Biography:Atle Selberg

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Short description: Norwegian mathematician (1917–2007)
Atle Selberg
Atle Selberg.jpg
Born(1917-06-14)14 June 1917
Langesund, Norway
Died6 August 2007(2007-08-06) (aged 90)
Princeton, New Jersey, United States
NationalityNorwegian
Alma materUniversity of Oslo
Known forCritical line theorem
Local rigidity
Parity problem
Weakly symmetric space
Chowla–Selberg formula
Maass–Selberg relations
Rankin–Selberg method
Selberg class
Selberg's conjecture
Selberg's identity
Selberg integral
Selberg trace formula
Selberg zeta function
Selberg sieve
Spouse(s)Hedvig Liebermann (m. 1947 - died 1995)
Betty Frances ("Mickey") Compton (m. 2003 - 2007)
AwardsAbel Prize (honorary) (2002)
Fields Medal (1950)
Wolf Prize (1986)
Gunnerus Medal (2002)
Scientific career
FieldsMathematics
Institutions

Atle Selberg (14 June 1917 – 6 August 2007) was a Norwegian mathematician known for his work in analytic number theory and the theory of automorphic forms, and in particular for bringing them into relation with spectral theory. He was awarded the Fields Medal in 1950 and an honorary Abel Prize in 2002.

Early years

Selberg was born in Langesund, Norway, the son of teacher Anna Kristina Selberg and mathematician Ole Michael Ludvigsen Selberg. Two of his three brothers, Sigmund and Henrik, were also mathematicians. His other brother, Arne, was a professor of engineering. While he was still at school he was influenced by the work of Srinivasa Ramanujan and he found an exact analytical formula for the partition function as suggested by the works of Ramanujan; however, this result was first published by Hans Rademacher.

He studied at the University of Oslo and completed his PhD in 1943.

World War II

During World War II, Selberg worked in isolation due to the German occupation of Norway. After the war, his accomplishments became known, including a proof that a positive proportion of the zeros of the Riemann zeta function lie on the line [math]\displaystyle{ \Re(s)=\tfrac{1}{2} }[/math].

During the war, he fought against the German invasion of Norway, and was imprisoned several times.

Post-war in Norway

After the war, he turned to sieve theory, a previously neglected topic which Selberg's work brought into prominence. In a 1947 paper he introduced the Selberg sieve, a method well adapted in particular to providing auxiliary upper bounds, and which contributed to Chen's theorem, among other important results.

In 1948 Selberg submitted two papers in Annals of Mathematics in which he proved by elementary means the theorems for primes in arithmetic progression and the density of primes.[2][3] This challenged the widely held view of his time that certain theorems are only obtainable with the advanced methods of complex analysis. Both results were based on his work on the asymptotic formula

[math]\displaystyle{ \vartheta \left( x \right)\log \left( x \right) + \sum\limits_{p \le x} {\log \left( p \right)} \vartheta \left( {\frac{x}{p}} \right) = 2x\log \left( x \right) + O\left( x \right) }[/math]

where

[math]\displaystyle{ \vartheta \left( x \right) = \sum\limits_{p \le x} {\log \left( p \right)} }[/math]

for primes [math]\displaystyle{ p }[/math]. He established this result by elementary means in March 1948, and by July of that year, Selberg and Paul Erdős each obtained elementary proofs of the prime number theorem, both using the asymptotic formula above as a starting point.[4] Circumstances leading up to the proofs, as well as publication disagreements, led to a bitter dispute between the two mathematicians.[5][6]

For his fundamental accomplishments during the 1940s, Selberg received the 1950 Fields Medal.

Institute for Advanced Study

Selberg moved to the United States and worked as an associate professor at Syracuse University and later settled at the Institute for Advanced Study in Princeton, New Jersey in the 1950s, where he remained until his death.[1][7] During the 1950s he worked on introducing spectral theory into number theory, culminating in his development of the Selberg trace formula, the most famous and influential of his results. In its simplest form, this establishes a duality between the lengths of closed geodesics on a compact Riemann surface and the eigenvalues of the Laplacian, which is analogous to the duality between the prime numbers and the zeros of the zeta function.

He was awarded the 1986 Wolf Prize in Mathematics. He was also awarded an honorary Abel Prize in 2002, its founding year, before the awarding of the regular prizes began.

Selberg received many distinctions for his work, in addition to the Fields Medal, the Wolf Prize and the Gunnerus Medal. He was elected to the Norwegian Academy of Science and Letters, the Royal Danish Academy of Sciences and Letters and the American Academy of Arts and Sciences.

In 1972, he was awarded an honorary degree, doctor philos. honoris causa, at the Norwegian Institute of Technology, later part of Norwegian University of Science and Technology.[8]

His first wife, Hedvig, died in 1995. With her, Selberg had two children: Ingrid Selberg (married to playwright Mustapha Matura) and Lars Selberg. In 2003 Atle Selberg married Betty Frances ("Mickey") Compton (born in 1929).

