Alan Turing
Srinivasa Ramanujan
Hilbert’s problems (1900)
Landau’s problems (1912)
Smale’s problems (1998)
Millennium Prize Problems (2000)
Articles and videos
- There’s more to mathematics than rigour and proofs by (May 6th, 2007) ► The three stages of mathematical education: pre-rigorous, rigorous, and post-rigorous.
- The Fields Medal should return to its roots — Forgotten records of mathematics’ best-known prize hold lessons for the future of the discipline, argues historian Michael Barany. by (January 12th, 2018) ► The history of the Fields medal and how its awarding criteria evolved.
- Médailles Fields 2018 : internationalisation et concentration by (August 1st, 2018) ► The four 2018 Fields Medals: , , , and .
- [JEU] Timeline mathématique by (February 12th, 2019) ► created Timeline cards on mathematics.
- Zéro - Histoires de maths #02🚫 by (June 27th, 2019) ► The history of zero, the positional notation, Peano…
- Les maths au secours de Dreyfus by and (November 17th, 2019) ► Some little information about the roles of Painlevé and Poincaré in the Dreyfus affair.
- Enquête de paternité by (February 2020) ► Finding out the history of the eigenvector-eigenvalue identity.
- The greatest mathematician that never lived - Pratik Aghor by (July 6th, 2020) ► A short presentation of the Bourbaki group.
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ICM
- Des Jeux olympiques pour les maths ? by (June 14th, 2022) ► The (non-)numbering of International Congress of Mathematicians.
- Une « Américaine » à Paris by (June 16th, 2022) ► and the ICM.
- Penser, classer... présenter des listes by (June 24th, 2022) ► Hilbert’s problems and some other lists of problems.
- Pour 3209 dollars de plus ! by (June 26th, 2022) ► The creation of the Fields Medal.
- Emmy... et les autres ! by (June 27th, 2022) ► The women present at ICM 1932.
- Quand les mathématiciens font des vagues by (June 29th, 2022) ► ’s politics at Moscow 1966 ICM and the wrong proof of ’s at 1904 ICM.
- Un congrès pour Bourbaki ? by (July 2nd, 2022) ► What is the relationship between Bourbaki and 1970 ICM?
- Une organisation à toute épreuve by (July 3rd, 2022) ► Some ICMs were delayed and how an ICM location is chosen.
- Femmes et maths : passer la seconde by (July 4th, 2022) ► The small recognition of women in mathematics.
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(300-~360)
- Pandrosion et la duplication du cube - Micmaths by (December 13th, 2024) ► created a recursive geometric method to calculate cube roots.
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(350/370-415)
- Mmm ! Ep.6 - HYPATIE (par Antoine Houlou-Garcia) by (February 17th, 2023) ► The life and legend of .
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(598-370)
- Mmm ! Ep.18 - BRAHMAGUPTA (par Yvan Monka) by (May 12th, 2023) ► Some information about .
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(735-804)
- 5050, bien avant Gauss - Histoires de Maths #03🚫 by (March 15th, 2020) ► Some information about .
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(1571-1630)
- Mmm ! Ep.19 - JOHANNES KEPLER (par J'm'énerve pas, j'explique) by (May 26th, 2023) ► The discoveries and the errors of .
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(1601/1608?-1665)
- Mmm ! Ep.13 - PIERRE DE FERMAT (par Arnaud Durand) by (April 8th, 2023) ► A short biography of .
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(1654-1705)
- Mmm ! Ep.14 - JACQUES BERNOULLI (par Maths en tête)↓ by (April 14th, 2023) ► There is little information about in this video.
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(1707-1783)
- Mmm ! Ep.2 - LEONHARD EULER (par El Jj) by (January 20th, 2023) ► A fast-paced list of contributions.
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(1776-1831)
- Je suis Sophie Germain, femme et mathématicienne🚫 (April 6th, 2021) ► The life of .
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(1811-1832)
- Mmm ! Ep.16 - EVARISTE GALOIS (par Very Math Trip) by (April 28th, 2023) ► A romanticised biography of .
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(1812-1882)
- The Mathematical Spammer (feat. Matt Parker) - Objectivity 254 by , , and (March 14th, 2022) ► Some letters sent by to the Royal Society.
