Numerical Methods for Equations and its Applications

Title: Numerical Methods for Equations and its Applications
Author: Ioannis K. Argyros, Said Hilout, Yeol J. Cho
ISBN: 1578087538 / 9781578087532
Format: Hard Cover
Pages: 474
Publisher: Taylor & Francis
Year: 2012
Availability: Out of Stock

Tab Article

This book introduces advanced numerical-functional analysis to beginning computer science researchers. The reader is assumed to have had basic courses in numerical analysis, computer programming, computational linear algebra, and an introduction to real, complex, and functional analysis. Although the book is of a theoretical nature, each chapter contains several new theoretical results and important applications in engineering, in dynamic economics systems, in input-output system, in the solution of nonlinear and linear differential equations, and optimization problem.

Tab Article

Preface

Chapter 1 : Introduction

Part I : Newton’s Method
Chapter 2 :
Convergence Under Fréchet Differentiability
Chapter 3 : Convergence Under Twice Fréchet Differentiability
Chapter 4 : Newton’s Method on Unbounded Domains
Chapter 5 : Continuous Analog of Newton’s Method
Chapter 6 : Interior Point Techniques
Chapter 7 : Regular Smoothness
Chapter 8 : Ω-Convergence
Chapter 9 : Semilocal Convergence and Convex Majorants
Chapter 10 : Local Convergence and Convex Majorants
Chapter 11 : Majorizing Sequences

Part II : Secant Method
Chapter 12 :
Convergence
Chapter 13 : Least Squares Problems
Chapter 14 : Nondiscrete Induction and Secant Method
Chapter 15 : Nondiscrete Induction and a Double Step Secant Method
Chapter 16 : Directional Secant Methods
Chapter 17 : Efficient Three Step Secant Methods

Part III : Steffensen’s Method
Chapter 18 :
Convergence

Part IV : Gauss-Newton Method
Chapter 19 :
Convergence
Chapter 20 : Average-Lipschitz Conditions

Part V : Newton-Type Methods
Chapter 21 :
Convergence With Outer Inverses
Chapter 22 : Convergence of a Moser-Type Method
Chapter 23 : Convergence With Slantly Differentiable Operator
Chapter 24 : A Intermediate Newton Method

Part VI : Inexact Methods
Chapter 25 :
Residual Control Conditions
Chapter 26 : Average Lipschitz Conditions
Chapter 27 : Two-Step Methods
Chapter 28 : Zabrejko-Zincenko-Type Conditions

Part VII : Werner’s Method
Chapter 29 :
Convergence Analysis

Part VIII : Halley’s Method
Chapter 30 :
Local Convergence

Part IX : Methods For Variational Inequalities
Chapter 31 :
Subquadratic Convergent Method
Chapter 32 : Convergence Under Slant Condition
Chapter 33 : Newton-Josephy Method

Part X : Fast Two-Step Methods
Chapter 34 :
Semilocal Convergence

Part XI : Fixed Point Methods
Chapter 35 :
Successive Substitutions Methods

Index