Hostname: page-component-586b7cd67f-t7czq Total loading time: 0 Render date: 2024-11-28T08:26:13.218Z Has data issue: false hasContentIssue false
  • English
  • Français

‘Intégrate, longueur, aire’ the centenary of the Lebesgue integral

Published online by Cambridge University Press:  01 August 2016

G. T. Q. Hoare  and
N. J. Lord
G. T. Q. Hoare
Affiliation:
3 Russett Hill, Chalfont St. Peter, Bucks SL9 8JY
N. J. Lord
Affiliation:
Tonbridge School, Kent TN9 1JP
Get access Rights & Permissions [Opens in a new window]

Extract

‘After Jordan came Lebesgue, and we enter on the subject of another Book’, declared Bourbaki. J.C. Burkill remarked in, ‘It cannot be doubted that (Lebesgue's thesis) is one of the finest which any mathematician has ever written.’ Loève in picturesquely sets the scene for us thus, ‘… the Archimedes of the extension (i.e. modern theory of measure) period was Henri Lebesgue. He took the decisive step in his thesis … . In fact contemporary (measure theory) still dances to Lebesgue's tunes.’ Arguably, before 1902, mathematicians had yet to develop a theory of integration; Lebesgue's great thesis of that year changed this state of affairs irrevocably. In it, difficulties which had begun to plague the Riemannn integral were swept away as Lebesgue boldly extended the concept of the integral by what later came to be regarded as a completion process as profound as that leading from the rational numbers to the reals. Lebesgue created no School but his influence on twentieth century mathematics was profound. In this article celebrating the centenary of Lebesgue's thesis, we look first at Lebesgue's life and then in more detail at his seminal work on integration.

Type
Articles
Information
The Mathematical Gazette , Volume 86 , Issue 505 , March 2002 , pp. 3 - 27
Copyright
Copyright © The Mathematical Association 2002

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

1. Félix, L. Message d’un mathématician: Henri Lebesgue pour le centenaire de sa naissance, A. Blanchard (1974).Google Scholar
2. Burkill, J. C. Lebesgue, Henri Obituary Notices of Fellows of the Royal Society 4 (1942–44) p. 484.Google Scholar
3. Loève, M. Integration and measure, Encyclopaedia Britannica (1965).Google Scholar
4. Lebesgue, H. Oeuvres scientifiques (5 volumes), L’Enseignement Mathématique (1972–73).Google Scholar
(Volume 1 contains a chronological list of all 165 of Lebesgue’s publications; we refer to the ninth listed as [4, CW9], etc.)Google Scholar
5. Bourbaki, N. (translated by Meldrum, J.), Elements of the history of mathematics, Springer (1994).Google Scholar
6. Royden, H. L. Real analysis (2nd edition), Collier Macmillan (1968).Google Scholar
7. Notice nécrologique sur M. Henri Lebesgue, Comptes rendus 213 (1941).Google Scholar
8. Lebesgue, H. Leçons sur l’intégration et la recherche des fonctions primitives, Gauthier-Villars (1904). (Also in [4, CW18].)Google Scholar
9. Lebesgue, H. Leçons sur l’intégration et la recherche des fonctions primitives (2nd edition), Gauthier-Villars (1928), reprinted by Chelsea (1973).Google Scholar
10. Lebesgue, H. edited by May, K. O. Measure and the integral, Holden-Day (1966).Google Scholar
(An edited translation of [9] with May’s biographical sketch of Lebesgue’s life.)Google Scholar
11. Gordon, R. A. The integrals of Lebesgue, Denjoy, Perron and Henstock, American Mathematical Society (1994).Google Scholar
12. Lebesgue, H. Leçons sur les séries trigonomètriques, Gauthier-Villars (1906).Google Scholar
13. Halmos, P. R. Measure theory, Springer (1974).Google Scholar
14. Mauldin, R. D. (editor), The Scottish Book: mathematics from the Scottish Café, Birkhä user (1981) pp. 1719.Google Scholar
15. Dieudonné, J. History of functional analysis, North-Holland (1981).Google Scholar
16. Naber, G. L. Topological methods in Euclidean spaces, Cambridge University Press (1980) pp. 4144.Google Scholar
17. Denjoy, A. Félix, L. and Montel, P. Henri Lebesgue, le savant, le professeur, l’homme, L’Enseignement Mathématique (1957).Google Scholar
18. van Rooij, A. C. M. and Schikhof, W. H. A second course on real functions, Cambridge University Press (1982).Google Scholar
19. Lusin, N. Leçons sur les ensembles analytiques et leurs applications, Gauthier-Villars (1930).Google Scholar
(Lebesgue’s Preface is reproduced in [4, CW117].)Google Scholar
20. Fitt, A. D. and Hoare, G. T. Q. The closed-form integration of arbitrary functions, Math. Gaz. 77 (July 1993) pp. 227236.Google Scholar
21. Laugwitz, D. (translated by Shenitzer, A.), Bernhard Riemann 1826–1866, Birkhä user (1999) chapter 2.Google Scholar
22. Hawkins, T. The origins of modern theories of integration, From the calculus to set theory 1630–1910, edited by Grattan-Guinness, I. Duckworth (1980) chapter 4.Google Scholar
23. Hawkins, T. Lebesgue’s theory of integration: its origins and development (2nd edition), Chelsea (1979).Google Scholar
24. Oxtoby, J. C. Measure and category (2nd edition), Springer (1980).Google Scholar
25. Boas, R. P. and Boas, H. P. A primer of real functions (4th edition), Mathematical Association of America (1996).Google Scholar
26. Stillwell, J. Mathematics and its history, Springer (1989) pp. 316320.Google Scholar
27. Burkill, J. C. The Lebesgue integral, Cambridge University Press (1975).Google Scholar
28. Riesz, F. and Sz.-Nagy, B. (translated by Boron, L. F.), Functional analysis, Dover (1990).Google Scholar
29. Hewitt, E. and Stromberg, K. Real and abstract analysis, Springer (1965).Google Scholar
30. Apóstol, T. M. Mathematical analysis (2nd edition), Addison-Wesley (1974).Google Scholar
31. Lorch, E. R. Szeged in 1934, Amer. Math. Monthly 100 (1993) pp. 219230.Google Scholar
32. Smithies, F. The shaping of functional analysis, Bulletin London Mathematical Society 29 (1997) pp.129138.CrossRefGoogle Scholar
33. Rudin, W. Real and complex analysis (2nd edition), McGraw-Hill (1974).Google Scholar
34. de Barra, G. Introduction to measure theory, Van Nostrand Reinhold (1974).Google Scholar