- Can we calculate 100 digits of π by hand? The William Shanks method. by (March 14th, 2022) ► Trying to perform the same computation than (using ’s formula: £[\frac{\pi}{4} = 4 arctan(\frac{1}{5}) - arctan(\frac{1}{239})£]) and failing after 11 digits.
- The Reciprocals of Primes - Numberphile by (March 14th, 2022) ► computed the period of primes.
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(1815-1852)
- Mmm ! Ep.10 - ADA LOVELACE (par Automaths) by (March 17th, 2023) ► A short biography of .
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(1845-1918)
- CANTOR, L'HOMME QUI DÉFIA L'INFINI CMH#5 by (April 10th, 2020) ► The life of .
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(1850-1891)
- Mmm ! Ep.4 - SOFIA KOVALEVSKAYA (par Quadriviuum Tremens) by and (February 3rd, 2023) ► A biography of .
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(1854-1912)
- Poincaré, membre du Bureau des Longitudes, et la géodésie (1893-1912) by (July 9th, 2012) ► A description of what was the Bureau des Longitudes, the participation of Poincaré, and the measurement of Quito meridian.
- [Cédric Villani] La meilleure et la pire des erreurs de Poincaré by (September 11th, 2012) ► Some information on Poincaré and two errors he made: one that he corrected in the restricted three-body problem, his correction started the chaos theory, and his refuse of the Boltzmann’s law.
- Poincaré Conjecture - Numberphile by and (April 23rd, 2014) ► There is no real mathematical content here, just some trivia about ’s proof.
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(1858-1931)
- Charlotte Angas Scott by and (February 28th, 2022) ► An overview of ’s life.
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(1862-1943)
- Mmm ! Ep.1 - DAVID HILBERT (par Thomaths) by and (January 13th, 2023) ► A short presentation of ’s work.
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(1882-1935)
- Emmy Noether and The Fabric of Reality by (June 18th, 2010) ► A presentation of ’s life and theorem ("If a system has a continuous symmetry property, then there are corresponding quantities whose values are conserved in time.").
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’s theorems
- Le Théorème de Noether a un siècle by (June 3rd, 2018) ► A short description of ’s work.
- Les Symétries de l'univers by (February 6th, 2021) ► Some examples of applications of ’s theorem.
- The Hole In Relativity Einstein Didn’t Predict by and (April 14th, 2025) ► The story of ’s theorems.
- Bachir Bekka - Le merveilleux théorème d'Emmy Noether by (June 5th, 2025) ► The proof of ’s theorem, some good mathematical knowledge is required.
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(1887-1920)
- The letter that revealed Ramanujan's genius by (August 14th, 2020) ► The letter sent by Ramanujan to Hardy.
- Mmm ! Ep.3 - SRINIVASA RAMANUJAN (par Mathador) by (January 27th, 2023) ► Yet another short presentation of Ramanujan.
-
(1903-1930)
- The Man Who Thought Too Fast — Frank Ramsey—a philosopher, economist, and mathematician—was one of the greatest minds of the last century. Have we caught up with him yet? by (April 27th, 2020) ► A biography of with very little information about his work.
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(1903-1987)
- Mmm ! Ep.7 - ANDREI KOLMOGOROV (par Quang-Thai Ngo)⇊ by (February 24th, 2023) ► Computer generated voices and bank videos, this video is unbearable.
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(1912-1954)
- Mmm ! Ep.11 - ALAN TURING (par Pr. Culture Précieuse) by (March 24th, 2023) ► A biography of .
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(1915-1997)
- Mmm ! Ep.5 - KUNIHIKO KODAIRA (par Scientia Egregia) by (February 10th, 2023) ► A short presentation of the Enriques–Kodaira classification.
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(1917-2020)
- Indian Maths Genius Who Debunked Euler’s Theory, Made it to NYT Front Page Dies at 103 — Sharadchandra Shankar Shrikhande, who along with his mentor and an American colleague disproved in 1959 what had been an unsolved 177-year old mathematical conjecture, passes away at 103. by (May 8th, 2020) ► A biography of and the disproof of Euler’s conjecture.
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(1919-1985)
- How Julia Robinson helped define the limits of mathematical knowledge — Born 100 years ago, she was key in solving Hilbert’s 10th problem by (November 22nd, 2019) ► A biography of and her work on Diophantine equations.
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(1923-2025)
- Cécile Huneau - Yvonne Choquet-Bruhat, une pionnière des mathématiques de la Relativité Générale by (January 29th, 2025) ► A short biography of .
