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Ordinary differential equations


In the now 7th, revised and expanded edition, W. Walter puts his textbook over OrdinaryDifferential equations that has already become something of a "modern classic". The book corresponds to the current state of research. In addition to classical theory, it mainly deals with topics that are indispensable for the study of dynamic systems and the qualitative behavior of ordinary differential equations. An appendix provides key terms from analysis and topology. This textbook offers the student an optimal introduction to the field of differential equations, which is characterized by a clear structure and clarity in the argumentation. Many instructive examples with solutions to selected tasks round off this work.


Initial Value Problem Asymptotics Banach Fixed Point Theorem Differential Equations Dynamic Systems Functional Analysis Ordinary Differential Equations Hilbert Space Contraction Principle Boundary Value Problem Boundary Value Problem Stability

Authors and affiliations

  1. 1.Mathematisches Institut IUniversit├Ąt KarlsruheKarlsruhe, GermanyGermany

Bibliographic information

  • Book Title Ordinary Differential Equations
  • Book Subtitle An introduction
  • AuthorsWolfgang Walter
  • Series TitleSpringer Textbook
  • DOIhttps: //doi.org/10.1007/978-3-642-57240-1
  • Copyright InformationSpringer-Verlag Berlin Heidelberg2000
  • Publisher NameSpringer, Berlin, Heidelberg
  • eBook PackagesSpringer Book Archive
  • Softcover ISBN978-3-540-67642-3
  • eBook ISBN978-3-642-57240-1
  • Series ISSN0937-7433
  • Edition Number7
  • Number of PagesXVI, 402
  • Number of Illustrations1 b / w illustrations, 0 illustrations in color
  • TopicsAnalysis
    Ordinary Differential Equations
  • Buy this book on publisher's site