• 1884 September 03
    (b.) -
    1972 October 05
    (d.)

Bio/Description

An American mathematician who did fundamental work on algebraic topology, its applications to algebraic geometry, and the theory of non-linear ordinary differential equations. Born in Moscow into a Jewish family (his parents were Turkish citizens) who moved shortly after that to Paris; he was educated in Engineering at the ?cole Centrale Paris, but emigrated to the USA in 1905. He was badly injured in an industrial accident in 1907, losing both hands. He moved towards mathematics, receiving a Ph.D. in Algebraic Geometry from Clark University in Worcester, Massachusetts in 1911. 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 ?mile Picard, whom he had heard lecture in Paris at the ?cole Centrale. 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. His book L'analysis situs et la g?om?trie alg?brique 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 SGA7). In 1924 he was awarded the B?cher Memorial Prize for his work in mathematical analysis. The Lefschetz fixed point theorem, now a basic result of topology, he developed 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. He 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. The RIAS mathematics group stimulated the growth of nonlinear differential equations through conferences and publications. It left RIAS in 1964 to form the Lefschetz Center for Dynamical Systems at Brown University, Providence, Rhode Island. Throughout his life; an exuberant world traveler who spoke six languages, he was instrumental in establishing the mathematics department at the National University of Mexico. In 1965, at age 81, he was awarded the national Medal of Science for his indomitable leadership in developing mathematics and training mathematicians. When he died in 1972, he unquestionably had earned the rank of one of the world's foremost mathematicians.
  • Date of Birth:

    1884 September 03
  • Date of Death:

    1972 October 05
  • Gender:

    Male
  • Noted For:

    Developed the Lefschetz fixed point theorem, now a basic result of topology, he developed in papers from 1923 to 1927, initially for manifolds; the structure of which is encoded by a collection of charts that form an atlas, in analogy with an atlas consisting of charts of the surface of the Earth
  • Category of Achievement:

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