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(1923-2017)
- Mmm ! Ep.9 - MARJORIE RICE (par Micmaths) by (March 10th, 2023) ► The atypical life of .
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(1926-2055)
- Peter Lax's Interview by (February 18th, 2016) ► A long interview, mostly about the Manhattan Project.
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(1928-2015)
- Nash Embedding Theorem - Numberphile by (June 1st, 2015) ► A basic introduction to the theorem.
- The Extraordinary Theorems of John Nash - with Cédric Villani by (April 29th, 2016) ► The work of on algebraic geometry and partial differential equations.
- Mmm ! Ep.8 - JOHN NASH (par Julien Durand)↓ by (March 3rd, 2023) ► A short and rather uninteresting biography of .
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(1928-2014)
- alexandre Grothendieck -> une vie digne d'être vécue (⧉) by (January 27th, 1972) ► A speech of in front of the CERN researchers where he asks them to think about the purpose of their work.
- Alexander Grothendieck, sur les routes d'un génie. (⧉, ⧉) by (2013) ► A strange documentary on Grothendieck: the editing is awful, some interviews are valueless, the author is doing some dumpster diving… Nevertheless, there is some interesting information on Grothendieck.
- Agora des savoirs - Bertrand Toen Hommage à Alexandre Grothendieck by (December 19th, 2014) ► A biography of and a basic presentation of the topos.
- Souvenirs d'Alexander Grothendieck par Michel Demazure by (February 2nd, 2015) ► The title says it all.
- Montpellier : interview d'un fils du mathématicien de génie, Alexander Grothendieck by (May 15th, 2017) ► One of ’s sons speaks about his father.
- The Anarchist Abstractionist — Who was Alexander Grothendieck? by (April 2nd, 2020) ► A detailed biography of .
- "Ce livre a été une révélation qui a changé ma vie" by (February 5th, 2022) ► explains her feelings when she read ’s writings and how she met him.
- Grothendieck : la moisson by , , , and (February 17th, 2022) ► Some information about , "Récoltes et Semailles", and the topoi.
- RÉCOLTES ET SEMAILLES D’ALEXANDRE GROTHENDIECK by and (April 7th, 2022) ► Some extracts from "Récoltes Et Semailles".
- Mmm ! Ep.17 - ALEXANDRE GROTHENDIECK (par Jolies Maths) by (May 5th, 2023) ► A short biography of .
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Alexandre Grothendieck, légende rebelle des mathématiques
- Épisode 1/5 : Naissance d’un prodige — À 12 ans, détenu avec sa mère au camp d'internement de Rieucros en Lozère, Alexandre Grothendieck découvre la beauté du cercle et des polyèdres. Pour échapper au tumulte de la guerre, l'adolescent juif apatride se réfugie dans l’abstraction. by , , , , , and (August 5th, 2024) ► The infancy of and his integration in Bourbaki.
- Épisode 2/5 : Maître en son école — En 1955, Alexandre Grothendieck découvre les beautés de la géométrie algébrique. Après avoir obtenu l’un des postes les plus prestigieux dans le monde de la recherche, il s'entoure d'élèves brillants qui resteront à jamais marqués par celui qu’ils appellent “le maître”. by , , , , , , , , , and (August 6th, 2024) ► and his students at IHES.
- Épisode 3/5 : Rompre avec la science — Au sommet de sa gloire, Grothendieck s’éveille à la politique. La répression des dissidents en URSS et la guerre du Vietnam le mènent à s’engager et à se remettre radicalement en question. Il se tourne vers le mouvement écologique et développe une pensée sur les dérives des technosciences. by , , , , , and (August 7th, 2024) ► resigns from IHES, becomes an ecologist, and gives his speech to the CERN.
- Épisode 4/5 : L’aventure intérieure — Grothendieck est allé au bout de sa critique des sciences. S’il en parle comme d’une passion révolue et dangereuse, il finit par y retourner. Il découvre avec effroi les trahisons qui entourent son héritage mathématique. Le mathématicien est devenu un génie marginal et encombrant. by , , , , , , , , and (August 8th, 2024) ► is a professor at the University of Montpellier. He considers that his students have buried his work.
