Now, a solid foundation in the theory and technique of asymptotic expansion of integrals is of the principles and methods of asymptotic expansions of integrals. Coherent, systematic coverage of standard methods: integration by parts, Watson’s lemma, LaPlace’s method, stationary phase and steepest descents. ods used for finding the asymptotic expansion of integrals. M. Bender and Steven A. Orszag, [5] by Norman Bleistein and Richard A. Han-.

Author: | Gojar Shakatilar |

Country: | Equatorial Guinea |

Language: | English (Spanish) |

Genre: | Love |

Published (Last): | 2 June 2008 |

Pages: | 116 |

PDF File Size: | 19.92 Mb |

ePub File Size: | 12.2 Mb |

ISBN: | 409-3-34090-447-4 |

Downloads: | 25100 |

Price: | Free* [*Free Regsitration Required] |

Uploader: | Mujar |

### Asymptotic Expansions of Integrals

Each chapter is carefully illustrated with helpful diagrams and tables. General Theory of Functions and Integration. Handelsman Courier Corporation- Mathematics – pages 0 Reviews https: Practiced users of asymptotics will find the work a valuable reference with an extensive index locating all the functions covered in the text and every formula associated with the major techniques.

Now, a solid foundation in the theory and technique of asymptotic expansion of integrals is at the heart of the education of every student concentrating in applied mathematics. Each chapter is carefully illustrated with helpful diagrams and tables.

Now, a solid foundation in the theory and technique of asymptotic expansion of integrals is at the heart of the education of every student concentrating in applied mathematics. Asymptotic expansions of integrals Norman BleisteinRichard A.

Students will find each of the nine chapters useful and easy to comprehend; each begins with elementary material or informal introductions untegrals concludes with an abundant selection of applicable problems and exercises.

My library Help Advanced Book Search.

## Asymptotic Expansions of Integrals

It is also an invaluable asset to scientists in many other fields. An Introduction to Fourier Series and Integrals.

Norman BleisteinRichard A. Subjects include integration by parts, Watson’s lemma, Laplace’s method, asmyptotic phase, and steepest descents.

Asymptotic analysis, that branch of mathematics devoted to the study of the behavior of functions within chosen limits, was once thought of more as a specialized art than a necessary discipline. Norman BleisteinRichard A, Handelsman. Subjects include integration by parts, Watson’s lemma, Laplace’s method, stationary phase, and steepest descents.

Asymptotic Expansions of Integrals By: Boundary Value Problems and Fourier Expansions. Unabridged, corrected Dover republication of the edition published by Holt, Rinehart and Winston, New York, Chebyshev and Fourier Spectral Methods: Product Description Product Details Asymptotic analysis, that branch of mathematics devoted to the study of the behavior of functions within chosen limits, was once thought of more as a specialized art than a necessary discipline.

Also treated are the Mellin transform method and less elementary aspects of steepest descent.

Used for years as a text in integals throughout the country, the book has been revised and corrected for this inexpensive paperback edition. Account Options Sign in. It is also an invaluable asset to scientists in many other fields.

Approximate Calculation of Integrals. Handelsman Limited preview – Handelsman Snippet view – Introduction to Bessel Functions.

### Asymptotic Expansions of Integrals – Norman Bleistein, Richard A. Handelsman – Google Books

Practiced users of asymptotics will find the work a valuable reference with an extensive index locating all the functions covered in the text and every formula associated with the major techniques. Also treated are the Mellin transform method and less elementary aspects of steepest descent.

All that is needed is a basic understanding of calculus, differential equations, and complex variables. All that is needed is a basic understanding of calculus, differential equations, and complex variables. This excellent introductory text, written by two experts in the field, offers students of applied mathematics — and researchers and workers in other fields — a coherent and systematic presentation of the principles and methods of asymptotic expansions of integrals.

Any student or teacher looking for a suitable text for a year’s or semester’s course in asymptotics will value this affordable volume as the only comprehensive introduction available; scientists and researchers will undoubtedly refer to it again and again.

Students will find each of the nine chapters useful and easy to comprehend; each begins with elementary material or informal introductions and concludes with an abundant selection of applicable problems and exercises.