Benoit Mandelbrot
Benoit Légion d'honneur (Chevalier 1990 · Officier 2006) 2003 Japan Prize 1993 Wolf Prize 1989 Harvey Prize 1986 Franklin Medal 1985 Barnard Medal | |
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Scientific career | |
Fields | |
Institutions | |
Doctoral advisor | Paul Lévy |
Doctoral students |
Benoit B.
In 1936, at the age of 11, Mandelbrot and his family emigrated from Warsaw, Poland, to France. After World War II ended, Mandelbrot studied mathematics, graduating from universities in Paris and in the United States and receiving a master's degree in aeronautics from the California Institute of Technology. He spent most of his career in both the United States and France, having dual French and American citizenship. In 1958, he began a 35-year career at IBM, where he became an IBM Fellow, and periodically took leaves of absence to teach at Harvard University. At Harvard, following the publication of his study of U.S. commodity markets in relation to cotton futures, he taught economics and applied sciences.
Because of his access to IBM's computers, Mandelbrot was one of the first to use computer graphics to create and display fractal geometric images, leading to his discovery of the
Toward the end of his career, he was Sterling Professor of Mathematical Sciences at Yale University, where he was the oldest professor in Yale's history to receive tenure.[13] Mandelbrot also held positions at the
Early years
External videos | |
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Family background and early education, (4:11) Benoit Mandelbrot interview, Part 1 of 144, Web of Stories[14] |
Benedykt Mandelbrot
Mandelbrot attended the Lycée Rollin (now the Collège-lycée Jacques-Decour) in Paris until the start of World War II, when his family moved to Tulle, France. He was helped by Rabbi David Feuerwerker, the Rabbi of Brive-la-Gaillarde, to continue his studies.[9]: 62–63 [19] Much of France was occupied by the Nazis at the time, and Mandelbrot recalls this period:
Our constant fear was that a sufficiently determined foe might report us to an authority and we would be sent to our deaths. This happened to a close friend from Paris, Zina Morhange, a physician in a nearby county seat. Simply to eliminate the competition, another physician denounced her ... We escaped this fate. Who knows why?[9]: 49
In 1944, Mandelbrot returned to Paris, studied at the
Research career
From 1949 to 1958, Mandelbrot was a staff member at the
From 1951 onward, Mandelbrot worked on problems and published papers not only in mathematics but in applied fields such as information theory, economics, and fluid dynamics.
Randomness and fractals in financial markets
Mandelbrot saw
Developing "fractal geometry" and the Mandelbrot set
As a visiting professor at Harvard University, Mandelbrot began to study mathematical objects called Julia sets that were invariant under certain transformations of the complex plane. Building on previous work by Gaston Julia and Pierre Fatou, Mandelbrot used a computer to plot images of the Julia sets. While investigating the topology of these Julia sets, he studied the Mandelbrot set which was introduced by him in 1979.
