Eugene Wigner
Eugene Paul "E. P." Wigner (Hungarian: Wigner Jenő Pál; November 17, 1902 – January 1, 1995), was a Hungarian American theoretical physicist and mathematician. He received half of the Nobel Prize in Physics in 1963 "for his contributions to the theory of the atomic nucleus and the elementary particles, particularly through the discovery and application of fundamental symmetry principles".[1]
A graduate of the Technische Hochschule in Berlin, Wigner worked as an assistant to Karl Weissenberg and Richard Becker at the Kaiser Wilhelm Institute in Berlin, and David Hilbert at the University of Göttingen. Wigner and Hermann Weyl were responsible for introducing group theory into physics, particularly the theory of symmetry in physics. Along the way he performed ground-breaking work in pure mathematics, in which he authored a number of mathematical theorems. In particular, Wigner's theorem is a cornerstone in the mathematical formulation of quantum mechanics. He is also known for his research into the structure of the atomic nucleus. In 1930, Princeton University recruited Wigner, along with John von Neumann, and he moved to the United States.
Wigner participated in a meeting with Leo Szilard and Albert Einstein that resulted in the Einstein-Szilard letter, which prompted President Franklin D. Roosevelt to initiate the Manhattan Project to develop atomic bombs. Wigner was afraid that the German nuclear weapon project would develop an atomic bomb first. During the Manhattan Project, he led a team whose task was to design nuclear reactors to convert uranium into weapons grade plutonium. At the time, reactors existed only on paper, and no reactor had yet gone critical. Wigner was disappointed that DuPont was given responsibility for the detailed design of the reactors, not just their construction. He became Director of Research and Development at the Clinton Laboratory (now the Oak Ridge National Laboratory) in early 1946, but became frustrated with bureaucratic interference by the Atomic Energy Commission, and returned to Princeton.
In the postwar period he served on a number of government bodies, including the National Bureau of Standards from 1947 to 1951, the mathematics panel of the National Research Council from 1951 to 1954, the physics panel of the National Science Foundation, and the influential General Advisory Committee of the Atomic Energy Commission from 1952 to 1957 and again from 1959 to 1964. In later life, he became more philosophical, and published The Unreasonable Effectiveness of Mathematics in the Natural Sciences, his best-known work outside of technical mathematics and physics.
Early life
Wigner Jenő Pál was born in Budapest, Austria-Hungary on November 17, 1902, to middle class Jewish parents, Elisabeth (Einhorn) and Anthony Wigner, a leather tanner. He had an older sister, Bertha, known as Biri, and a younger sister Margit, known as Manci,[2] who later married British theoretical physicist Paul Dirac.[3] He was home schooled by a professional teacher until the age of 9, when he started school at the third grade. During this period, Wigner developed an interest in mathematical problems.[4] At the age of 11, Wigner contracted what his doctors believed to be tuberculosis. His parents sent him to live for six weeks in a sanatorium in the Austrian mountains, before the doctors concluded that the diagnosis was mistaken.[5]
Wigner's family was Jewish, but not religiously observant, and his Bar Mitzvah was a secular one. From 1915 through 1919, he studied at the secondary grammar school called Fasori Evangélikus Gimnázium, the school his father had attended. Religious education was compulsory, and he attended classes in Judaism taught by a rabbi.[6] A fellow student was János von Neumann, who was a year behind Wigner. They both benefited from the instruction of the noted mathematics teacher László Rátz.[7] In 1919, to escape the Béla Kun communist regime, the Wigner family briefly fled to Austria, returning to Hungary after Kun's downfall.[8] Partly as a reaction to the prominence of Jews in the Kun regime, the family converted to Lutheranism.[9] Wigner explained later in his life that his family decision to convert to Lutheranism "was not at heart a religious decision but an anti-communist one".[9] On religious views, Wigner was an atheist.[10]
