In recent times, selberg trace formula has become increasingly relevant in various contexts. Atle Selberg - Wikipedia. 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. Atle Selberg | Number Theory, Analytic Number Theory & Prime Number .... Atle Selberg was a Norwegian-born American mathematician who was awarded the Fields Medal in 1950 for his work in number theory.
Additionally, in 1986 he shared (with Samuel Eilenberg) the Wolf Prize. fea-selberg - American Mathematical Society. Another key aspect involves, on August 6, 2007, Atle Selberg, one of the pre-eminent mathematicians of the twentieth century, passed away at his home in Princeton, NJ, at the age of ninety. Atle Selberg - Scholars | Institute for Advanced Study. Throughout a career spanning more than six decades, Selberg made significant contributions to modular forms, Riemann and other zeta functions, analytic number theory, sieve methods, discrete groups, and traceformula.
Atle Selberg - Times obituary - MacTutor History of Mathematics. Later, in 1956, he formulated the Selberg Trace Formula, combining number theory with the geometry of surfaces. The ramifications of this work became Selberg's main focus after 1956, and have proved very influential in a number of areas of mathematics.
Atle Selberg - Encyclopedia.com. I n 1950, Atle Selberg received the Fields Medal for his generalizations of Viggo Brun's sieve methods, and for a proof relating to the Riemann zeta function. He is also noted for a proof of the prime number theorem, on which he worked with Paul Erdös (1913-1996). Furthermore, some Commentary on Atle Selberg’s Mathematics.
Beginning around 1950, Selberg turned his attention to modular and more general automorphic forms. His development of the trace formula – as well as the crucial accompanying theory giving the meromorphic continuation of Eisenstein series – mark the beginning of the modern theory. Selberg integral - Wikipedia. Selberg's formula implies Dixon's identity for well poised hypergeometric series, and some special cases of Dyson's conjecture.
Furthermore, this is a corollary of Aomoto. Atle Selberg 1917–2007 - Institute for Advanced Study. Atle Selberg - 2007) - Biography - MacTutor History of Mathematics. Atle Selberg was a Norwegian mathematician known for his work in analytic number theory and on discrete groups and automorphic forms.
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