In 1975, Mandelbrot coined the term fractal to describe these structures and first published his ideas in the French book Les Objets Fractals: Forme, Hasard et Dimension, later translated in 1977 as Fractals: Form, Chance and Dimension.[29] According to computer scientist and physicist Stephen Wolfram, the book was a "breakthrough" for Mandelbrot, who until then would typically "apply fairly straightforward mathematics ... to areas that had barely seen the light of serious mathematics before".[11] Wolfram adds that as a result of this new research, he was no longer a "wandering scientist", and later called him "the father of fractals":
Mandelbrot ended up doing a great piece of science and identifying a much stronger and more fundamental idea—put simply, that there are some geometric shapes, which he called "fractals", that are equally "rough" at all scales. No matter how close you look, they never get simpler, much as the section of a rocky coastline you can see at your feet looks just as jagged as the stretch you can see from space.[11]
Wolfram briefly describes fractals as a form of geometric repetition, "in which smaller and smaller copies of a pattern are successively nested inside each other, so that the same intricate shapes appear no matter how much you zoom in to the whole. Fern leaves and Romanesque broccoli are two examples from nature."[11] He points out an unexpected conclusion:
One might have thought that such a simple and fundamental form of regularity would have been studied for hundreds, if not thousands, of years. But it was not. In fact, it rose to prominence only over the past 30 or so years—almost entirely through the efforts of one man, the mathematician Benoit Mandelbrot.[11]
Mandelbrot used the term "fractal" as it derived from the Latin word "fractus", defined as broken or shattered glass. Using the newly developed IBM computers at his disposal, Mandelbrot was able to create fractal images using graphics computer code, images that an interviewer described as looking like "the delirious exuberance of the 1960s psychedelic art with forms hauntingly reminiscent of nature and the human body". He also saw himself as a "would-be Kepler", after the 17th-century scientist Johannes Kepler, who calculated and described the orbits of the planets.[30]
Mandelbrot, however, never felt he was inventing a new idea. He described his feelings in a documentary with science writer Arthur C. Clarke:
Exploring this set I certainly never had the feeling of invention. I never had the feeling that my imagination was rich enough to invent all those extraordinary things on discovering them. They were there, even though nobody had seen them before. It's marvelous, a very simple formula explains all these very complicated things. So the goal of science is starting with a mess, and explaining it with a simple formula, a kind of dream of science.[31]
According to Clarke, "the Mandelbrot set is indeed one of the most astonishing discoveries in the entire history of mathematics. Who could have dreamed that such an incredibly simple equation could have generated images of literally infinite complexity?" Clarke also notes an "odd coincidence":
the name Mandelbrot, and the word "mandala"—for a religious symbol—which I'm sure is a pure coincidence, but indeed the Mandelbrot set does seem to contain an enormous number of mandalas.[31]
In 1982, Mandelbrot expanded and updated his ideas in
Mandelbrot left IBM in 1987, after 35 years and 12 days, when IBM decided to end pure research in his division.
Fractals and the "theory of roughness"
Mandelbrot created the first-ever "theory of roughness", and he saw "roughness" in the shapes of mountains,
Can geometry deliver what the Greek root of its name [geo-] seemed to promise—truthful measurement, not only of cultivated fields along the Nile River but also of untamed Earth?[9]: xii
In his paper "
Mandelbrot emphasized the use of fractals as realistic and useful models for describing many "rough" phenomena in the real world. He concluded that "real roughness is often fractal and can be measured."[9]: 296 Although Mandelbrot coined the term "fractal", some of the mathematical objects he presented in The Fractal Geometry of Nature had been previously described by other mathematicians. Before Mandelbrot, however, they were regarded as isolated curiosities with unnatural and non-intuitive properties. Mandelbrot brought these objects together for the first time and turned them into essential tools for the long-stalled effort to extend the scope of science to explaining non-smooth, "rough" objects in the real world. His methods of research were both old and new:
The form of geometry I increasingly favored is the oldest, most concrete, and most inclusive, specifically empowered by the eye and helped by the hand and, today, also by the computer ... bringing an element of unity to the worlds of knowing and feeling ... and, unwittingly, as a bonus, for the purpose of creating beauty.[9]: 292
Fractals are also found in human pursuits, such as music, painting, architecture, and stock market prices. Mandelbrot believed that fractals, far from being unnatural, were in many ways more intuitive and natural than the artificially smooth objects of traditional Euclidean geometry:
Clouds are not spheres, mountains are not cones, coastlines are not circles, and bark is not smooth, nor does lightning travel in a straight line.
—Mandelbrot, in his introduction to The Fractal Geometry of Nature
Mandelbrot has been called an artist, and a visionary[37] and a maverick.[38] His informal and passionate style of writing and his emphasis on visual and geometric intuition (supported by the inclusion of numerous illustrations) made The Fractal Geometry of Nature accessible to non-specialists. The book sparked widespread popular interest in fractals and contributed to chaos theory and other fields of science and mathematics.
