All phenomena, from the infinitely small to the infinitely big...the growth of plants, human body proportions, the structure of crystals, the orbit of the planets, light, music and more has a specific geometric structure. Everything in the Universe follows the same geometric pattern that fractals over and over creating endless possibilities of light, color, shape and sound.
The study, published in science journal Cognition, showed people even agreed on what made such abstract mathematical arguments beautiful. The findings may have implications for teaching schoolchildren, who may not be entirely convinced that there is beauty in mathematics.
The similarities between mathematics and music have long been noted but the study co-authors, Yale mathematician Stefan Steinerberger and University of Bath psychologist Dr. Samuel G.B.Johnson, wanted to add art to the mix to see if there was something universal at play in the people judge aesthetics and beauty -- be they in art, music or abstract mathematics.
The research was sparked when Steinerberger, while teaching his students, likened a mathematical proof to a 'really good Schubert sonata' -- but couldn't put his finger on why. He approached Johnson, assistant professor of marketing at the University of Bath School of Management, who was completing his Ph.D. in psychology at Yale.
Johnson designed an experiment to test his question of whether people share the same aesthetic sensibilities about maths that they do about art or music -- and if this would hold true for an average person, not just a career mathematician.
For the study, they chose four mathematical proof, four landscape paintings, and four classical piano pieces. None of the participants was a mathematician.
The mathematical proofs used were: the sum of an infinite geometric series, Gauss's summation trick for positive integers, the Pigeonhole principle, and a geometric proof of a Faulhaber formula. A mathematical proof is an argument which convinces people something is true.
The piano pieces were Schubert's Moment Musical No. 4, D 780 (Op. 94), Bach's Fugue from Toccata in E Minor (BWV 914), Beethoven's Diabelli Variations (Op. 120) and Shostakovich's Prelude in D-flat major (Op.87 No. 15).
The landscape paintings were Looking Down Yosemite Valley, California by Albert Bierstadt; A Storm in the Rocky Mountains, Mt. Rosalie by Albert Bierstadt; The Hay Wain by John Constable; and The Heart of the Andes by Frederic Edwin Church.
Dividing The Study Into Three Parts.
The first task required a sample of individuals to match the four maths proofs to the four landscape paintings based on how aesthetically similar they found them. The second task required a different group of people to compare the four maths proofs to the four piano sonatas.
Finally, the third asked another sample group to rate each of the four works of art and mathematical arguments for nine different criteria -- seriousness, universality, profundity, novelty, clarity, simplicity, elegance, intricacy, and sophistication.
Participants in the third group agreed with each other about how elegant, profound, clear, etc., each of the mathematical arguments and paintings was.
But Steinerberger and Johnson were most impressed that these ratings could be used to predict how similar participants in the first group believed that each argument and painting were to each other. This finding suggests that perceived correspondences between maths and art really have to do with their underlying beauty.
Overall, the results showed there was considerable consensus in comparing mathematical arguments to artworks. And there was some consensus in judging the similarity of classical piano music and mathematics.
"Laypeople not only had similar intuitions about the beauty of math as they did about the beauty of art but also had similar intuitions about beauty as each other. In other words, there was consensus about what makes something beautiful, regardless of modality," Johnson said.
However, it was not clear whether the results would be the same with different music.
"I'd like to see our study done again but with different pieces of music, different proofs, different artwork," said Steinerberger. "We demonstrated this phenomenon, but we don't know the limits of it. Where does it stop existing? Does it have to be classical music? Do the paintings have to be of the natural world, which is highly aesthetic?"
Both Steinerberger and Johnson believe the research may have implications for maths education, especially at the secondary-school level.
"There might be opportunities to make the more abstract, more formal aspects of mathematics more accessible and more exciting to students at that age," said Johnson, "And that might be useful in terms of encouraging more people to enter the field of mathematics."