- Épisode 5/5 : La maison d’un vivant — Alexandre Grothendieck a tout quitté sans laisser d’adresse en 1991. Personne ne sait où il se trouve. Beaucoup le cherchent. On le dit alors fou, mystique, obsédé par la question du Mal sur terre. Le lieu qu’il a choisi pour son ermitage se trouve à Lasserre, un petit village d’Ariège. by , , , , , , , , and (August 9th, 2024) ► isolates himself in Ariège. Do the mathematicians using his work know and share his philosophy?
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(1929-2019)
- Sir Michael Atiyah obituary — One of the greatest British mathematicians since Isaac Newton by (January 15th, 2019) ► A description of ’s work.
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(1931)
- Roger Penrose On Why Consciousness Does Not Compute — The emperor of physics defends his controversial theory of mind. by (May 4th, 2017) ► About ’s theory that consciousness is based on quantum mechanics, but no details are given.
- #85 – Roger Penrose: Physics of Consciousness and the Infinite Universe↑ (⧉) by and (March 31st, 2020) ► A long interview: consciousness, quantum mechanics, microtubes, and the conformal cyclic cosmology.
- Why Did The Mathematician Cross The Road? - with Roger Penrose (⧉) by and (August 8th, 2020) ► An interview: childhood, studies, Royal Society, , Penrose tiling…
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(1932)
- INTERVIEW DE PIERRE CARTIER by , , and (May 20th, 2014) ► An interview where speaks about the subjects he studied during his career.
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(1935-2020)
- The Day I Met Ron Graham by (July 7th, 2020) ► explains how he was fascinated by Graham’s Number and describes his meeting with him.
- The Mathematical Showman - Ron Graham (1935-2020) (⧉) by , , , , and (July 14th, 2020) ► Some anecdotes about .
- (1936)
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(1937-2020)
- The Free Will Theorem (Lecture 1) - John Conway by (March 23rd, 2009) ► speaks about his free will theorem.
- John Conway - The Game of Life and Set Theory by (November 19th, 2009) ► A long presentation about many subjects: , cellular automata, surreal numbers, the free will theorem…
- Life, Death and the Monster (John Conway) - Numberphile by (May 9th, 2014) ► speaks about his career.
- The Brain of John Conway (and his Amazing Tongue) - Numberphile by (July 1st, 2015) ► More interview.
- John Conway: Duality groups, the 2 cosmograms and geometrical construction by (February 24th, 2016) ► Some facts about geometry and groups, with some anecdotes.
- John Conway - Chemical Pi - G4G12 April 2016 by (March 2016) ► suggests memorising Pi digits and the periodic table at the same time.
- The Legendary John Conway (1937-2020) (⧉) by , , , , , and (April 13th, 2020) ► Some interview extracts from and about .
- John Conway - Deux (deux ?) minutes pour...↑ by (June 11th, 2020) ► 10 subjects chosen in ’s huge work.
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(1939)
- The Number Collector - with Neil Sloane (⧉) by and (August 14th, 2019) ► This interview is mostly about OEIS.
- (1942)
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(1944-2019)
- Mitchell Feigenbaum (1944–2019), 4.66920160910299067185320382… by (July 23rd, 2019) ► A biography of by .
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(1947)
- A Proof in the Drawer - with David Eisenbud (⧉) by and (April 8th, 2019) ► speaks about his life, MSRI, his fellow mathematicians…
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(1948)
- This Man Is About to Blow Up Mathematics — Harvey Friedman is about to bring incompleteness and infinity out of quarantine. by (February 23rd, 2017) ► tries to motivate mathematicians to take care about Gödel’s incompleteness theorems.
- Adventures in Incompleteness, March 1, 2017 by (March 1st, 2017) ► Examples of theorems whose proofs unexpectedly require a more powerful axiomatic system that the one the theorems are expressed within.
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(1948)
- The Bridges to Fermat's Last Theorem - Numberphile by (March 11th, 2015) ► speaks about his theorem and ’ proof.
- Fermat’s Last Theorem - with Ken Ribet (⧉) by and (December 14th, 2018) ► speaks about himself and about Fermat’s Last Theorem resolution.
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(1952)
- Mathematician-M.D. introduces a new methodology suggesting a solution to one of the greatest open problems in the history of mathematics — A completely new approach suggests the validity of the 110-year-old Lindelöf hypothesis, opening up the possibilities of new discoveries in quantum computing, number theory and cybersecurity by (June 25th, 2018) ► Some little information about after his findings on the Lindelöf Hypothesis (the rate of growth of the Riemann zeta function on the critical line).