After graduating from the secondary school in 1920, Wigner enrolled at the Budapest University of Technical Sciences, known as the Műegyetem. He was not happy with the courses on offer,[11] and in 1921 enrolled at the Technische Hochschule in Berlin (today the Technische Universität Berlin), where he studied chemical engineering.[12] He also attended the Wednesday afternoon colloquia of the German Physical Society. These colloquia featured such luminaries as Max Planck, Max von Laue, Rudolf Ladenburg, Werner Heisenberg, Walther Nernst, Wolfgang Pauli, and Albert Einstein.[13] Wigner also met the physicist Leó Szilárd, who at once became Wigner's closest friend.[14] A third experience in Berlin was formative. Wigner worked at the Kaiser Wilhelm Institute for Physical Chemistry and Electrochemistry (now the Fritz Haber Institute), and there he met Michael Polanyi, who became, after László Rátz, Wigner's greatest teacher. Polanyi supervised Wigner's DSc thesis, Bildung und Zerfall von Molekülen ("Formation and Decay of Molecules").[15]
Middle years
Wigner returned to Budapest, where he went to work at his father's tannery, but in 1926, he accepted an offer from Karl Weissenberg at the Kaiser Wilhelm Institute in Berlin. Weissenberg wanted someone to assist him with his work on x-ray crystallography, and Polanyi had recommended Wigner. After six months as Weissenberg's assistant, Wigner went to work for Richard Becker for two semesters. Wigner explored quantum mechanics, studying the work of Erwin Schrödinger. He also delved into the group theory of Ferdinand Frobenius and Eduard Ritter von Weber.[16]
Wigner received a request from Arnold Sommerfeld to work at the University of Göttingen as an assistant to the great mathematician David Hilbert. This proved a disappointment, as the aged Hilbert's abilities were failing, and his interests had shifted to logic. Wigner nonetheless studied independently.[17] He laid the foundation for the theory of symmetries in quantum mechanics and in 1927 introduced what is now known as the Wigner D-matrix.[18] Wigner and Hermann Weyl were responsible for introducing group theory into quantum mechanics. The latter had written a standard text, Group Theory and Quantum Mechanics (1928), but it was not easy to understand, especially for younger physicists. Wigner's Group Theory and Its Application to the Quantum Mechanics of Atomic Spectra (1931) made group theory accessible to a wider audience.[19]
In these works, Wigner laid the foundation for the theory of symmetries in quantum mechanics.[20] Wigner's theorem proved by Wigner in 1931, is a cornerstone of the mathematical formulation of quantum mechanics. The theorem specifies how physical symmetries such as rotations, translations, and CPT symmetry are represented on the Hilbert space of states. According to the theorem, any symmetry transformation is represented by a linear and unitary or antilinear and antiunitary transformation of Hilbert space. The representation of a symmetry group on a Hilbert space is either an ordinary representation or a projective representation.[21][22]
In the late 1930s, Wigner extended his research into atomic nuclei. By 1929, his papers were drawing notice in the world of physics. In 1930, Princeton University recruited Wigner for a one-year lectureship, at 7 times the salary that he had been drawing in Europe. Princeton recruited von Neumann at the same time. Jenő Pál Wigner and János von Neumann had collaborated on three papers together in 1928 and two in 1929. They anglicized their first names to "Eugene" and "John", respectively.[23] When their year was up, Princeton offered a five-year contract as visiting professors for half the year. The Technische Hochschule responded with a teaching assignment for the other half of the year. This was very timely, since the Nazis soon rose to power in Germany.[24] At Princeton in 1934, Wigner introduced his sister Manci to the physicist Paul Dirac, whom she married.[25]
Princeton did not rehire Wigner when his contract ran out in 1936.[26] Through Gregory Breit, Wigner found new employment at the University of Wisconsin. There he met his first wife, Amelia Frank, who was a physics student there. However she died unexpectedly in 1937, leaving Wigner distraught. He therefore accepted a 1938 offer from Princeton to return there.[27] Wigner became a naturalized citizen of the United States on January 8, 1937, and he brought his parents to the United States.[28]
