This book introduces the method of lower and upper solutions for ordinary differential equations. This method is known to be both easy and powerful to solve second order boundary value problems. Besides an extensive introduction to the method, the first half of the book describes some recent and more involved results on this subject. These concern the combined use of the method with degree theory, with variational methods and positive operators. The second half of the book concerns applications. This part exemplifies the method and provides the reader with a fairly large introduction to the problematic of boundary value problems. Although the book concerns mainly ordinary differential equations, some attention is given to other settings such as partial differential equations or functional differential equations. A detailed history of the problem is described in the introduction. · Presents the fundamental features of the method · Construction of lower and upper solutions in problems · Working applications and illustrated theorems by examples · Description of the history of the method and Bibliographical notes
Author(s): Colette De Coster and Patrick Habets (Eds.)
Series: Mathematics in Science and Engineering 205
Edition: 1
Publisher: Elsevier Science
Year: 2006
Language: English
Pages: 1-489
Content:
Preface
Pages ix-x
Colette De Coster, Patrick Habets
Notations
Pages xi-xii
Introduction—The history
Pages 1-24
Chapter I The periodic problem Original Research Article
Pages 25-74
Chapter II The separated BVP Original Research Article
Pages 75-133
Chapter III Relation with degree theory Original Research Article
Pages 135-188
Chapter IV Variational methods Original Research Article
Pages 189-239
Chapter V Monotone iterative methods Original Research Article
Pages 241-277
Chapter VI Parametric multiplicity problems Original Research Article
Pages 279-314
Chapter VII Resonance and non-resonance Original Research Article
Pages 315-343
Chapter VIII Positive solutions Original Research Article
Pages 345-374
Chapter IX Problems with singular forces Original Research Article
Pages 375-404
Chapter X Singular perturbations Original Research Article
Pages 405-424
Chapter XI Bibliographical notes Original Research Article
Pages 425-434
Appendix
Pages 435-462
Bibliography
Pages 463-487
Index
Pages 488-489