He died at home in Princeton, New Jersey on 6 August 2007 of heart failure.[9]

Selected publications

  • Selberg, Atle (1940). "Bemerkungen über eine Dirichletsche Reihe, die mit der Theorie der Modulformen nahe verbunden ist". Archiv for Mathematik og Naturvidenskab 43 (4): 47–50. 
  • Selberg, Atle (1942). "On the zeros of Riemann's zeta-function". Skrifter Utgitt av det Norske Videnskaps-Akademi i Oslo. I. Mat.-Naturv. Klasse 10: 1–59. 
  • Selberg, Atle (1943). "On the normal density of primes in small intervals, and the difference between consecutive primes". Archiv for Mathematik og Naturvidenskab 47 (6): 87–105. 
  • Selberg, Atle (1944). "Bemerkninger om et multiplet integral". Norsk Matematisk Tidsskrift 26: 71–78. 
  • Selberg, Atle (1946). "Contributions to the theory of the Riemann zeta-function". Archiv for Mathematik og Naturvidenskab 48 (5): 89–155. 
  • Selberg, Atle (1949). "An elementary proof of the prime-number theorem". Annals of Mathematics. Second Series 50 (2): 305–313. doi:10.2307/1969455. 
  • Selberg, Atle (1954). "Note on a paper by L. G. Sathe". Journal of the Indian Mathematical Society. New Series 18 (1): 83–87. 
  • Selberg, A. (1956). "Harmonic analysis and discontinuous groups in weakly symmetric Riemannian spaces with applications to Dirichlet series". Journal of the Indian Mathematical Society. New Series 20 (1-3): 47–87. 
  • Selberg, Atle (1960). "On discontinuous groups in higher-dimensional symmetric spaces". Bombay: Tata Institute of Fundamental Research. pp. 147–164. 
  • Selberg, Atle (1965). "On the estimation of Fourier coefficients of modular forms". VIII. Providence, RI: American Mathematical Society. pp. 1–15. doi:10.1090/pspum/008/0182610. 
  • Selberg, Atle; Chowla, S. (1967). "On Epstein's zeta-function". Journal für die Reine und Angewandte Mathematik 227: 86–110. doi:10.1515/crll.1967.227.86. 
  • Selberg, Atle (1992). "Old and new conjectures and results about a class of Dirichlet series". Salerno: Università di Salerno. pp. 367–385. 

Selberg's collected works were published in two volumes. The first volume contains 41 articles, and the second volume contains three additional articles, in addition to Selberg's lectures on sieves.

References

  1. 1.0 1.1 Ferrara, Christine (August 9, 2007). "Atle Selberg 1917–2007". Institute for Advanced Study (Press release). Retrieved 14 October 2020.
  2. Selberg, Atle (April 1949). "An Elementary Proof of the Prime-Number Theorem". Annals of Mathematics 50 (2): 305–313. doi:10.2307/1969455. https://www.math.lsu.edu/~mahlburg/teaching/handouts/2014-7230/Selberg-ElemPNT1949.pdf. 
  3. Selbert, Atle (April 1949). "An Elementary Proof of Dirichlet's Theorem About Primes in Arithmetic Progression". Annals of Mathematics 50 (2): 297–304. doi:10.2307/1969454. 
  4. Spencer, Joel; Graham, Ronald (2009). "The Elementary Proof of the Prime Number Theorem". The Mathematical Intelligencer 31 (3): 18–23. doi:10.1007/s00283-009-9063-9. http://www.cs.nyu.edu/spencer/erdosselberg.pdf. 
  5. Goldfeld, Dorian (2003). "The Elementary Proof of the Prime Number Theorem: an Historical Perspective". Number Theory: New York Seminar: 179–192. http://www.math.columbia.edu/~goldfeld/ErdosSelbergDispute.pdf. 
  6. Baas, Nils A.; Skau, Christian F. (2008). "The lord of the numbers, Atle Selberg. On his life and mathematics". Bull. Amer. Math. Soc. 45 (4): 617–649. doi:10.1090/S0273-0979-08-01223-8. https://www.ams.org/bull/2008-45-04/S0273-0979-08-01223-8/S0273-0979-08-01223-8.pdf. 
  7. Maugh II, Thomas H. (22 August 2007). "Atle Selberg, 90; Researcher 'Left a Profound Imprint on the World of Mathematics'". Los Angeles Times. https://www.latimes.com/archives/la-xpm-2007-aug-22-me-selberg22-story.html. 
  8. "Honorary Doctors". Norwegian University of Science and Technology. http://www.ntnu.edu/phd/honorary-doctors. 
  9. Pearce, Jeremy (17 August 2007). "Atle Selberg, 90, Lauded Mathematician, Dies". The New York Times. https://www.nytimes.com/2007/08/17/nyregion/17selberg.html. 

Further reading

 | issue = 6 | pages = 692–710 | url = https://www.ams.org/notices/200906/rtx090600692p-corrected.pdf

External links



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