Manhattan Project
Although he was a professed political amateur, on August 2, 1939, he participated in a meeting with Leó Szilárd and Albert Einstein that resulted in the Einstein–Szilárd letter, which prompted President Franklin D. Roosevelt to initiate the Manhattan Project to develop atomic bombs.[29] Wigner was afraid that the German nuclear weapon project would develop an atomic bomb first, and even refused to have his fingerprints taken because they could be used to track him down if Germany won.[30] "Thoughts of being murdered," he later recalled, "focus your mind wonderfully."[30]
On June 4, 1941, Wigner married his second wife, Mary Annette Wheeler, a professor of physics at Vassar College, who had completed her Ph.D. at Yale University in 1932. After the war she taught physics on the faculty of Rutgers University's Douglass College in New Jersey until her retirement in 1964. They remained married until her death in November 1977.[31][32] They had two children, David Wigner and Martha Wigner Upton.[33]
During the Manhattan Project, Wigner led a team that included Alvin M. Weinberg, Katharine Way, Gale Young and Edward Creutz. The group's task was to design the production nuclear reactors that would convert uranium into weapons grade plutonium. At the time, reactors existed only on paper, and no reactor had yet gone critical. In July 1942, Wigner chose a conservative 100 MW design, with a graphite neutron moderator and water cooling.[34] Wigner was present at a converted rackets court under the stands at the University of Chicago's abandoned Stagg Field on December 2, 1942, when the world's first atomic reactor, Chicago Pile One (CP-1) achieved a controlled nuclear chain reaction.[35]
Wigner was disappointed that DuPont was given responsibility for the detailed design of the reactors, not just their construction. He threatened to resign in February 1943, but was talked out of it by the head of the Metallurgical Laboratory, Arthur Compton, who sent him on vacation instead. As it turned out, a design decision by DuPont to give the reactor additional load tubes for more uranium saved the project when neutron poisoning became a problem.[36] Without the additional tubes, the reactor could have been run at 35% power until the boron impurities in the graphite were burned up and enough plutonium produced to run the reactor at full power; but this would have set the project back a year.[37] During the 1950s, he would even work for DuPont on the Savannah River Site.[36] Wigner did not regret working on the Manhattan Project, and sometimes wished the atomic bomb had been ready a year earlier.[38]
An important discovery Wigner made during the project was the Wigner effect. This is a swelling of the graphite moderator caused by the displacement of atoms by neutron radiation.[39] The Wigner effect was a serious problem for the reactors at the Hanford Site in the immediate post-war period, and resulted in production cutbacks and a reactor being shut down entirely.[40] It was eventually discovered that it could be overcome by controlled heating and annealing.[41]
Through Manhattan project funding, Wigner and Leonard Eisenbud also developed an important general approach to nuclear reactions, the Wigner–Eisenbud R-matrix theory, which was published in 1947.[42]
Later years
Wigner accepted a position as the Director of Research and Development at the Clinton Laboratory (now the Oak Ridge National Laboratory) in Oak Ridge, Tennessee in early 1946. Because he did not want to be involved in administrative duties, he became co-director of the laboratory, with James Lum handling the administrative chores as executive director.[43] When the newly created Atomic Energy Commission (AEC) took charge of the laboratory's operations at the start of 1947, Wigner feared that many of the technical decisions would be made in Washington.[44] He also saw the Army's continuation of wartime security policies at the laboratory as a "meddlesome oversight", interfering with research.[45] One such incident occurred in March 1947, when the AEC discovered that Wigner's scientists were conducting experiments with a critical mass of uranium-235 when the Director of the Manhattan Project, Major General Leslie R. Groves, Jr., had forbidden such experiments in August 1946 after the death of Louis Slotin at the Los Alamos Laboratory. Wigner argued that Groves's order had been superseded, but was forced to terminate the experiments, which were completely different from the one that killed Slotin.[46]
