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The Theory of Differential Equations

Classical and Qualitative

  • Walter G. Kelley
  • Allan C. Peterson

Part of the Universitext book series (UTX, volume 0)

Table of contents

  1. Front Matter
    Pages i-xi
  2. Walter G. Kelley, Allan C. Peterson
    Pages 1-22
  3. Walter G. Kelley, Allan C. Peterson
    Pages 23-86
  4. Walter G. Kelley, Allan C. Peterson
    Pages 87-160
  5. Walter G. Kelley, Allan C. Peterson
    Pages 161-191
  6. Walter G. Kelley, Allan C. Peterson
    Pages 192-280
  7. Walter G. Kelley, Allan C. Peterson
    Pages 281-308
  8. Walter G. Kelley, Allan C. Peterson
    Pages 309-344
  9. Walter G. Kelley, Allan C. Peterson
    Pages 345-401
  10. Back Matter
    Pages 403-423

About this book

Introduction

For over 300 years, differential equations have served as an essential tool for describing and analyzing problems in many scientific disciplines. This carefully-written textbook provides an introduction to many of the important topics associated with ordinary differential equations. Unlike most textbooks on the subject, this text includes nonstandard topics such as a chapter on perturbation methods and a section in Chapter 3 that shows how to solve differential equations using Mathematica codes. In addition to the nonstandard topics, this text also contains contemporary material in the area as well as its classical topics. This second edition is updated to be compatible with Mathematica, version 7.0, and all Mathematica codes are in the book itself. This new edition also provides 81 additional exercises, a new section in Chapter 1 on the generalized logistic equation, an additional theorem in Chapter 2 concerning fundamental matrices, and many further enhancements to the first edition. This book can be used either for a second course in ordinary differential equations or as an introductory course for well-prepared students. The prerequisites for this book are three semesters of calculus and a course in linear algebra, although the needed concepts from linear algebra are introduced along with examples in the book. An undergraduate course in analysis is needed for the more theoretical subjects covered in the final two chapters.

Keywords

BVP Banach fixed-point theorem Boundary value problem Floquet theory Mathematica Mathematica 7.0 Maximum Sturm-Lioville theory calculus differential equation differential equations existence and uniqueness theo exponential function periodic solutions stability theory

Authors and affiliations

  • Walter G. Kelley
    • 1
  • Allan C. Peterson
    • 2
  1. 1., Department of MathematicsUniversity of OklahomaNormanUSA
  2. 2.Dept. MathematicsUniversity of Nebraska-LincolnLincolnUSA

Bibliographic information