Hassler Whitney

Infobox Scientist
name = Hassler Whitney


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birth_date = birth date|1907|3|23
birth_place =
death_date = death date and age|1989|5|10|1907|3|23
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field = Mathematics
work_institutions = Harvard University
Institute for Advanced Study
Princeton University
National Science Foundation
National Defense Research Committee
alma_mater = Yale University
doctoral_advisor = George David Birkhoff
doctoral_students =
known_for = singularity theory
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prizes = National Medal of Science 1976
Wolf Prize 1983
Steele Prize 1985
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Hassler Whitney (23 March 1907 – 10 May 1989) was an American mathematician. He was one of the founders of singularity theory.

Work

Whitney's earliest work, from 1930 to 1933, was on graph theory. Many of his contributions were to the graph-coloring, and the ultimate computer-assisted solution to the four-color problem relied on some of his results. His work in graph theory culminated in a 1935 paper, where he laid the foundations for matroids, a fundamental notion in modern combinatorics and representation theory.

Whitney's lifelong interest in geometric properties of functions also began around this time. His earliest work in this subject was on the possibility of extending a function defined on a closed subset of R^"n" to a function on all of R^"n" with certain smoothnessproperties. A complete solution to this problem was only found in 2005 by Charles Fefferman.

In a 1936 paper, Whitney gave a definition of a "smooth manifold of class "C^r", and proved that, for high enough values of "r",a smooth manifold of dimension "n" may be embedded in R^2"n"+1, and immersed in R^2"n". (In 1944 he managed to reduce the dimension of the ambient space by 1, so long as "n" > 2, by a technique that has come to be known as the "Whitney trick.") This basic result shows that manifolds may be treated intrinsically or extrinsically, as we wish. The intrinsic definition had only been published a few years earlier in the work of Oswald Veblen and J.H.C. Whitehead. These theorems opened the way for much more refined studies: of embedding, immersion and also of smoothing, that is, the possibility of having various smooth structures on a given topological manifold.

He was one of the major developers of cohomology theory, and characteristic classes, as these concepts emerged in the late 1930s, and his work on algebaic topology continued into the 40s. He also returned to the study of functions in the 1940s, continuing his work on the extension problems formulated a decade earlier, and answering a question of Schwarz in a 1948 paper "On Ideals of Differentiable Functions".

Whitney had, throughout the 1950s, an almost unique interest in the topology of singular spaces and in singularities of smooth maps. An old idea,even implicit in the notion of a simplicial complex, was to study a singular space by decomposing it into smooth pieces (nowadays called "strata"). Whitney was the first to see any subtlety in this definition, and pointed out that a good "stratification" should satisfy conditions he termed "A" and "B". The work of René Thom and John Mather in the 1960s showed that these conditions give a very robust definition of stratified space.The singularities in low dimension of smooth mappings, later to come to prominence in the work of René Thom, were also first studied by Whitney.

His book "Geometric Integration Theory" gives a theoretical basis for Stokes' theorem applied with singularities on the boundary and later inspired the generalization found by Jenny Harrison.

These aspects of Whitney’s work have looked more unified, in retrospect and with the general development of singularity theory. Whitney’s purely topological work (Stiefel-Whitney class, basic results on vector bundles) entered the mainstream more quickly.

Career

He received his Ph.B. from Yale University in 1928; his Mus.B., 1929; Sc.D. (Honorary), 1947; and Ph.D. from Harvard University, under George David Birkhoff, in 1932.

He was Instructor of Mathematics at Harvard University, 1930-31, 1933-35; NRC Fellow, Mathematics, 1931-33; Assistant Professor, 1935-40; Associate Professor, 1940-46, Professor, 1946-52; Professor Instructor, Institute for Advanced Study, Princeton University, 1952-77; Professor Emeritus, 1977-89; Chairman of the Mathematics Panel, National Science Foundation, 1953-56; Exchange Professor, College de France, 1957; Memorial Committee, Support of Research in Mathematical Sciences, National Research Council, 1966-67; President, International Commission of Mathematical Instruction, 1979-82; Research Mathematicians, National Defense Research Committee, 1943-45; Construction of the School of Mathematics. Recipient, National Medal of Science, 1976, Wolf Prize, Wolf Foundation, 1983; and a Steele Prize in 1985.

He was a member of the National Academy of Science; Colloquium Lecturer, American Mathematical Society, 1946; Vice President, 1948-50 and Editor, American Journal of Mathematics, 1944-49; Editor, Mathematical Reviews, 1949-54; Chairman of the Committee vis. lectureship, 1946-51; Committee Summer Instructor, 1953-54; Steele Prize, 1985, American Mathematical Society; American National Council Teachers of Mathematics, Swiss Mathematics Society (Honorary), Académie des Sciences (Foreign Associate); New York Academy of Sciences.

Family

Hassler Whitney was the son of New York Supreme Court Justice Edward Baldwin Whitney and Josepha (Newcomb) Whitney, the grandson of Yale University Professor of Ancient Languages William Dwight Whitney, the great-grandson of Connecticut Governor and US Senator Roger Sherman Baldwin, and the great-great-great-grandson of American founding father Roger Sherman.

Hassler Whitney's maternal grandparents were professor & astronomer Simon Newcomb and Mary Hassler Newcomb (the granddaughter of the first superintendent of the Coast Survey - Ferdinand Hassler).

Married Margaret R. Howell, May 30, 1930; children: James Newcomb, Carol, Marian; married Mary Barnett Garfield, January 16, 1955; children: Sarah Newcomb, Emily Baldwin; and married Barbara Floyd Osterman, February 8, 1986.

ee also

*Loomis-Whitney inequality
*McShane-Whitney extension theorem
*Whitney's conditions A and B
*Whitney embedding theorem
*Whitney graph isomorphism theorem
*Whitney umbrella

External links

*MathGenealogy |id=4956
*MacTutor Biography|id=Whitney
* [http://www.whitneygen.org/archives/biography/hassler.html Hassler Whitney Page - Whitney Research Group]
* [http://infoshare1.princeton.edu/libraries/firestone/rbsc/finding_aids/mathoral/pmc43.htm Interview with Hassler Whitney about his experiences at Princeton]