Feeling unsuited to a managerial role in such an environment, he left Oak Ridge at the end of summer in 1947 and returned to Princeton University,[47] although he maintained a consulting role with the facility for many years.[44] In the postwar period he served on a number of government bodies, including the National Bureau of Standards from 1947 to 1951, the mathematics panel of the National Research Council from 1951 to 1954, the physics panel of the National Science Foundation, and the influential General Advisory Committee of the Atomic Energy Commission from 1952 to 1957 and again from 1959 to 1964.[48] He also contributed to civil defense.[49]
Near the end of his life, Wigner's thoughts turned more philosophical. In 1960, he published a now classic article on the philosophy of mathematics and of physics, which has become his best-known work outside of technical mathematics and physics, The Unreasonable Effectiveness of Mathematics in the Natural Sciences.[50] He argued that biology and cognition could be the origin of physical concepts, as we humans perceive them, and that the happy coincidence that mathematics and physics were so well matched, seemed to be "unreasonable" and hard to explain.[50] His original paper has provoked and inspired many responses across a wide range of disciplines. These included Richard Hamming in Computer Science,[51] Arthur Lesk in Molecular Biology,[52] Peter Norvig in data mining,[53] Max Tegmark in Physics,[54] Ivor Grattan-Guinness in Mathematics,[55] and Vela Velupillai in Economics.[56]
Wigner was awarded the Nobel Prize in Physics in 1963 "for his contributions to the theory of the atomic nucleus and the elementary particles, particularly through the discovery and application of fundamental symmetry principles".[1] The prize was shared that year, with the other half of the award divided between Maria Goeppert-Mayer and J. Hans D. Jensen.[1] Wigner professed that he had never considered the possibility that this might occur, and added: "I never expected to get my name in the newspapers without doing something wicked."[57] He also won the Franklin Medal in 1950,[58] the Enrico Fermi award in 1958,[59] the Atoms for Peace Award in 1959,[60] the Max Planck Medal in 1961,[61] the National Medal of Science in 1969,[62] the Albert Einstein Award in 1972,[63] and the eponymous Wigner Medal in 1978.[64] In 1968 he gave the Josiah Willard Gibbs lecture.[65][66]
Mary died in November 1977. In 1979, Wigner married his third wife, Eileen Clare-Patton (Pat) Hamilton, the widow of physicist Donald Ross Hamilton, the Dean of the Graduate School at Princeton University, who had died in 1972.[67] In 1992, at the age of 90, he published his memoirs, The Recollections of Eugene P. Wigner with Andrew Szanton. In it, Wigner said: "The full meaning of life, the collective meaning of all human desires, is fundamentally a mystery beyond our grasp. As a young man, I chafed at this state of affairs. But by now I have made peace with it. I even feel a certain honor to be associated with such a mystery."[68] In his collection of essays Symmetries and Reflections – Scientific Essays (1995), he commented: "It was not possible to formulate the laws of quantum mechanics in a fully consistent way without reference to consciousness."[69]
Wigner died of pneumonia at the University Medical Center in Princeton, New Jersey on 1 January 1995.[70] He was survived by his wife Eileen and children Erika, David and Martha, and his sisters Bertha and Margit.[63]
Publications
- 1958 (with Alvin M. Weinberg). Physical Theory of Neutron Chain Reactors University of Chicago Press. ISBN 0-226-88517-8
- 1959. Group Theory and its Application to the Quantum Mechanics of Atomic Spectra. New York: Academic Press. Translation by J. J. Griffin of 1931, Gruppentheorie und ihre Anwendungen auf die Quantenmechanik der Atomspektren, Vieweg Verlag, Braunschweig.
