Overview

The theory of difference equations is now enjoying a period of Renaissance. Witness the large number of papers in which problems, having at first sight no common features, are reduced to the investigation of subsequent iterations of the maps f· IR. m ~ IR. m, m > 0, or (which is, in fact, the same) to difference equations The world of difference equations, which has been almost hidden up to now, begins to open in all its richness. Those experts, who usually use differential equations and, in fact, believe in their universality, are now discovering a completely new approach which re­ sembles the theory of ordinary differential equations only slightly. Difference equations, which reflect one of the essential properties of the real world-its discreteness-rightful­ ly occupy a worthy place in mathematics and its applications. The aim of the present book is to acquaint the reader with some recently discovered and (at first sight) unusual properties of solutions for nonlinear difference equations. These properties enable us to use difference equations in order to model complicated os­ cillating processes (this can often be done in those cases when it is difficult to apply ordinary differential equations). Difference equations are also a useful tool of syn­ ergetics- an emerging science concerned with the study of ordered structures. The application of these equations opens up new approaches in solving one of the central problems of modern science-the problem of turbulence.

Full Product Details

Author:   A.N. Sharkovsky ,  Y. L. Maistrenko ,  E.Yu Romanenko
Publisher:   Springer
Imprint:   Springer
Edition:   Softcover reprint of the original 1st ed. 1993
Volume:   250
Dimensions:   Width: 16.00cm , Height: 2.00cm , Length: 24.00cm
Weight:   0.600kg
ISBN:  

9789401047746

ISBN 10:   940104774
Pages:   358
Publication Date:   29 October 2012
Audience:   Professional and scholarly ,  Professional & Vocational
Format:   Paperback
Publisher's Status:   Active
Availability:   Manufactured on demand  
We will order this item for you from a manufactured on demand supplier.

Table of Contents

I. One-Dimensional Dynamical Systems.- 1. Introduction to the Theory of Dynamical Systems.- 2. Periodic Trajectories.- 3. Behavior of Trajectories.- 4. Dynamical Systems for U-Maps.- II. Difference Equations with Continuous Time.- 1. Nonlinear Difference Equations.- 2. Difference Equations with U-Nonlinearity.- III. Differential-Difference Equations.- 1. Completely Integrable Differential-Difference Equations.- 2. Differential-Difference Equations Close To Difference Ones.- 3. Singularly Perturbed Differential-Difference Equations.- IV. Boundary-Value Problems for Hyperbolic Systems of Partial Differential Equations.- 1. Reduction of Boundary-Value Problems to Difference and Differential-Difference Equations.- 2. Boundary-Value Problem for a System with Small Parameter.- 3. Boundary-Value Problem for Systems with Two Spatial Variables.- References.

Reviews

' I enjoyed reading this book, and i am happy to recommend it to all those interested in finding out more about this fascinating but rather unfamiliar branch of dynamical systems.' Bulletin London Math. Soc. 27 1995

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