Mandelbrot also put his ideas to work in cosmology. He offered in 1974 a new explanation of
Awards and honors
Mandelbrot's awards include the
The small asteroid
A partial list of awards received by Mandelbrot:[44]
- 2004 Best Business Book of the Year Award
- AMS Einstein Lectureship
- Barnard Medal
- Caltech Service
- Casimir Funk Natural Sciences Award
- Charles Proteus Steinmetz Medal
- High School Spelling Bee (1940)
- Fellow, American Geophysical Union
- Fellow of the American Statistical Association[45]
- Fellow of the American Physical Society (1987) [46]
- Franklin Medal
- Harvey Prize (1989)
- Honda Prize
- Humboldtpreis
- IBM Fellowship
- Japan Prize (2003)
- John Scott Award
- Légion d'honneur (Legion of Honour)
- Lewis Fry Richardson Medal
- Medaglia della Presidenza della Repubblica Italiana
- Médaille de Vermeil de la Ville de Paris
- Nevada Prize
- Member of the Norwegian Academy of Science and Letters.[47]
- Member of the American Philosophical Society (2004) [48]
- Science for Art
- Sven Berggren-Priset
- Wacław Sierpiński medal of the Polish Mathematical Society (2005) [49]
- Władysław Orlicz Prize
- Wolf Foundation Prizefor Physics (1993)
Death and legacy
Mandelbrot died from pancreatic cancer at the age of 85 in a hospice in Cambridge, Massachusetts, on 14 October 2010.[1][50] Reacting to news of his death, mathematician Heinz-Otto Peitgen said: "[I]f we talk about impact inside mathematics, and applications in the sciences, he is one of the most important figures of the last fifty years."[1]
Chris Anderson, TED conference curator, described Mandelbrot as "an icon who changed how we see the world".[51] Nicolas Sarkozy, President of France at the time of Mandelbrot's death, said Mandelbrot had "a powerful, original mind that never shied away from innovating and shattering preconceived notions [... h]is work, developed entirely outside mainstream research, led to modern information theory."[52] Mandelbrot's obituary in The Economist points out his fame as "celebrity beyond the academy" and lauds him as the "father of fractal geometry".[53]
Best-selling essayist-author Nassim Nicholas Taleb has remarked that Mandelbrot's book The (Mis)Behavior of Markets is in his opinion "The deepest and most realistic finance book ever published".[10]
Bibliography
In English
- Fractals: Form, Chance and Dimension, 1977, 2020
- The Fractal Geometry of Nature, 1982
- Mandelbrot, Benoît B. (1983). ISBN 978-0-7167-1186-5.
- Mandelbrot, B. (1959) Variables et processus stochastiques de Pareto-Levy, et la repartition des revenus. Comptes rendus de l'Académie des Sciences de Paris, 249, 613–615.
- Mandelbrot, B. (1960) The Pareto-Levy law and the distribution of income. International Economic Review, 1, 79–106.
- Mandelbrot, B. (1961) Stable Paretian random functions and the multiplicative variation of income. Econometrica, 29, 517–543.
- Mandelbrot, B. (1964) Random walks, fire damage amount and other Paretian risk phenomena. Operations Research, 12, 582–585.
- Fractals and Scaling in Finance: Discontinuity, Concentration, Risk. Selecta Volume E, 1997 by Benoit B. Mandelbrot and R.E. Gomory
- Mandelbrot, Benoit B. (1997) Fractals and Scaling in Finance: Discontinuity, Concentration, Risk, Springer.
- Fractales, hasard et finance, 1959–1997, 1 November 1998
- Multifractals and 1/ƒ Noise: Wild Self-Affinity in Physics (1963–1976) (Selecta; V.N) 18 January 1999 by J.M. Berger and Benoit B. Mandelbrot
- Mandelbrot, Benoît (February 1999). "A Multifractal Walk down Wall Street". .
