Difference Equations in Normed Spaces, Volume 206 在線電子書 pdf 下載 txt下載 epub 下載 mobi 下載 2024


Difference Equations in Normed Spaces, Volume 206

簡體網頁||繁體網頁
Michael Gil 作者
Elsevier Science Ltd
譯者
2007-3 出版日期
378 頁數
924.00元 價格
HRD
North-Holland Mathematics Studies 叢書系列
9780444527134 圖書編碼

Difference Equations in Normed Spaces, Volume 206 在線電子書 圖書標籤:  


喜歡 Difference Equations in Normed Spaces, Volume 206 在線電子書 的讀者還喜歡




點擊這裡下載
    


想要找書就要到 圖書目錄大全
立刻按 ctrl+D收藏本頁
你會得到大驚喜!!

發表於2024-11-11

Difference Equations in Normed Spaces, Volume 206 在線電子書 epub 下載 mobi 下載 pdf 下載 txt 下載 2024

Difference Equations in Normed Spaces, Volume 206 在線電子書 epub 下載 pdf 下載 mobi 下載 txt 下載 2024

Difference Equations in Normed Spaces, Volume 206 在線電子書 pdf 下載 txt下載 epub 下載 mobi 下載 2024



Difference Equations in Normed Spaces, Volume 206 在線電子書 用戶評價

評分

評分

評分

評分

評分

Difference Equations in Normed Spaces, Volume 206 在線電子書 著者簡介


Difference Equations in Normed Spaces, Volume 206 在線電子書 著者簡介


Difference Equations in Normed Spaces, Volume 206 在線電子書 pdf 下載 txt下載 epub 下載 mobi 在線電子書下載

Difference Equations in Normed Spaces, Volume 206 在線電子書 圖書描述

在綫閱讀本書

Many problems for partial difference and integro-difference equations can be written as difference equations in a normed space. This book is devoted to linear and nonlinear difference equations in a normed space. Our aim in this monograph is to initiate systematic investigations of the global behavior of solutions of difference equations in a normed space. Our primary concern is to study the asymptotic stability of the equilibrium solution. We are also interested in the existence of periodic and positive solutions. There are many books dealing with the theory of ordinary difference equations. However there are no books dealing systematically with difference equations in a normed space. It is our hope that this book will stimulate interest among mathematicians to develop the stability theory of abstract difference equations. Note that even for ordinary difference equations, the problem of stability analysis continues to attract the attention of many specialists despite its long history. It is still one of the most burning problems, because of the absence of its complete solution, but many general results available for ordinary difference equations (for example, stability by linear approximation) may be easily proved for abstract difference equations. The main methodology presented in this publication is based on a combined use of recent norm estimates for operator-valued functions with the following methods and results: a) the freezing method; b) the Liapunov type equation; c) the method of majorants; d) the multiplicative representation of solutions. In addition, we present stability results for abstract Volterra discrete equations. The book consists of 22 chapters and an appendix. In Chapter 1, some definitions and preliminary results are collected. They are systematically used in the next chapters. In, particular, we recall very briefly some basic notions and results of the theory of operators in Banach and ordered spaces. In addition, stability concepts are presented and Liapunov's functions are introduced. In Chapter 2 we review various classes of linear operators and their spectral properties. As examples, infinite matrices are considered. In Chapters 3 and 4, estimates for the norms of operator-valued and matrix-valued functions are suggested. In particular, we consider Hilbert-Schmidt, Neumann-Schatten, quasi-Hermitian and quasiunitary operators. These classes contain numerous infinite matrices arising in applications. In Chapter 5, some perturbation results for linear operators in a Hilbert space are presented. These results are then used in the next chapters to derive bounds for the spectral radiuses. Chapters 6-14 are devoted to asymptotic and exponential stabilities, as well as boundedness of solutions of linear and nonlinear difference equations. In Chapter 6 we investigate the linear equation with a bounded constant operator acting in a Banach space. Chapter 7 is concerned with the Liapunov type operator equation. Chapter 8 deals with estimates for the spectral radiuses of concrete operators, in particular, for infinite matrices. These bounds enable the formulation of explicit stability conditions. In Chapters 9 and 10 we consider nonautonomous (time-variant) linear equations. An essential role in this chapter is played by the evolution operator. In addition, we use the "freezing" method and multiplicative representations of solutions to construct the majorants for linear equations. Chapters 11 and 12 are devoted to semilinear autonomous and nonautonomous equations. Chapters 13 and 14 are concerned with linear and nonlinear higher order difference equations. Chapter 15 is devoted to the input-to-state stability. In Chapter 16 we study periodic solutions of linear and nonlinear difference equations in a Banach space, as well as the global orbital stability of solutions of vector difference equations. Chapters 17 and 18 deal with linear and nonlinear Volterra discrete equations in a Banach space. An important role in these chapter is played by operator pencils. Chapter 19 deals with a class of the Stieltjes differential equations. These equations generalize difference and differential equations. We apply estimates for norms of operator valued functions and properties of the multiplicative integral to certain classes of linear and nonlinear Stieltjes differential equations to obtain solution estimates that allow us to study the stability and boundedness of solutions. We also show the existence and uniqueness of solutions as well as the continuous dependence of the solutions on the time integrator. Chapter 20 provides some results regarding the Volterra--Stieltjes equations. The Volterra--Stieltjes equations include Volterra difference and Volterra integral equations. We obtain estimates for the norms of solutions of the Volterra--Stieltjes equation. Chapter 21 is devoted to difference equations with continuous time. In Chapter 22, we suggest some conditions for the existence of nontrivial and positive steady states of difference equations, as well as bounds for the stationary solutions.

- Deals systematically with difference equations in normed spaces - Considers new classes of equations that could not be studied in the frameworks of ordinary and partial difference equations - Develops the freezing method and presents recent results on Volterra discrete equations - Contains an approach based on the estimates for norms of operator functions

Difference Equations in Normed Spaces, Volume 206 在線電子書 下載 mobi epub pdf txt 在線電子書下載


想要找書就要到 圖書目錄大全
立刻按 ctrl+D收藏本頁
你會得到大驚喜!!

Difference Equations in Normed Spaces, Volume 206 在線電子書 讀後感

評分

評分

評分

評分

評分

類似圖書 點擊查看全場最低價

Difference Equations in Normed Spaces, Volume 206 在線電子書 pdf 下載 txt下載 epub 下載 mobi 下載 2024


分享鏈接





Difference Equations in Normed Spaces, Volume 206 在線電子書 相關圖書




本站所有內容均為互聯網搜索引擎提供的公開搜索信息,本站不存儲任何數據與內容,任何內容與數據均與本站無關,如有需要請聯繫相關搜索引擎包括但不限於百度google,bing,sogou

友情鏈接

© 2024 book.wenda123.org All Rights Reserved. 圖書目錄大全 版權所有