Stein held an NSF Postdoctoral Fellowship during 1955-56 and was appointed as an Instructor in Mathematics at the Massachusetts Institute of Technology in 1956. He held this position for two years during which time a whole series of his papers appeared in print: Interpolation of linear operators (1956), Functions of exponential type (1957), Interpolation in polynomial classes and Markoff's inequality (1957), Note on singular integrals (1957), (with G Weiss) On the inerpolation of analytic families of operators action on Hpspaces (1957), (with E H Ostrow) A generalization of lemmas of Marcinkiewicz and Fine with applications to singular integrals (1957), A maximal function with applications to Fourier series (1958), (with G Weiss) Fractional integrals on n-dimensional Euclidean space (1958), (with G Weiss) Interpolation of operators with change of measures (1958), Localization and summability of multiple Fourier series (1958), and On the functions of Littlewood-Paley, Luzin, Marcinkiewicz (1958).
In 1958 Stein returned to the University of Chicago where he was appointed as an Assistant Professor. In the following year, on 21 March 1959, he married Elly Intrator; they had a son Jeremy (who is now a professor of financial economics) and a daughter Karen. In 1961 Stein was promoted to Associate Professor at Chicago. Awarded an NSF Senior Postdoctoral Fellowship for 1962-63 and an Alfred P Sloan Foundation Fellowship for 1961-63, he spent 1962-63 at the Institute for Advanced Study at Princeton. He left his position in Chicago in 1963 when he was appointed as Professor of Mathematics at Princeton University. He has spent the rest of his career at Princeton where he was chairman of the Mathematics Department from 1968 to 1971 and again from 1985 to 1987, having spent 1984-85 at the Institute for Advanced Study supported by a Guggenheim Fellowship. He is now the Albert Baldwin Dodd Professor of Mathematics at Princeton.
Let us now give some indication of the remarkable contributions that Stein has made to harmonic analysis :-
Elias Stein has shaped the field of mathematical analysis and has changed the way mathematicians approach problems in nearly every subarea of the field. He was among the first to appreciate the interplay among partial differential equations, classical Fourier analysis, several complex variables and representation theory. He was the first to perceive the fundamental insights in each field arising from that interplay. Stein is the world's leading authority in harmonic analysis. Stein and colleagues introduced a generalization of analytic functions in higher dimensions known as Hp-spaces. This theory led to important connections between harmonic analysis and probability theory, and facilitated the solution of numerous problems. In his studies, he also showed the power of using square functions to control error terms, a technique that he invented and that is now fundamental in harmonic analysis.To gain some understanding of his work we look at some of the books he has written and the citations from some of the many awards he has been given for his leading contributions. He published two books in 1970, one being Topics in harmonic analysis related to the Littlewood-Paley theory. Here are extracts from a review by R E Edwards:-
Considerable portions of the theory of Fourier series and integrals are known to extend to various categories of topological groups. This book is concerned with one of the more elaborate and delicate extensions of this sort. In this case the starting point is aptly described as Littlewood-Paley theory, and the extension goes even beyond the group case. ... The author is to be congratulated on presenting in moderate space and detail an illuminating and stimulating picture of a complex topic, the more so since it is garnished with comments on open problems and some quite explicit suggestions for further research.Also in 1970 Stein published Singular integrals and differentiability properties of functions. This book was based on a course Intégrales singulières et fonctions différentiables de plusieurs variables which he had given at Orsay, Paris, in 1966-67. The book was published by Princeton University Press who, over 35 years later, described the work as follows:-
Singular integrals are among the most interesting and important objects of study in analysis, one of the three main branches of mathematics. They deal with real and complex numbers and their functions. In this book, Princeton professor Elias Stein, a leading mathematical innovator as well as a gifted expositor, produced what has been called the most influential mathematics text in the last thirty-five years. One reason for its success as a text is its almost legendary presentation: Stein takes arcane material, previously understood only by specialists, and makes it accessible even to beginning graduate students. Readers have reflected that when you read this book, not only do you see that the greats of the past have done exciting work, but you also feel inspired that you can master the subject and contribute to it yourself. Singular integrals were known to only a few specialists when Stein's book was first published. Over time, however, the book has inspired a whole generation of researchers to apply its methods to a broad range of problems in many disciplines, including engineering, biology, and finance.In 1984 Stein was awarded the American Mathematical Society's Leroy P Steele Prize for this book. This, however, was not the only Leroy P Steele Prize won by Stein for in 2002 he received the Leroy P Steele Prize for Lifetime Achievement. The citation reads :-
During a scientific career that spans nearly half a century, Eli Stein has made fundamental contributions to different branches of analysis. In harmonic analysis, his Interpolation Theorem is a ubiquitous tool. His result about the relation between the Fourier transform and curvature revealed a deep and unsuspected property and has far reaching consequences. His work on Hardy spaces has transformed the subject. He has made important contributions to the representation theory of Lie groups as well. His work on several complex variables is equally striking. His explicit approximate solutions for the ∂-problems made it possible to prove sharp regularity results for solutions in strongly pseudoconvex domains. In this connection he also obtained subelliptic estimates which sharpened and quantified Hörmander's hypoellipticity theorem for second order operators. Besides his contributions through his own research and excellent monographs, Stein has worked with and influenced many students, who have gone on to make profound contributions of their own.In reply Stein said :-