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(1957)
- Why Basic Research is Important - Numberphile by (May 14th, 2015) ► The title says it all.
- Quasiperfect Numbers with Eric Lander - Numberphile by (January 18th, 2021) ► describes how he got into mathematics and did some progress on quasiperfect numbers.
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(1959)
- The C-Word - talking Calculus with Steven Strogatz (⧉) by and (June 17th, 2019) ► speaks about calculus: its history and its current usage.
- ↪Newton Goes Prime Time (bonus footage with Steven Strogatz) - Numberphile by (June 17th, 2019) ► The continuation of the previous podcast: has access to some manuscripts of and .
- Steven Strogatz: In and out of love with math | 3b1b podcast #3↑ by and (August 8th, 2021) ► speaks about his studies and about teaching.
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(1963)
- Fame and Admiration - with Timothy Gowers (⧉) by and (October 22nd, 2019) ► speaks about his career.
-
(1965)
- A Chance at Immortality - with Marcus Du Sautoy (⧉) by and (July 26th, 2021) ► The biography of , his math interests, his books, and his theatre plays.
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(1966)
- GENERATION GROTHENDIECK by (July 17th, 2019) ► speaks about his admiration of and the work of .
-
(1968)
- Making Sense of Infinity - with Asaf Karagila (⧉) by and (August 28th, 2021) ► describes his unusual education journey and gives some little information about set theory.
-
(1968)
- Coffin Problems - with Edward Frenkel (⧉) by and (December 3rd, 2019) ► describes his problems being a Jew student in the Soviet Union.
- #370 – Edward Frenkel: Reality is a Paradox – Mathematics, Physics, Truth & Love (⧉) by and (April 10th, 2023) ► A very long interview about ’s usual subjects.
-
(1973)
- « Trois Théorèmes impossibles » par Cédric Villani | ENS-PSL by (January 27th, 2016) ► The strange theorems of Banach-Tarski, Nash-Kuiper and Scheffer.
- The Fields Medal (with Cédric Villani) - Numberphile by (May 23rd, 2016) ► speaks about his Fields medal.
- The Mathematician's Office - Numberphile by (August 25th, 2016) ► tells about his (cluttered) office.
- Mathematics: Beauty vs Utility - Numberphile by (January 19th, 2017) ► How adapts his speech to his interlocutors.
- Spider-Man (Cédric Villani) - Numberphile by (January 19th, 2017) ► will not say why he is wearing a spider on his lapel.
-
(1974)
- Mmm ! Ep.12 - ASUMAN OZDAGLAR (par Science4All) (March 31st, 2023) ► Some little information about the work of .
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(1975)
- In Noisy Equations, One Who Heard Music — Experts say Martin Hairer’s epic masterpiece in stochastic analysis “created a whole world.” by (August 12th, 2014) ► A biography of and some information about his work on stochastic partial differential equations.
- Playing Tetris with Martin Hairer (Fields Medal 2014) by and (December 2nd, 2020) ► A presentation of ’s work, there is little information but a few graphical simulations.
- Martin Hairer — De la rigueur, du perfectionnisme, et une médaille Fields : un parcours impressionnant by (June 23rd, 2021) ► speaks about his past work, his Fields medal, working alone or with others…
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(1975)
- 8. Laure Saint-Raymond (1/2) (⧉) by and (May 14th, 2023) ► describes her education, her career, and some ideas about education.
- ↪8. Laure Saint-Raymond (2/2) (⧉) by and (May 21st, 2023) ► The continuation of the previous podcast.
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(1975)
- Terence Tao, genius mathematician by (March 7th, 2015) ► I guess these are extracts from a longer interview.
- The World's Best Mathematician (*) - Numberphile by (March 14th, 2017) ► Another interview.
- ↪Terry Tao and 'Cheating Strategically' (extra footage) - Numberphile by (March 19th, 2017) ► The continuation of the previous video.
- What Makes for ‘Good’ Mathematics? — Terence Tao, who has been called the “Mozart of Mathematics,” wrote an essay in 2007 about the common ingredients in “good” mathematical research. In this episode, the Fields Medalist joins Steven Strogatz to revisit the topic. by and (February 1st, 2024) ► The fact that some domains mature and get simpler concepts, computer proofs, AI…
- The Potential for AI in Science and Mathematics - Terence Tao by (August 7th, 2024) ► AI and science and, in particular, mathematics. also speaks about propf assistant and team organisation.