- 1970 Symmetries and Reflections: Scientific Essays. Indiana University Press, Bloomington ISBN 0-262-73021-9
- 1992 (as told to Andrew Szanton). The Recollections of Eugene P. Wigner. Plenum. ISBN 0-306-44326-0
- 1995 (with Jagdish Mehra and Arthur S. Wightman, eds.). Philosophical Reflections and Syntheses. Springer, Berlin ISBN 3-540-63372-3
See also
Wikimedia Commons has media related to Eugene Wigner. |
Wikiquote has quotations related to: Eugene Wigner |
- List of things named after Eugene Wigner
- Wigner rotation
- Wigner quasi-probability distribution
- Wigner semicircle distribution
- Particle physics and representation theory
- Wigner effect
- Wigner–Seitz cell
- Wigner 3-j symbols
- List of Jewish Nobel laureates
- Wigner–İnönü group contraction
- Wigner–Eckart theorem
- Random matrix
Notes
- 1 2 3 "The Nobel Prize in Physics 1963". Nobel Foundation. Retrieved May 19, 2015.
- ↑ Szanton 1992, pp. 9–12.
- ↑ Szanton 1992, pp. 164–166.
- ↑ Szanton 1992, pp. 14–15.
- ↑ Szanton 1992, pp. 22–24.
- ↑ Szanton 1992, pp. 33–34, 47.
- ↑ Szanton 1992, pp. 49–53.
- ↑ Szanton 1992, pp. 40–43.
- 1 2 Szanton 1992, p. 38.
- ↑ Szanton 1992, pp. 60–61.
- ↑ Szanton 1992, p. 59.
- ↑ Szanton 1992, pp. 64–65.
- ↑ Szanton 1992, pp. 68–75.
- ↑ Szanton 1992, pp. 93–94.
- ↑ Szanton 1992, pp. 76–84.
- ↑ Szanton 1992, pp. 101–106.
- ↑ Szanton 1992, pp. 109–112.
- ↑ Wigner, E. (1927). "Einige Folgerungen aus der Schrödingerschen Theorie für die Termstrukturen". Zeitschrift für Physik (in German) 43 (9–10): 624–652. Bibcode:1927ZPhy...43..624W. doi:10.1007/BF01397327.
- ↑ Szanton 1992, pp. 116–119.
- ↑ Wightman, A.S. (1995). "Eugene Paul Wigner 1902–1995" (PDF). Notices of the American Mathematical Society 42 (7): 769–771.
- ↑ Wigner 1931, pp. 251–254.
- ↑ Wigner 1959, pp. 233–236.
- ↑ Szanton 1992, pp. 127–132.
- ↑ Szanton 1992, pp. 136, 153–155.
- ↑ Szanton 1992, pp. 163–166.
- ↑ Szanton 1992, pp. 171–172.
- ↑ Szanton 1992, pp. 173–178.
- ↑ Szanton 1992, pp. 184–185.
- ↑ Szanton 1992, pp. 197–202.
- 1 2 Szanton 1992, p. 215.
- ↑ Szanton 1992, pp. 205–207.
- ↑ "Obituary: Mary Wigner". Physics Today 31 (7): 58. July 1978. Bibcode:1978PhT....31g..58.. doi:10.1063/1.2995119.
- ↑ "Wigner Biography". St Andrews University. Retrieved August 10, 2013.
- ↑ Szanton 1992, pp. 217–218.
- ↑ "Chicago Pile 1 Pioneers". Los Alamos National Laboratory. Retrieved August 10, 2013.
- 1 2 Szanton 1992, pp. 233–235.
- ↑ Wigner & Weinberg 1992, p. 8.
- ↑ Szanton 1992, p. 249.
- ↑ Wigner, E. P. (1946). "Theoretical Physics in the Metallurgical Laboratory of Chicago". Journal of Applied Physics 17 (11): 857. Bibcode:1946JAP....17..857W. doi:10.1063/1.1707653.
- ↑ Rhodes 1995, p. 277.
- ↑ Wilson, Richard (November 8, 2002). "A young Scientist's Meetings with Wigner in America". Budapest: Wigner Symposium, Hungarian Academy of Sciences. Retrieved May 16, 2015.