For more than a century there has been a significant and fruitful interaction between Fourier analysis, complex function theory, partial differential equations, real analysis, as well as ideas from other disciplines such as geometry and analytic number theory, etc. That this is the case has become increasingly clear, and the efforts and developments involved have, if anything, accelerated in the last twenty or thirty years. Having reached this stage, we can be confident that we are far from the end of this enterprise and that many exciting and wonderful theorems still await our discovery.Many other major prizes have been awarded to Stein. He received the von Humboldt Award (1989-90), the Schock Prize from the Swedish Academy of Sciences in 1993, the Wolf Prize in 1999, the United States National Medal of Science which was presented to him by President George Bush at a White House ceremony on 13 June 2002, and the Stefan Bergman Prize in 2005. We give a short quote from the citation for the last mentioned award :-
The Bergman prize is awarded to Elias M Stein in recognition of his work in real, complex, and harmonic analysis. Stein has made decisive contributions through his research, his expository efforts, and his training of graduate students. ... Stein's fusion of complex analysis, partial differential equations, analysis on nilpotent Lie groups, and Euclidean harmonic analysis has deeply influenced countless mathematicians. His ideas and techniques will continue to impact mathematics for years to come.In 2001, Princeton University awarded Stein its President's Award for Distinguished Teaching.
Let us return to looking at the outstanding books Stein has published. In 1971 Analytic continuation of group representations appeared based on a series of James Whittemore lectures that Stein had given at Yale University in November 1967. Also in 1971, in collaboration with Guido Weiss, Stein published Introduction to Fourier analysis on Euclidean spaces. Edwin Hewitt describes the book as "soundly conceived and brilliantly executed", ending his review with the words:-
This is a splendid book, destined, one hopes, to further the study of concrete analysis and to inspire further advances.Other books by Stein include: Boundary behavior of holomorphic functions of several complex variables (1992); (with P C Greiner) Estimates for the ∂-Neumann problem (1977); (with Alexander Nagel) Lectures on pseudodifferential operators: regularity theorems and applications to nonelliptic problems (1979); (with G B Folland) Hardy spaces on homogeneous groups (1982); Harmonic analysis: real-variable methods, orthogonality, and oscillatory integrals (1993) based on the three Milliman Lectures he gave in 1991-92; and (with Rami Shakarchi) Fourier analysis: An introduction (2003). Reviewing this last mention text, Steven George Krantz writes:-
E M Stein is certainly one of the great avatars and developers of Fourier analysis in modern times. R Shakarchi is a recent student of Charles Fefferman, so obviously is very well trained in the discipline. We are fortunate indeed that two such prominent exponents of one of the central parts of analysis have taken the time to write an instructional book of this kind. For this is not an entree to singular integrals, nor to pseudodifferential operators or paradifferential operators or wave front sets. It is instead a basic introduction to very classical topics of Fourier analysis. ... I look forward to reading and reviewing the next three books in this series (by the same authors). One of the exciting features of this collection is that it establishes many non-obvious connections among different parts of analysis (real analysis, complex analysis, Fourier analysis, and probability). It will be instructive for student and mentor alike. This first volume is a terrific beginning, and promises to stand as a classic for many years to come.The second in this three volume series Complex analysis was published in 2003 and the third volume Real analysis: Measure theory, integration, and Hilbert spaces in 2005. These texts also received rave reviews indicating they are all outstanding works written with remarkable clarity and care.
In addition to the prizes and awards we have mentioned above, Stein has been honoured with election to membership of the National Academy of Sciences (1974) and the American Academy of Arts and Sciences (1982). He has received honorary degrees from Peking University (1988) and the University of Chicago (1992).
Two of Stein's doctoral students, Charles Fefferman and Terence Tao, have won Fields medals. Fefferman said this of his thesis advisor :-
Stein's work often combines two remarkable qualities: an understanding of several branches of math, each of which normally is known only by specialists, and an astonishing ability to find connections between them. Before Stein tells you his solution, the problems involved look utterly hopeless. It looks as if there is no connection. Then, with exactly the right point of view and exactly the right few words, one sees incredible insights that link everything together and make obvious things that would have appeared to be totally impossible. He has done things like this over and over again.Stein's Princeton colleague Joseph Kohn said :-
Stein is one of the foremost experts in harmonic analysis in the world, and he has made stellar contributions to this field as well as related fields such as the theory of several complex variables and partial differential equations. He has had many students and collaborators; he has had a profound influence on a generation of mathematicians.
Article by: J J O'Connor and E F Robertson
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