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Download Introduction to Integration (Oxford Science Publications) eBook

by H. A. Priestley

Download Introduction to Integration (Oxford Science Publications) eBook
ISBN:
0198501242
Author:
H. A. Priestley
Category:
Mathematics
Language:
English
Publisher:
Oxford University Press (December 4, 1997)
Pages:
320 pages
EPUB book:
1482 kb
FB2 book:
1945 kb
DJVU:
1519 kb
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Rating:
4.1
Votes:
282


Series: Oxford Science Publications. Paperback: 320 pages.

Series: Oxford Science Publications.

H. A. Priestley, Reader in Mathematics, University of Oxford. Introduction to Integration.

The book begins with a simplified Lebesgue-style integral (in lieu of the more traditional Riemann integral), intended for a first course in integration. This suffices for elementary applications, and serves as an introduction to the core of the book. H.

Introduction to Integration Oxford Science Publications.

Intended as a first course in integration theory for students familiar with real analysis, the book begins with a simplified Lebesgue integral, which is then developed to provide an entry point for important results in the field. The final chapters present selected applications, mostly drawn from Fourier analysis. The emphasis throughout is on integrable functions rather than on measures. Designed as an undergraduate or graduate textbook, it is a companion volume to the author's Introduction to Complex Analysis and is aimed at both pure and applied mathematicians. Priestley, Lecturer in Mathematics, University of Oxford and Fellow of St Anne's College.

Introduction to Integration book. Paperback, 320 pages. Published September 28th 1997 by OUP Oxford.

If one wants to give an overview of political science, then this i. .Cite this publication.

4. Integrals of step functions. 5. Continuous functions on compact intervals. 6. Techniques of integration I.

Priestley: Introduction to Complex Analysis. 4. 7. Approximations. 8. Uniform convergence and power series.

Introduction to Integration provides a unified account of integration theory, giving a practical guide to the Lebesgue integral and its uses, with a wealth of examples and exercises. Intended as a first course in integration theory for students familiar with real analysis, the book begins with a simplified Lebesgue integral, which is then developed to provide an entry point for important results in the field. The final chapters present selected applications, mostly drawn from Fourier analysis. The emphasis throughout is on integrable functions rather than on measures. Designed as an undergraduate or graduate textbook, it is a companion volume to the author's Introduction to Complex Analysis and is aimed at both pure and applied mathematicians.