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Robert Ralph Phelps (March 22, 1926 – January 4, 2013) was an American mathematician who was known for his contributions to analysis, particularly to functional analysis and measure theory. He was a professor of mathematics at the University of Washington from 1962 until his death.

Robert R. Phelps
Phelps's head and upper torso—Mens sana in corpore sano
Born(1926-03-22)March 22, 1926
DiedJanuary 4, 2013(2013-01-04) (aged 86)
NationalityAmerican
Alma materUniversity of Washington
Known for
SpouseElaine Phelps[3]
Scientific career
Fields
InstitutionsUniversity of Washington
Doctoral advisorVictor L. Klee[1]

Biography

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Phelps wrote his dissertation on subreflexive Banach spaces under the supervision of Victor Klee in 1958 at the University of Washington.[1] Phelps was appointed to a position at Washington in 1962.[4]

In 2012 he became a fellow of the American Mathematical Society.[5]

He was a convinced atheist.[6]

Research

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With Errett Bishop, Phelps proved the Bishop–Phelps theorem, one of the most important results in functional analysis, with applications to operator theory, to harmonic analysis, to Choquet theory, and to variational analysis. In one field of its application, optimization theory, Ivar Ekeland began his survey of variational principles with this tribute:

The central result. The grandfather of it all is the celebrated 1961 theorem of Bishop and Phelps ... that the set of continuous linear functionals on a Banach space E which attain their maximum on a prescribed closed convex bounded subset XE is norm-dense in E*. The crux of the proof lies in introducing a certain convex cone in E, associating with it a partial ordering, and applying to the latter a transfinite induction argument (Zorn's lemma).[7]

Phelps has written several advanced monographs, which have been republished. His 1966 Lectures on Choquet theory was the first book to explain the theory of integral representations.[8] In these "instant classic" lectures, which were translated into Russian and other languages, and in his original research, Phelps helped to lead the development of Choquet theory and its applications, including probability, harmonic analysis, and approximation theory.[9][10][11] A revised and expanded version of his Lectures on Choquet theory was republished as Phelps (2002).[11]

Phelps has also contributed to nonlinear analysis, in particular writing notes and a monograph on differentiability and Banach-space theory. In its preface, Phelps advised readers of the prerequisite "background in functional analysis": "the main rule is the separation theorem (a.k.a. [also known as] the Hahn–Banach theorem): Like the standard advice given in mountaineering classes (concerning the all-important bowline for tying oneself into the end of the climbing rope), you should be able to employ it using only one hand while standing blindfolded in a cold shower."[12] Phelps has been an avid rock-climber and mountaineer. Following the trailblazing research of Asplund and Rockafellar, Phelps hammered into place the pitons, linked the carabiners, and threaded the top rope by which novices have ascended from the frozen tundras of topological vector spaces to the Shangri-La of Banach space theory. His University College, London (UCL) lectures on the Differentiability of convex functions on Banach spaces (1977–1978) were "widely distributed". Some of Phelps's results and exposition were developed in two books,[13] Bourgin's Geometric aspects of convex sets with the Radon-Nikodým property (1983) and Giles's Convex analysis with application in the differentiation of convex functions (1982).[10][14] Phelps avoided repeating the results previously reported in Bourgin and Giles when he published his own Convex functions, monotone operators and differentiability (1989), which reported new results and streamlined proofs of earlier results.[13] Now, the study of differentiability is a central concern in nonlinear functional analysis.[15][16] Phelps has published articles under the pseudonym of John Rainwater.[17]

Selected publications

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  • Bishop, Errett; Phelps, R. R. (1961). "A proof that every Banach space is subreflexive". Bulletin of the American Mathematical Society. 67: 97–98. doi:10.1090/s0002-9904-1961-10514-4. MR 0123174.
  • Phelps, Robert R. (1993) [1989]. Convex functions, monotone operators and differentiability. Lecture Notes in Mathematics. Vol. 1364 (2nd ed.). Berlin: Springer-Verlag. pp. xii+117. ISBN 3-540-56715-1. MR 1238715.
  • Phelps, Robert R. (2001). Phelps, Robert R (ed.). Lectures on Choquet's theorem. Lecture Notes in Mathematics. Vol. 1757 (Second edition of 1966 ed.). Berlin: Springer-Verlag. pp. viii+124. doi:10.1007/b76887. ISBN 3-540-41834-2. MR 1835574.
  • Namioka, I.; Phelps, R. R. (1975). "Banach spaces which are Asplund spaces". Duke Math. J. 42 (4): 735–750. doi:10.1215/s0012-7094-75-04261-1. hdl:10338.dmlcz/127336. ISSN 0012-7094.

Notes

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  1. ^ a b Robert Phelps at the Mathematics Genealogy Project
  2. ^ Robert R. "Bob" Phelps Obituary
  3. ^ Page 21: Gritzmann, Peter; Sturmfels, Bernd (April 2008). "Victor L. Klee 1925–2007" (PDF). Notices of the American Mathematical Society. 55 (4). Providence, RI: American Mathematical Society: 467–473. ISSN 0002-9920.
  4. ^ University of Washington description of Phelps
  5. ^ List of Fellows of the American Mathematical Society, retrieved 2013-05-05.
  6. ^ "In Memoriam: Robert R. Phelps (1926-2013) « Math Drudge".
  7. ^ Ekeland (1979, p. 443)
  8. ^ Lacey, H. E. "Review of Gustave Choquet's (1969) Lectures on analysis, Volume III: Infinite dimensional measures and problem solutions". Mathematical Reviews. MR 0250013.
  9. ^ Asimow, L.; Ellis, A. J. (1980). Convexity theory and its applications in functional analysis. London Mathematical Society Monographs. Vol. 16. London-New York: Academic Press, Inc. [Harcourt Brace Jovanovich, Publishers]. pp. x+266. ISBN 0-12-065340-0. MR 0623459.
  10. ^ a b Bourgin, Richard D. (1983). Geometric aspects of convex sets with the Radon-Nikodým property. Lecture Notes in Mathematics. Vol. 993. Berlin: Springer-Verlag. pp. xii+474. doi:10.1007/BFb0069321. ISBN 3-540-12296-6. MR 0704815.
  11. ^ a b Rao (2002)
  12. ^ Page iii of the first (1989) edition of Phelps (1993).
  13. ^ a b Nashed (1990)
  14. ^ Giles, John R. (1982). Convex analysis with application in the differentiation of convex functions. Research Notes in Mathematics. Vol. 58. Boston, Mass.-London: Pitman (Advanced Publishing Program). pp. x+278. ISBN 0-273-08537-9. MR 0650456.
  15. ^ Lindenstrauss, Joram and Benyamini, Yoav. Geometric nonlinear functional analysis Colloquium publications, 48. American Mathematical Society.
  16. ^ Mordukhovich, Boris S. (2006). Variational analysis and generalized differentiation I and II. Grundlehren Series (Fundamental Principles of Mathematical Sciences). Vol. 331. Springer. MR 2191745.
  17. ^ Phelps, Robert R. (2002). Melvin Henriksen (ed.). "Biography of John Rainwater". Topological Commentary. 7 (2). arXiv:math/0312462. Bibcode:2003math.....12462P.

References

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External resources

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