- Terence Tao at IMO 2024: AI and Mathematics by (August 21st, 2024) ► The past and present of how computers can be used for mathematical proofs.
- #472 – Terence Tao: Hardest Problems in Mathematics, Physics & the Future of AI↑ (⧉) by and (June 14th, 2025) ► As usual with , this is an interesting interview. As usual with , this is a long interview.
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(1977)
- How Does Graph Theory Shape Our World? — Maria Chudnovsky reflects on her journey in graph theory, her groundbreaking solution to the long-standing perfect graph problem, and the unexpected ways this abstract field intersects with everyday life. by , , and (June 26th, 2025) ► describes her education and her work on the proof of the strong perfect graph theorem.
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(1977)
- A Number Theorist Who Connects Math to Other Creative Pursuits — Jordan Ellenberg enjoys studying — and writing about — the mathematics underlying everyday phenomena. by and (May 27th, 2021) ► An interview of .
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(1983)
- A Path Less Taken to the Peak of the Math World — June Huh thought he had no talent for math until a chance meeting with a legendary mind. A decade later, his unorthodox approach to mathematical thinking has led to major breakthroughs. by (June 27th, 2017) ► The story of who proved Read’s conjecture and Heron-Rota-Welsh conjecture.
- g-conjecture - Numberphile by (May 21st, 2018) ► A simple presentation of the conjecture.
- ↪g-conjecture (extra footage) - Numberphile by (May 25th, 2018) ► The continuation of the previous video.
- He Dropped Out to Become a Poet. Now He’s Won a Fields Medal. — June Huh wasn’t interested in mathematics until a chance encounter during his sixth year of college. Now his profound insights connecting combinatorics and geometry have led to math’s highest honor. by (July 5th, 2022) ► A biography of .
-
(1980)
- Alex Kontorovich: Improving math | 3b1b podcast #1 by and (July 16th, 2021) ► A long discussion about ’s life, work, computer proofs…
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(1984)
- INTERVIEW D'OLIVIA CARAMELLO by , , and (July 15th, 2014) ► speaks about her postdoc work on topos.
- COMMENT CONSTRUIRE DES PONTS EN MATHÉMATIQUES ? by (June 30th, 2022) ► Some ideas about "bridges", but the (simple) examples are not mathematical, so they are of limited interest.
-
(1984)
- Mmm ! Ep.15 - MARYNA VIAZOVSKA (par Claire Lommé) by (April 21st, 2023) ► A presentation of ’s results on the sphere-packing problem.
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(1985)
- Ancienne version - Interview with Hugo Duminil-Copin - EN by (July 5th, 2022) ► describes his education and his work.
- 1. Hugo Duminil Copin (1/2) by and (September 24th, 2023) ► A long interview of : his education, his PhD, his research…
- ↪S02E02. Hugo Duminil Copin (2/2) by and (September 24th, 2023) ► The second part of the interview.
- L'interview d'Hugo Duminil-Copin, médaillé Fields by and (April 4th, 2025) ► An interview of and a presentation of Self-avoiding Random Walks, Percolation, and the Ising Model.
-
(1987)
- The Oracle of Arithmetic — At 28, Peter Scholze is uncovering deep connections between number theory and geometry. by (June 28th, 2016) ► A presentation of ’s work, in particular the perfectoid spaces.
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(1987)
- The Badly Behaved Prime - with James Maynard (⧉) by and (November 11th, 2019) ► and his interest in primes.
- A Number Theorist Who Solves the Hardest Easy Problems — In his rapid ascent to the top of his field, James Maynard has cut a path through simple-sounding questions about prime numbers that have stumped mathematicians for centuries. by (July 1st, 2020) ► A biography of .
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- Champaign Mathematician - with Holly Krieger (⧉) by and (December 13th, 2019) ► speaks about her education and about her current studies.
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- Gondor Calls For Aid - with Kit Yates (⧉) by and (March 31st, 2020) ► A little information about the work of mathematical biologists during the COVID-19 pandemic.
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- Undergraduate Math Student Pushes Frontier of Graph Theory — At 21, Ashwin Sah has produced a body of work that senior mathematicians say is nearly unprecedented for a college student. by (November 30th, 2020) ► Some information on who did big progress on Ramsey number while being 20 years old.