The Theory and Applications of Iteration Methods 2nd Edition by Argyros 0367651017 9780367651015

The Theory and Applications of Iteration Methods 2nd Edition Argyros – Ebook Instant Download/Delivery ISBN(s): 9780367651015,0367651017

Product details:

• ISBN 10:0367651017
• ISBN 13: 9780367651015
• Author:Argyros, Ioannis K.

The Theory and Applications of Iteration Methods focuses on an abstract iteration scheme that consists of the recursive application of a point-to-set mapping. Each chapter presents new theoretical results and important applications in engineering, dynamic economic systems, and input-output systems. At the end of each chapter, case studies and numerical examples are presented from different fields of engineering and economics.

Table contents:

Chapter 1 The Convergence of Algorithmic Models
Chapter 2 The Convergence of Iteration Sequences
Chapter 3 Monotone Convergence
Chapter 4 Applications in:
Chapter 5 A Novel Scheme Free from Derivatives
Chapter 6 Efficient Sixth Convergence Order Method
Chapter 7 High-Order Iterative Methods
Chapter 8 Step Solvers
Chapter 9 Ball Comparison Between Three Sixth-Order Methods
Chapter 10 Constrained Generalized Equations
Chapter 11 Inexact Gauss–Newton Method for Solving Least Squares Problems
Chapter 12 The Kantorovich’s Theorem on Newton’s Method for Solving Generalized Equation
Chapter 13 An Inverse Free Broyden’s Method
Chapter 14 Complexity of a Homotopy Method for Locating an Approximate Zero
Chapter 15 Inexact Methods for Finding Zeros with Multiplicity
Chapter 16 Multi-Step High Convergence Order Methods
Chapter 17 Two-Step Gauss-Newton Werner-Type Method for Least Squares Problems
Chapter 18 Convergence for m−Step Iterative Methods
Chapter 19 Convergence of Newton’s Method on Lie Groups
Chapter 20 The Convergence Region of m-Step Iterative Procedures
Chapter 21 Efficient Eighth Order Method in Banach Spaces Under Weak ω – Conditions
Chapter 22 Schröder-Like Methods for Multiple Roots
Chapter 23 Gauss-Newton Solver for Systems of Equations
Chapter 24 High-Order Iterative Schemes Under Kantorovich Hypotheses
Chapter 25 Semi-Local Convergence of a Derivative Free Method
Chapter 26 A new Higher-Order Iterative Scheme for the Solutions of N

People also search:

the iterative process

what is an iteration in math

what is an iterative approach in project management

what is an iterative approach

a theoretical approach