- ↑ Leal, L. C. "Brief Review of R-Matrix Theory" (PDF). Retrieved August 12, 2013.
- The original paper is Wigner, E. P.; Eisenbud, L. (1 July 1947). "Higher Angular Momenta and Long Range Interaction in Resonance Reactions". Physical Review 72 (1): 29–41. Bibcode:1947PhRv...72...29W. doi:10.1103/PhysRev.72.29.
- ↑ Johnson & Schaffer 1994, p. 31.
- 1 2 Seitz, Frederick; Vogt, Erich; Weinberg, Alvin M. "Eugene Paul Wigner". Biographical Memoirs. National Academies Press. Retrieved 20 August 2013.
- ↑ "ORNL History. Chapter 2: High-Flux Years. Section: Research and Regulations". ORNL Review. Oak Ridge National Laboratory's Communications and Community Outreach. Retrieved 20 August 2013.
Oak Ridge at that time was so terribly bureaucratized that I am sorry to say I could not stand it.
- ↑ Hewlett & Duncan 1969, pp. 38–39.
- ↑ Johnson & Schaffer 1994, p. 49.
- ↑ Szanton 1992, p. 270.
- ↑ Szanton 1992, pp. 288–290.
- 1 2 Wigner, E. P. (1960). "The unreasonable effectiveness of mathematics in the natural sciences. Richard Courant lecture in mathematical sciences delivered at New York University, May 11, 1959". Communications on Pure and Applied Mathematics 13: 1–14. Bibcode:1960CPAM...13....1W. doi:10.1002/cpa.3160130102.
- ↑ Hamming, R. W. (1980). "The Unreasonable Effectiveness of Mathematics". The American Mathematical Monthly 87 (2): 81–90. doi:10.2307/2321982.
- ↑ Lesk, A. M. (2000). "The unreasonable effectiveness of mathematics in molecular biology". The Mathematical Intelligencer 22 (2): 28–37. doi:10.1007/BF03025372.
- ↑ Halevy, A.; Norvig, P.; Pereira, F. (2009). "The Unreasonable Effectiveness of Data" (PDF). IEEE Intelligent Systems 24 (2): 8–12. doi:10.1109/MIS.2009.36.
- ↑ Tegmark, Max (2007). "The Mathematical Universe". Foundations of Physics 38 (2): 101–150. arXiv:0704.0646. Bibcode:2008FoPh...38..101T. doi:10.1007/s10701-007-9186-9.
- ↑ Grattan-Guinness, I. (2008). "Solving Wigner’s mystery: The reasonable (though perhaps limited) effectiveness of mathematics in the natural sciences". The Mathematical Intelligencer 30 (3): 7–17. doi:10.1007/BF02985373.
- ↑ Velupillai, K. V. (2005). "The unreasonable ineffectiveness of mathematics in economics". Cambridge Journal of Economics 29 (6): 849–872. doi:10.1093/cje/bei084.
- ↑ Szanton 1992, p. 147.
- ↑ "Eugene P. Wigner". The Franklin Institute. Retrieved May 19, 2015.
- ↑ "Eugene P. Wigner, 1958". United States Department of Energy Office of Science. Retrieved May 19, 2015.
- ↑ "Guide to Atoms for Peace Awards Records MC.0010". Massachusetts Institute of Technology. Retrieved May 19, 2015.
- ↑ "Preisträger Max Planck nach Jahren" (in German). Deutschen Physikalischen Gesellschaft. Retrieved May 19, 2015.
- ↑ "The President's National Medal of Science: Recipient Details". United States National Science Foundation. Retrieved May 19, 2015.
- 1 2 "Eugene P. Wigner". Princeton University.
- ↑ "The Wigner Medal". University of Texas. Retrieved May 19, 2015.
- ↑ "Josiah Willard Gibbs Lectures". American Mathematical Society. Retrieved May 15, 2015.
