The integrals of Lebesgue, Denjoy, Perron, and Henstock / Russel A. Gordon

Auteur: Gordon, Russell A. (1955-) - AuteurType de document: MonographieCollection: Graduate studies in mathematics ; 4Langue: anglaisPays: Etats UnisÉditeur: Providence : American Mathematical Society, 1994Description: 1 vol. (XI-395 p.) ; 26 cm ISBN: 0821838059 ; rel. Résumé: The Denjoy-Perron-Henstock integral is an extension of the Lebesgue integral which integrates the derivatives. The author gives an elementary account of the theory via Lebesgue measure. The approach is entirely classical and confined to functions defined on a compact interval on the real line. The author begins with the Lebesgue theory, develops each of the three extensions separately, and proves their equivalence and various properties including integration by parts and convergence theorems. The general Denjoy (Khintchine) integral and the approximately continuous Perron (AP) integral of Burkill are also included. Furthermore, the book has a chapter on Darboux functions and it contains a result of Tolstov on the AP integral which is not easily available elsewhere. The two problems left open in the book on convergence theorems and the approximately continuous Denjoy integral have been completely answered in S. Lu and K. Liao [Real Anal. Exch. 16, No. 1, 74-78 (1991; Zbl 0744.26009)] and K. Liao and T.-S. Chew [Real Anal. Exch. 19, No. 1, 81-97 (1994; Zbl 0802.26005)], respectively. (Zentralblatt).Bibliographie: Bibliogr. p. 389-390. Index. Sujets MSC: 26A39 Real functions -- Functions of one variable -- Denjoy and Perron integrals, other special integrals
26A42 Real functions -- Functions of one variable -- Integrals of Riemann, Stieltjes and Lebesgue type
26-02 Real functions -- Research exposition (monographs, survey articles)
28-02 Measure and integration -- Research exposition (monographs, survey articles)
En-ligne: Zentralblatt | MathSciNet | AMS
Location Call Number Status Date Due
Salle R 04281-01 / 26 GOR (Browse Shelf) Available

Bibliogr. p. 389-390. Index

The Denjoy-Perron-Henstock integral is an extension of the Lebesgue integral which integrates the derivatives. The author gives an elementary account of the theory via Lebesgue measure. The approach is entirely classical and confined to functions defined on a compact interval on the real line. The author begins with the Lebesgue theory, develops each of the three extensions separately, and proves their equivalence and various properties including integration by parts and convergence theorems. The general Denjoy (Khintchine) integral and the approximately continuous Perron (AP) integral of Burkill are also included. Furthermore, the book has a chapter on Darboux functions and it contains a result of Tolstov on the AP integral which is not easily available elsewhere. The two problems left open in the book on convergence theorems and the approximately continuous Denjoy integral have been completely answered in S. Lu and K. Liao [Real Anal. Exch. 16, No. 1, 74-78 (1991; Zbl 0744.26009)] and K. Liao and T.-S. Chew [Real Anal. Exch. 19, No. 1, 81-97 (1994; Zbl 0802.26005)], respectively. (Zentralblatt)

There are no comments for this item.

Log in to your account to post a comment.
Languages: English | Français | |