- Gaussian Self-Affinity and Fractals: Globality, The Earth, 1/f Noise, and R/S (Selected Works of Benoit B. Mandelbrot) 14 December 2001 by Benoit Mandelbrot and F.J. Damerau
- Mandelbrot, Benoit B., Gaussian Self-Affinity and Fractals, Springer: 2002.
- Fractals and Chaos: The Mandelbrot Set and Beyond, 9 January 2004
- The Misbehavior of Markets: A Fractal View of Financial Turbulence, 2006 by Benoit Mandelbrot and Richard L. Hudson
- Mandelbrot, Benoit B. (2010). The Fractalist, Memoir of a Scientific Maverick. New York: Vintage Books, Division of Random House. ISBN 978-0-307-38991-6
- The Fractalist: Memoir of a Scientific Maverick, 2014
- Hudson, Richard L.; Mandelbrot, Benoît B. (2004). The (Mis)Behavior of Markets: A Fractal View of Risk, Ruin, and Reward. New York: Basic Books. ISBN 978-0-465-04355-2.
- ISBN 978-0-7365-0520-8)
- Mandelbrot, Benoît; Taleb, Nassim (23 March 2006). "A focus on the exceptions that prove the rule". Financial Times. Archived from the original on 23 October 2010. Retrieved 17 October 2010.
- "Hunting the Hidden Dimension: mysteriously beautiful fractals are shaking up the world of mathematics and deepening our understanding of nature", NOVA, WGBH Educational Foundation, Boston for PBS, first aired 28 October 2008.
See also
- 1/f noise – Signal with equal energy per octave
- Fractal dimension – Ratio providing a statistical index of complexity variation with scale
- Fractional Brownian motion – Probability theory concept
- How Long is the Coast of Britain?– Counterintuitive observation that the coastline of a landmass does not have a well-defined length
- Hurst exponent – A measure of the long-range dependence of a time series
- Kurtosis risk – Term in decision theory
- Lacunarity – Term in geometry and fractal analysis
- List of Poles
- Louis Bachelier – French pioneer in mathematical economics (1870-1946)
- Mandelbrot Competition – High school mathematics competition
- Multifractal system – System with multiple fractal dimensions
- Self-similarity – Whole of an object being mathematically similar to part of itself
- Seven states of randomness – Extensions of the concept of randomness
- Skewness risk – Financial modeling term
- Zipf–Mandelbrot law – Discrete probability distribution
Notes
- ^
- ^ Pronounced /ˈmændəlbrɒt/ MAN-dəl-brot or /ˈmændəlbroʊt/ MAN-dəl-broht in English.[3][4] When speaking in French, Mandelbrot pronounced his name [bənwa mɑ̃dɛlbʁot].[5]
References
- ^ a b c Hoffman, Jascha (16 October 2010). "Benoît Mandelbrot, Mathematician, Dies at 85". The New York Times. Archived from the original on 18 October 2010. Retrieved 16 October 2010.
- ^ a b Lesmoir-Gordon, Nigel (17 October 2010). "Benoît Mandelbrot obituary". The Guardian. London. Archived from the original on 17 September 2013. Retrieved 17 October 2010.
- ^ "Mandelbrot". Oxford English Dictionary (Online ed.). Oxford University Press. (Subscription or participating institution membership required.)
- ISBN 978-1-4058-8118-0.
- ^ Recording of the ceremony on 11 September 2006 at which Mandelbrot received the insignia for an Officer of the Légion d'honneur.
- ^ "Remembering the Father of Fractals". 22 October 2010. Archived from the original on 8 January 2018. Retrieved 8 January 2018.
- ^ Mandelbrot, Benoit (February 2010), "Fractals and the art of roughness", TED.com, archived from the original on 14 April 2016
- ^ Hudson & Mandelbrot, Prelude, page xviii
- ^ ISBN 978-0-307-38991-6.
- ^ S2CID 4393964.
