
Ebook Info
- Published: 1999
- Number of pages: 306 pages
- Format: PDF
- File Size: 14.18 MB
- Authors: Maurice Mignotte
Description
A well-balanced presentation of the classic procedures of polynomial algebra that are computationally relevant. The first chapter discusses the construction and the representation of polynomials, while the second focuses on the computational aspects of their analytical theory. Polynomials with coefficients in a finite field are then described in chapter three, and the final chapter is devoted to factorisation with integral coefficients. Aimed primarily at graduates with a prerequisite knowledge of set theory, usual fields and basic algebra, the text contains fully worked out examples, hints and references, and details concerning the implementation of algorithms as well as indicators of their efficiency. XXXXXXX NEUER TEXT This is a well-balanced presentation of the classic procedures of polynomial algebra that are computationally relevant. Algorithms developed during the last decade are provided along with their implementation and indications of their efficiency. The construction, computational aspects, and factorization of polynomials are covered and will be useful to those working in computational mathematics, scientific computing, and the theory of computation.
User’s Reviews
Reviews from Amazon users which were colected at the time this book was published on the website:
⭐
⭐
⭐
⭐
⭐
Keywords
Free Download Polynomials: An Algorithmic Approach (Discrete Mathematics and Theoretical Computer Science) in PDF format
Polynomials: An Algorithmic Approach (Discrete Mathematics and Theoretical Computer Science) PDF Free Download
Download Polynomials: An Algorithmic Approach (Discrete Mathematics and Theoretical Computer Science) 1999 PDF Free
Polynomials: An Algorithmic Approach (Discrete Mathematics and Theoretical Computer Science) 1999 PDF Free Download
Download Polynomials: An Algorithmic Approach (Discrete Mathematics and Theoretical Computer Science) PDF
Free Download Ebook Polynomials: An Algorithmic Approach (Discrete Mathematics and Theoretical Computer Science)