To install click the Add extension button. That's it.

The source code for the WIKI 2 extension is being checked by specialists of the Mozilla Foundation, Google, and Apple. You could also do it yourself at any point in time.

Kelly Slayton
Congratulations on this excellent venture… what a great idea!
Alexander Grigorievskiy
I use WIKI 2 every day and almost forgot how the original Wikipedia looks like.
What we do. Every page goes through several hundred of perfecting techniques; in live mode. Quite the same Wikipedia. Just better.

Solomon Lefschetz

From Wikipedia, the free encyclopedia

Solomon Lefschetz ForMemRS (Russian: Соломо́н Ле́фшец; 3 September 1884 – 5 October 1972) was an American mathematician who did fundamental work on algebraic topology, its applications to algebraic geometry, and the theory of non-linear ordinary differential equations.[3][1][4][5]


He was born in Moscow, the son of Alexander Lefschetz and his wife Sarah or Vera Lifschitz, Jewish traders who used to travel around Europe and the Middle East (they held Ottoman passports)[citation needed]. Shortly thereafter, the family moved to Paris. He was educated there in engineering at the École Centrale Paris, but emigrated to the US in 1905.

He was badly injured in an industrial accident in 1907, losing both hands.[6] He moved towards mathematics, receiving a Ph.D. in algebraic geometry from Clark University in Worcester, Massachusetts in 1911.[7] He then took positions in University of Nebraska and University of Kansas, moving to Princeton University in 1924, where he was soon given a permanent position. He remained there until 1953.

In the application of topology to algebraic geometry, he followed the work of Charles Émile Picard, whom he had heard lecture in Paris at the École Centrale Paris. He proved theorems on the topology of hyperplane sections of algebraic varieties, which provide a basic inductive tool (these are now seen as allied to Morse theory, though a Lefschetz pencil of hyperplane sections is a more subtle system than a Morse function because hyperplanes intersect each other). The Picard–Lefschetz formula in the theory of vanishing cycles is a basic tool relating the degeneration of families of varieties with 'loss' of topology, to monodromy. He was an Invited Speaker of the ICM in 1920 in Strasbourg.[8] His book L'analysis situs et la géométrie algébrique from 1924, though opaque foundationally given the current technical state of homology theory, was in the long term very influential (one could say that it was one of the sources for the eventual proof of the Weil conjectures, through SGA 7 also for the study of Picard groups of Zariski surface). In 1924 he was awarded the Bôcher Memorial Prize for his work in mathematical analysis.

The Lefschetz fixed point theorem, now a basic result of topology, was developed by him in papers from 1923 to 1927, initially for manifolds. Later, with the rise of cohomology theory in the 1930s, he contributed to the intersection number approach (that is, in cohomological terms, the ring structure) via the cup product and duality on manifolds. His work on topology was summed up in his monograph Algebraic Topology (1942). From 1944 he worked on differential equations.

He was editor of the Annals of Mathematics from 1928 to 1958. During this time, the Annals became an increasingly well-known and respected journal, and Lefschetz played an important role in this.[9]

In 1945 he travelled to Mexico for the first time, where he joined the Institute of Mathematics at the National University of Mexico as a visiting professor. He visited frequently for long periods, and during 1953–1966 he spent most of his winters in Mexico City.[9] He played an important role in the foundation of mathematics in Mexico, and sent several students back to Princeton. His students included Emilio Lluis, José Adem, Samuel Gitler, Santiago López de Medrano, Francisco Javier González-Acuña and Alberto Verjovsky.[2]

Lefschetz came out of retirement in 1958, because of the launch of Sputnik, to augment the mathematical component of Glenn L. Martin Company's Research Institute for Advanced Studies (RIAS) in Baltimore, Maryland. His team became the world's largest group of mathematicians devoted to research in nonlinear differential equations.[10] The RIAS mathematics group stimulated the growth of nonlinear differential equations through conferences and publications. He left RIAS in 1964 to form the Lefschetz Center for Dynamical Systems at Brown University, Providence, Rhode Island.[11]

Selected works


  1. ^ a b Hodge, W. V. D. (1973). "Solomon Lefschetz 1884-1972". Biographical Memoirs of Fellows of the Royal Society. 19: 433–453. doi:10.1098/rsbm.1973.0016. S2CID 122747688.
  2. ^ a b "Mathematics in Mexico" (PDF). Sociedad Matematica Mexicana.
  3. ^ a b c d Solomon Lefschetz at the Mathematics Genealogy Project
  4. ^ Markus, L. (1973). "Solomon Lefschetz: An appreciation in memoriam". Bull. Amer. Math. Soc. 79 (4): 663–680. doi:10.1090/s0002-9904-1973-13256-2.
  5. ^ O'Connor, John J.; Robertson, Edmund F., "Solomon Lefschetz", MacTutor History of Mathematics archive, University of St Andrews
  6. ^ Mathematical Apocrypha: Stories and Anecdotes of Mathematicians and the Mathematical, p. 148, at Google Books
  7. ^ Lefschetz, Solomon (1911). On the existence of LocI with given singularities (Ph.D.). Clark University. OCLC 245921866 – via ProQuest.
  8. ^ "Quelques remarques sur la multiplication complexe by S. Lefschetz" (PDF). Compte rendu du Congrès international des mathématiciens tenu à Strasbourg du 22 au 30 Septembre 1920. 1921. pp. 300–307. Archived from the original (PDF) on 2017-10-29.
  9. ^ a b Griffiths, Phillip; Spencer, Donald; Whitehead, George (1992). "Solomon Lefschetz 1884-1972" (PDF). National Academy of Sciences. Archived from the original (PDF) on 2014-12-22.
  10. ^ Allen, K. N. (1988, January). Undaunted genius. Clark News, 11(1), p. 9.
  11. ^ About LCDS (Lefschetz Center for Dynamical Systems @ Brown University)
  12. ^ Alexander, James W. (1925). "Review: S. Lefschetz, L'Analysis Situs et la Géométrie Algébrique". Bull. Amer. Math. Soc. 31 (9): 558–559. doi:10.1090/s0002-9904-1925-04116-6.
  13. ^ Zariski, Oscar (1930). "Review: S. Lefschetz, Géométrie sur les Surfaces et les Variétés Algébriques". Bulletin of the American Mathematical Society. 36 (9): 617–618. doi:10.1090/s0002-9904-1930-05017-x.
  14. ^ Smith, Paul A. (1931). "Letschetz on Topology". Bulletin of the American Mathematical Society. 37 (9, Part 1): 645–648. doi:10.1090/S0002-9904-1931-05201-0.
  15. ^ Antosiewicz, H. A. (1963). "Review: Joseph LaSalle and Solomon Lefschetz, Stability by Liapunov's direct method with applications". Bulletin of the American Mathematical Society. 69 (2): 209–210. doi:10.1090/s0002-9904-1963-10915-5.
  16. ^ Haas, Felix (1958). "Review: S. Lefschetz, Differential equations: Geometric theory". Bulletin of the American Mathematical Society. 64 (4): 203–206. doi:10.1090/s0002-9904-1958-10212-8.

External links

This page was last edited on 21 June 2021, at 09:48
Basis of this page is in Wikipedia. Text is available under the CC BY-SA 3.0 Unported License. Non-text media are available under their specified licenses. Wikipedia® is a registered trademark of the Wikimedia Foundation, Inc. WIKI 2 is an independent company and has no affiliation with Wikimedia Foundation.