- ^ a b c d e Wolfram, Stephen (22 November 2012). "The Father of Fractals". The Wall Street Journal. Archived from the original on 25 August 2017.
- ^ list includes specific sciences mentioned in Hudson & Mandelbrot, the Prelude, p. xvi, and p. 26
- ^
Olson, Steve (November–December 2004). "The Genius of the Unpredictable". Yale Alumni Magazine. Archivedfrom the original on 22 October 2014. Retrieved 22 July 2014.
- ^ Mandelbrot, Benoît; Bernard Sapoval; Daniel Zajdenweber (May 1998). "Web of Stories – Benoît Mandelbrot – Family background and early education". Web of Stories. Archived from the original on 11 September 2011. Retrieved 19 October 2010.
- ^ Gołąb-Meyer, Zofia (Spring 2011). "Benoit Mandelbrot (1924–2010) – ojciec geometrii fraktalnej". Foton. 112. Instytut Fizyki Uniwersytetu Jagiellońskiego: 50. Retrieved 25 December 2021.
- from the original on 21 January 2017. Retrieved 20 November 2020.
- ^ a b c Mandelbrot, Benoît (2002). "The Wolf Prizes for Physics, A Maverick's Apprenticeship" (PDF). Imperial College Press. Archived (PDF) from the original on 3 December 2013. Retrieved 23 April 2012.
- ^ "'Fractal' mathematician Benoît Mandelbrot dies aged 85". BBC Online. 17 October 2010. Archived from the original on 18 October 2010. Retrieved 17 October 2010.
- ISBN 0-415-34495-6.
- ^ a b Mandelbrot, B. B. (1984). "Mathematical People, Interview of B. B. Mandelbrot" (PDF). Interviewed by Anthony Barcellos. Birkhaüser. Archived (PDF) from the original on 27 April 2015. Retrieved 25 June 2013.
- ISBN 9780470057568.
- ^ "New Scientist, 19 April 1997". Newscientist.com. 19 April 1997. Archived from the original on 21 April 2010. Retrieved 17 October 2010.
- ^ Davidson, Clive (15 December 1997). "Wildly Random Market Moves". Journal of Commerce. Archived from the original on 11 July 2021 – via JOC.com.
- ^ Muldoon, Oliver (14 October 2019). "The Wandering Scientist Turned Father of Fractals". Medium.com. Retrieved 19 March 2021.
- – via Elsevier Science Direct.
- CiteSeerX 10.1.1.197.2969.
- ISBN 978-1-4757-2763-0.
- ISBN 9781861977656.
- ISBN 0-7167-0473-0
- The Jewish Daily Forward. Archived from the originalon 2 June 2013.
- ^ a b Arthur C Clarke – Fractals – The Colors Of Infinity, archived from the original on 31 May 2017 – via YouTube
- ISBN 0-7167-1186-9. Archived from the originalon 30 November 2015.
- ^ Mandelbrot, Benoît; Bernard Sapoval; Daniel Zajdenweber (May 1998). "Benoît Mandelbrot • IBM: background and policies". Web of Stories. Archived from the original on 8 September 2011. Retrieved 17 October 2010.
- ^ Tenner, Edward (16 October 2010). "Benoît Mandelbrot the Maverick, 1924–2010". The Atlantic. Archived from the original on 18 October 2010. Retrieved 16 October 2010.
- ^ "Benoît Mandelbrot, Novel Mathematician, Dies at 85". The New York Times. 17 October 2010. Archived from the original on 31 December 2018.
Dr. Mandelbrot traced his work on fractals to a question he first encountered as a young researcher: how long is the coast of Britain?"
- from the original on 13 July 2015. Retrieved 11 January 2016.
- ^ Devaney, Robert L. (2004). "Mandelbrot's Vision for Mathematics" (PDF). Proceedings of Symposia in Pure Mathematics. 72 (1). American Mathematical Society. Archived from the original (PDF) on 9 December 2006. Retrieved 5 January 2007.
