nothing about the music. But it might say something about the statistical correlation between note frequency and tonal vs atonal composition.

An obvious difficulty in modelling the creation of musical context along the lines discussed in Section 2 for language, which are based on the statistics of word usage, resides in the fact that the notion of word cannot be unambiguously extended to music (Boroda and Polikarkov, 1988). In language, words -or short combinations of words- stand for the units of semantic contents, with (almost) unequivocal correspondence with objects and concepts. Moreover, in the symbolic representation of language as a chain of characters, i.e. as a written text, words are separated by blank spaces and punctuation marks, which facilitates their identification -in particular, by automatic means. Music, on the other hand, does not possess any conventionally defined units of meaning. The notion of word is however conceivable in music by comparison with the linguistic role of words as "units of context," namely, as the perceptual elements whose collective function yields coherence and comprehensibility to a message. In music, the role of "units of context" is played by the building blocks of the patterns which, at different time scales, make the musical message intelligible. Yet, the identification of such units in a specific work may constitute a controversial task.

In the quantitative investigation of context creation in music, I have chosen as "units of context" the building blocks of the smallest-scale patterns, namely, single notes. A note is here characterised by its pitch (i.e. its position on the clef-endowed staff) and type (i.e. its duration relative to the tempo mark), and its volume, timbre, and actual frequency and duration are disregarded. The contribution of notes to the creation of musical context, determining tonality and the basis for rhythm, is particularly transparent. In addition, the choice of single notes has several operational advantages. In the first place, the collection of notes available to all musical compositions -or, at least, to all those compositions that can be written on a staff using the standard note types- is the same. This collection of notes plays the role of the lexicon out of which the message is generated. Secondly, single notes are well-defined entities in any symbolic representation of music, either printed on a staff or in standardised digital formats, such as the Musical Instrument Digital Interface (MIDI). This makes possible their automatic identification, which, as described later, constitutes a crucial step in the analysis. Moreover, in order to extract any meaningful information from a statistical approach, it is necessary to work with relatively large corpora. The compositions used in the present investigation contain, typically, several thousand single notes. This figure remains well below the number of words in any literary corpus, which usually reaches a few hundred thousands (cf. figure 1), but is already suited for statistical manipulations.

Re:Smallest unit of musical meaning

There are 2 different meanings to the phrase "play a single note."

1. Play a certain pitch any number of times. If you play the same pitch 2 or more times then you are playing an interval : a unison. Playing the same pitch several times in a row has a meaning to it.

2. Play a certain pitch once and only once, and don't play any other pitches. In this case there is no interval and there really isn't any meaning. I think this is what the poster above meant when he said that a single note by itself has no meaning.

Not really new

[NemesisStar]

This sort of thing is not really new. Look up Doctrine of the Affections to see a similar idea that was popular in the 1600s. Personally, I believe the idea to be difficult to prove at best. The reason certain notes and chord progressions 'speak' to you has a mathematical foundation. Certain notes in tonal music have certain frequencies that overlap and produce a 'pleasant' sound. The reason atonal music does not sound good is purely based on mathematics! It would be difficult to say the same about spoken language as there is no mathematics involved at all. Of courses, back in the day, the Church prefered certain chord progressions based on this math, but justified it that certain "Perfect chords" were closer to god (thus perfect). This has had a huge impact on music and is still strongly in effect today.

Naive in various respects

[dirkmuon]

The article is packed with assumptions suggesting that Zanette is not familiar with contemporary music theory. He does not employ standard music terminology. His concept of what constitutes a "note" doesn't make sense in tonal music. He seems to use simple scores (ot MIDI implementations of scores) as input, thus ignoring, for example, the evolution of notation and notational conventions. (Dude, a sixteenth note and an eighth note in a Bach piece might actually have exactly the same duration in an informed performance. No notated version of "Black Dog" describes exactly what goes on, metrically, between Page and Bonham.) The comments on Schoenberg and nontonal music are embarrassing. Statistical analysis of music has been around for decades and has yielded some interesting results. Zanette's results, alas, are not interesting and can be reasonably explained without reference to another inane "music is like language" assertion.

Re:Hmm

[flyneye]

nice.
This is all old news though.Herman Helmholtz noted that musical scales and their intervals tend to mimic the mother languages rises and falls in pitch and make them available to the musician for phrasing.
A good example of this would be Indian Raga and its 23 note octaves with rules on bending and sliding notes.