- ↑ "Problems of symmetry in old and new physics". Bulletin of the American Mathematical Society 75 (5): 793–815. 1968. doi:10.1090/S0002-9904-1968-12047-6. MR 1566474.
- ↑ Szanton 1992, p. 305.
- ↑ Szanton 1992, p. 318.
- ↑ Wigner, Mehra & Wightman 1995, p. 14.
- ↑ Broad, William J. (January 4, 1995). "Eugene Wigner, 92, Quantum Theorist Who Helped Usher In Atomic Age, Dies". The New York Times.
References
- Hewlett, Richard G.; Duncan, Francis (1969). Atomic Shield, 1947–1952 (PDF). A History of the United States Atomic Energy Commission. University Park, Pennsylvania: Pennsylvania State University Press. ISBN 0-520-07187-5. OCLC 3717478. Retrieved 7 March 2015.
- Johnson, Leland; Schaffer, Daniel (1994). Oak Ridge National Laboratory: the first fifty years. Knoxville: University of Tennessee Press. ISBN 9780870498534.
- Rhodes, Richard (1995). Dark Sun: The Making of the Hydrogen Bomb. New York: Simon & Schuster. ISBN 0-684-80400-X.
- Szanton, Andrew (1992). The Recollections of Eugene P. Wigner. Plenum. ISBN 0-306-44326-0.
- Wigner, E. P. (1931). Gruppentheorie und ihre Anwendung auf die Quanten mechanik der Atomspektren (in German). Braunschweig, Germany: Friedrich Vieweg und Sohn. ASIN B000K1MPEI.
- Wigner, E. P. (1959). Group Theory and its Application to the Quantum Mechanics of Atomic Spectra. translation from German by J. J. Griffin. New York: Academic Press. ISBN 978-0-1275-0550-3.
- Wigner, E. P.; Weinberg, Alvin M. (1992). The collected works of Eugene Paul Wigner, Volume 5, Part A, Nuclear energy. Berlin: Springer. ISBN 9780387553436.
- Wigner, Eugene Paul; Mehra, Jagdish; Wightman, A. S. (1995). Philosophical reflections and syntheses. Berlin: Springer. ISBN 3-540-63372-3.
External links
- 1964 Audio Interview with Eugene Wigner by Stephane Groueff Voices of the Manhattan Project
- Biography and Bibliographic Resources, from the Office of Scientific and Technical Information, United States Department of Energy
- O'Connor, John J.; Robertson, Edmund F., "Eugene Wigner", MacTutor History of Mathematics archive, University of St Andrews.
- Eugene Wigner at the Mathematics Genealogy Project
- EPW contributions to the theory of the atomic nucleus and the elementary particles, particularly through the discovery and application of fundamental symmetry principles at the Wayback Machine (archived July 9, 2011)
- 1984 interview with Wigner, in: The Princeton University Mathematics Community in the 1930s. at the Wayback Machine (archived October 5, 2012)
- Oral history interview transcript with Eugene Wigner 21 November 1963, American Institute of Physics, Niels Bohr Library & Archives at the Wayback Machine (archived October 1, 2013)
- Oral history interview transcript with Eugene Wigner 24 January 1981, American Institute of Physics, Niels Bohr Library & Archives Archived March 26, 2015 at the Wayback Machine
- Wigner Jenö Iskolás Évei by Radnai Gyula, ELTE, Fizikai Szemle 2007/2 – 62.o. (Hungarian). Description of the childhood and especially of the school-years in Budapest, with some interesting photos too.
- Interview with Eugene P. Wigner on John von Neumann at the Charles Babbage Institute, University of Minnesota, Minneapolis – Wigner talks about his association with John von Neumann during their school years in Hungary, their graduate studies in Berlin, and their appointments to Princeton in 1930. Wigner discusses von Neumann's contributions to the theory of quantum mechanics, Wigner's own work in this area, and von Neumann's interest in the application of theory to the atomic bomb project.
|
|
|
|
|