- ^ Jersey, Bill (24 April 2005). "A Radical Mind". Hunting the Hidden Dimension, NOVA. PBS. Archived from the original on 22 August 2009. Retrieved 20 August 2009.
- ^ Gefter, Amanda (25 June 2008). "Galaxy Map Hints at Fractal Universe". New Scientist.
- ^ Laureates of the Japan Prize Archived 17 April 2016 at the Wayback Machine. japanprize.jp
- ^ "Mandelbrot joins Pacific Northwest National Laboratory". pnl.gov (Press release). Pacific Northwest National Laboratory. 16 February 2006. Archived from the original on 12 January 2009. Retrieved 17 October 2010.
- ^ "Légion d'honneur announcement of promotion of Mandelbrot to officier" (in French). Legifrance.gouv.fr. Archived from the original on 20 November 2020. Retrieved 17 October 2010.
- ^ "Six granted honorary degrees, Society of Scholars inductees recognized". gazette.jhu.edu. Johns Hopkins University. 7 June 2010. Archived from the original on 17 June 2010. Retrieved 17 October 2010.
- ^ Mandelbrot, Benoit B. (2 February 2006). "Vita and Awards". Archived from the original (Word document) on 2 July 2007. Retrieved 15 December 2013.
- ^ "View/Search Fellows of the ASA". amstat.org. Archived from the original on 16 June 2016. Retrieved 20 August 2016.
- ^ "APS Fellow Archive". APS. Archived from the original on 20 November 2020. Retrieved 24 September 2020.
- ^ "Gruppe 1: Matematiske fag" (in Norwegian). Norwegian Academy of Science and Letters. Archived from the original on 10 November 2013. Retrieved 7 October 2010.
- ^ "American Philosophical Society Member History". Retrieved 14 June 2021.
- ^ "Medal i Wykład im. Wacława Sierpińskiego | Polskie Towarzystwo Matematyczne". Retrieved 21 January 2023.
- ^ "Benoît Mandelbrot, fractals pioneer, dies". United Press International. 16 October 2010. Archived from the original on 22 October 2012. Retrieved 17 October 2010.
- ^ "Mandelbrot, father of fractal geometry, dies". The Gazette. Archived from the original on 19 October 2010. Retrieved 16 October 2010.
- ^ "Sarkozy rend hommage à Mandelbrot" [Sarkozy pays homage to Mandelbrot]. Le Figaro (in French). Archived from the original on 28 July 2013. Retrieved 17 October 2010.
- ^ Benoît Mandelbrot's obituary Archived 24 October 2010 at the Wayback Machine. The Economist (21 October 2010)
Sources
- Frame, Michael; Cohen, Nathan (2015). Benoit Mandelbrot: A Life in Many Dimensions. Singapore: World Scientific Publishing Company. ISBN 978-981-4366-06-9.
External links
- Benoit Mandelbrot at the Mathematics Genealogy Project
- Mandelbrot's page at Yale
- "Benoît Mandelbrot: Fractals and the art of roughness" Archived 17 February 2014 at the Wayback Machine (TED address).
- Fractals in Science, Engineering and Finance (lecture).
- FT.com interview on the subject of the financial markets which includes his critique of the "efficient market" hypothesis.
- Taylor, Richard (2011). "Obituaries: Benoit Mandelbrot". .
- Mandelbrot relates his life story (Web of Stories).
- Interview (1 January 1981, Ithaca, NY) held by the Eugene Dynkin Collection of Mathematics Interviews, Cornell University Library.
- Video animation of Mandelbrot set, zoom factor 10342.
- Video animation of Mandelbulb on YouTube, a three-dimensional Mandelbrot-set projection.
- Video fly-through an animated Mandelbulb world on YouTube
- Benoit Mandelbrot at IMDb
- Benoit Mandelbrot at TED
- Michael Frame, "Benoit B. Mandelbrot", Biographical Memoirs of the National Academy of Sciences (2014)