Mathematics Mechanization and Applications
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Mathematics Mechanization and Applications

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Description

Mathematics Mechanization and Applications provides a uniform presentation of major developments, carried out mostly in Wu's extended Chinese group, on algorithms and software tools for mechanizing algebraic equations solving and geometric theorem proving together with their applications to problems in science and engineering. It is distinguished by its uniform presentation with all-Chinese contributors and a 40-page list of references. There are 20 chapters written by experienced researchers. The book is divided into four parts: polynomial system solving, automated geometric reasoning, algebraic computation, and implementations and applications. Each chapter is devoted to surveying and expounding the main results achieved from one selected subject. The book contains surveys for diverse applications of the theories and methods to real world problems, ranging from the analysis of robotics and mechanisms to nonlinear programming and chemical equilibrium computation. Part of the theoretical and practical work reviewed in the book has been either unpublished or published only in Chinese journals or even only in the Chinese language. This book therefore provides Western readers working in symbolic and algebraic computation, geometric reasoning and modeling, algorithmic mathematics, robotics, CAGD, and other relevant areas with an easily accessible source of references for what the Chinese researchers have been doing under the banner of mathematics mechanization.
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Product details

  • Hardback | 551 pages
  • 175 x 252.7 x 37.1mm | 1,224.2g
  • Academic Press Inc
  • San Diego, United States
  • English
  • New.
  • 0127347607
  • 9780127347608

Review quote

"An outstanding feature of the book is the great variety and diversity of
the material treated, together with the brevity, lucidity, and simplicity with which the leading ideas are presented. Another distinct, very appealing feature is the brief comparison of the philosophical ideas underlying the approaches undertaken by ancient Greek mathematicians and their contemporary Chinese pairs. The book is an indispensable reference to the workers actively engaged in symbolic computation, be it in mathematics, robotics, CAD, computer vision, non-linear optimization, theoretic physics, chemical equilibrium, celestial mechanics. It can also be strongly recommended to the``disengaged" mathematician who wishes to become familiar with an important and active research area."
Zentralblatt MATH - the journal of the European Mathmatical Society.
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Table of contents

Preface. List of Contributors. Polynomial System Solving: W. Wu, The Characteristic Set Method and Its Application. D. Wang, Some Algorithms for Zero Decomposition of Polynomial Systems. S. Zhang, G. Feng, The Eigenvalue Approach to Polynomial System. S.Wang, K. Wu, Solving the Yang-Baxter Equation by Wu's Method. Automated Geometric Reasoning: S. Chou, D. Lin, Wu's Method for Automated Geometry Theorem Proving and Discovering. H. Li, Mechanical Theorem Proving in Differential Geometry. J. Zhang, Points Elimination Methods for Geometric Problem Solving. H. Li, Clifford Algebra Approaches to Mechanical Geometry Theorem Proving. X. Hou, Proving by Examples. X. Gao, Search Methods Revisited. J. Wu, First-Order Polynomial Based Theorem Proving. Algebraic Computation: Z. Li, Greatest Common Right Divisors, Least Common Left Multiples, and Subresultants of Ore Polynomials. L. Zhi, Algebraic Factorization and GCD Computation. X. Gao, Conversion Between Implicit and Parametric Representations of Algebraic Varieties. Implementations and Applications: Z. Lu, S. Ma, Centers, Foci, and Limit Cycles for Polynomial Differential Systems. Z. Li, Exact Solitary Wave Solutions of Non-linear Evolution Equations. H. Zhang, E. Fan, Applications of Mechanical Methods to Partial Differential Equations. Q. Liao, Equation Solving in Robotics and Mechanisms. G. Feng, H. Ren, Y. Zhou, Blending Several Implicit Algebraic Surfaces. S. Chou, X. Gao, Z. Liu, D-K Wang, D. Wang, Geometric Theorem Provers and Algebraic Equation Solvers. References. Index.
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About Dongming Wang

Dongming Wang has been a senior researcher at CNRS since 1992. He is recognized for his work and expertise on automated geometric reasoning, elimination methods, and applications of symbolic computation to differential equations and neural networks. Xiao-Shan Gao received his Ph.D. from Academia Sinica in 1988 and worked as a research scientist at the University of Texas at austin from 1988 to 1990, and at Wichita State University from 1992 to 1996. He has been a research professor at Academia Sinica since 1997. His major research interests include automated geometric reasoning, polynomial system and geometric constraint solving, and intelligent computer-aided design and instruction.
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