Stefan Bergman
Stefan Bergman (5 May 1895 – 6 June 1977) was a Polish-born American mathematician whose primary work was in complex analysis. His name is also written Bergmann; he dropped the second "n" when he came to the U. S. He is best known for the kernel function he discovered while at Berlin University in 1922. This function is known today as the Bergman kernel. Bergman taught for many years at Stanford University, and served as an advisor to several students.[1]
Biography
Born in Częstochowa, Congress Poland, Russian Empire, to a Jewish family[2], Bergman received his Ph.D. at Berlin University in 1921 for a dissertation on Fourier analysis. His advisor, Richard von Mises, had a strong influence on him, lasting for the rest of his career.[3] In 1933, Bergman was forced to leave his post at the Berlin University because he was a Jew. He fled first to Russia, where he stayed until 1939, and then to Paris. In 1939, he emigrated to the United States, where he would remain for the rest of life.[3] He was elected a Fellow of the American Academy of Arts and Sciences in 1951.[4] He was a professor at Stanford University from 1952 until his retirement in 1972.[5] He was an invited speaker at the International Congress of Mathematicians in 1950 in Cambridge, Massachusetts[6] and in 1962 in Stockholm (On meromorphic functions of several complex variables).[7] He died in Palo Alto, California, aged 82.
The Bergman Prize
The Stefan Bergman Prize in mathematics was initiated by Bergman's wife in her will, in memory of her husband's work. The American Mathematical Society supports the prize and selects the committee of judges.[8] The prize is awarded for:[8]
- the theory of the kernel function and its applications in real and complex analysis; or
- function-theoretic methods in the theory of partial differential equations of elliptic type with a special attention to Bergman's and related operator methods.
Selected publications
- Bergmann, Stefan (1933), "Über die Kernfunktion eines Bereiches und ihr Verhalten am Rande. I", Journal für die reine und angewandte Mathematik (in German), 1933 (169): 1–42, doi:10.1515/crll.1933.169.1, JFM 60.1025.01.
- Bergmann, Stefan (1934), "Über eine in gewissen Bereichen mit Maximumfläche gültige Integraldarstellung der Funktionen zweier komplexer Variabler: I", Mathematische Zeitschrift (in German), 39: 76–94, doi:10.1007/BF01201345, Zbl 0009.26202.
- Bergmann, Stefan (1935), "Über die Kernfunktion eines Bereiches und ihr Verhalten am Rande. II", Journal für die reine und angewandte Mathematik (in German), 1935 (172): 89–128, doi:10.1515/crll.1935.172.89, JFM 60.1025.01.
- Bergmann, S. (1935), "Über eine in gewissen Bereichen mit Maximumfläche gültige Integraldarstellung der Funktionen zweier komplexer Variabler: II", Mathematische Zeitschrift (in German), 39: 605–608, doi:10.1007/BF01201376, JFM 61.0372.01
- Bergmann, S. (1936), "Über eine Integraldarstellung von Funktionen zweier komplexer Veränderlichen", Recueil Mathématique (Matematicheskii Sbornik) N.S. (in German), 1 (43) (6): 851–862, Zbl 0016.17001
- Bergmann, Stefan (1947) [1941], Sur les fonctions orthogonales de plusieurs variables complexes avec les applications à la théorie des fonctions analytiques., Mémorial des sciences mathématiques (in French), 106 (2nd ed.), Paris: Gauthier-Villars, p. 61, JFM 67.0299.03, MR 0032776, Zbl 0036.05101. The original edition was published in 1941 by Interscience Publishers.[9]
- Bergmann, Stefan (1948), Sur la fonction-noyau d'un domaine et ses applications dans la théorie des transformations pseudo-conformes., Mémorial des sciences mathématiques (in French), 108, Paris: Gauthier-Villars, p. 80, MR 0032777, Zbl 0036.05201.[10]
- The Kernel Function and Conformal Mapping, American Mathematical Society 1950,[11] 2nd edn. 1970
- with Menahem Max Schiffer: Kernel Functions and elliptic differential equations in mathematical physics, Academic Press 1953[12]
- with John G. Herriot: Application of the method of the kernel function for solving boundary value problems, Numerische Mathematik 3, 1961
- Integral operators in the theory of linear partial differential equations, Springer 1961,[13] 2nd edn. 1969
External links
- Author profile in the database zbMATH
References
- Stefan Bergman at the Mathematics Genealogy Project
- O'Connor & Robertson, Stefan Bergman .
- O'Connor, John J.; Robertson, Edmund F., "Stefan Bergman", MacTutor History of Mathematics archive, University of St Andrews..
- "Book of Members, 1780–2010: Chapter B" (PDF). American Academy of Arts and Sciences. Retrieved June 16, 2011.
- Stefan Bergman papers, circa 1940–1972 in SearchWorks, Stanford University Libraries
- Bergman, Stefan. "On visualization of domains in the theory of functions of two complex variables." Archived 2016-10-03 at the Wayback Machine In Proceedings of the International Congress of Mathematicians, vol. 1, pp. 363–373. 1950.
- Bergman, S. "On meromorphic functions of several complex variables, Abstract of short communications." Internat. Congr. Math., Stockholm (1962): 63.
- Other Prizes and Awards Supported by the AMS
- See the review by Gelbart, Abe (1942). "Review: Stefan Bergman, Sur les fonctions orthogonales de plusieurs variables complexes avec les applications à la théorie des fonctions analytiques". Bulletin of the American Mathematical Society. 48 (1): 15–18. doi:10.1090/s0002-9904-1942-07606-3..
- See the review by Behnke, H. (1951). "Review: Stefan Bergman, Sur la fonction-noyau d'un domaine et ses applications dans la théorie du transformations pseudo-conformes". Bulletin of the American Mathematical Society. 57 (3): 186–188. doi:10.1090/s0002-9904-1951-09483-5..
- Behnke, H. (1952). "Review: Stefan Bergman, The kernel function and conformal mapping". Bull. Amer. Math. Soc. 58 (1): 76–78. doi:10.1090/s0002-9904-1952-09553-7.
- Henrici, Peter (1955). "Review: S. Bergman and M. Schiffer, Kernel Functions and elliptic differential equations in mathematical physics". Bull. Amer. Math. Soc. 61 (6): 596–600. doi:10.1090/s0002-9904-1955-10005-5.
- Kreyszig, Erwin (1962). "Review: Stefan Bergman, Integral operators in the theory of linear partial differential equations". Bull. Amer. Math. Soc. 68 (3): 161–162. doi:10.1090/s0002-9904-1962-10724-1.