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Algebra for Symbolic Computation de Antonio Machi

Algebra for Symbolic Computation: UNITEXT

Autor Antonio Machi
en Limba Engleză Paperback – 16 mar 2012
This book deals with several topics in algebra useful for computer science applications and the symbolic treatment of algebraic problems, pointing out and discussing their algorithmic nature. The topics covered range from classical results such as the Euclidean algorithm, the Chinese remainder theorem, and polynomial interpolation, to p-adic expansions of rational and algebraic numbers and rational functions, to reach the problem of the polynomial factorisation,  especially via Berlekamp’s method, and the discrete Fourier transform. Basic algebra concepts are revised in a form suited for implementation on a computer algebra system.
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Specificații

ISBN-13: 9788847023963
ISBN-10: 8847023963
Pagini: 174
Ilustrații: VIII, 180 p.
Greutate: 0.27 kg
Ediția:2012
Editura: Springer
Colecția Springer
Seriile UNITEXT, La Matematica per il 3+2

Locul publicării:Milano, Italy

Public țintă

Upper undergraduate

Cuprins

The Euclidean algorithm, the Chinese remainder theorem and interpolation.- p-adic series expansion.- The resultant.- Factorisation of polynomials.- The discrete Fourier transform.

Recenzii

From the reviews:
“The contents of this book is classical. … Many examples illustrate the text and make the mathematical objects very concrete. There are also many practical exercises. … It is clear that a thorough comprehension of these subjects would be greatly simplified if it is accompanied by exercises at the computer. Many examples of algorithms are given in the text, others may be easily deduced from the theory. … this book will be very useful and is very pleasant to read.” (Maurice Mignotte, Zentralblatt MATH, Vol. 1238, 2012)

Textul de pe ultima copertă

This book deals with several topics in algebra useful for computer science applications and the symbolic treatment of algebraic problems, pointing out and discussing their algorithmic nature. The topics covered range from classical results such as the Euclidean algorithm, the Chinese remainder theorem, and polynomial interpolation, to p-adic expansions of rational and algebraic numbers and rational functions, to reach the problem of the polynomial factorisation,  especially via Berlekamp’s method, and the discrete Fourier transform. Basic algebra concepts are revised in a form suited for implementation on a computer algebra system.

Caracteristici

It provides a good way of revising abstract concepts learnt in algebra courses It shows the algorithmic nature of many concepts and theorems It allows the reader to test his/her knowledge of the computer algebra systems Includes supplementary material: sn.pub/extras