Solvability and bifurcations of nonlinear equations

Bibliographic Information

Solvability and bifurcations of nonlinear equations

P. Drábek

(Pitman research notes in mathematics series, 264)

Longman Scientific & Technical , Copublished in the United States with John Wiley & Sons, 1992

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Note

Includes bibliographical references (p. 203-222) and index

Description and Table of Contents

Description

This Research Note describes the state of the investigation of nonlinear boundary value problems for ordinary and partial differential equations. The first part of the book is devoted to the study of weakly nonlinear problems. The author considers Landesman-Lazer type problems for ordinary and partial differntial equations, weakly nonlinear problems with vanishing nonlinearity and weakly nonlinear problems with oscillating nonlinearity. The second part of the book deals with strongly nonlinear problems for ordinary and partial differntial equations. Existence and multiplicity results are proved for both weakly and strongly nonlinear boundary value problems. The strongly nonlinear bifurcation problems are also discussed in this Research Note. The global bifurcation results complete in a certain sense the results of Rabinowitz. The local bifurcation of Fucik's spectrum of strongly nonlinear problems is also investigated. The methods used here are a combination of the results obtained from classical mathematical analysis and recent results derived from nonlinear functional analysis, function spaces and the theory of nonlinear boundary value problems for ordinary and partial differential equations. It is aimed at researchers and graudate students working in analysis, particularly in the theory of nonlinear boundary value problems for differential equations. This book will also be of interest to those working in related fields such as physics and mechanics.

Table of Contents

  • Part 1 Weakly nonlinear problems: problems of Landesman-Lazer type
  • weakly nonlinear problems with vanishing nonlinearity
  • weakly nonlinea problems with oscillating nonlinearity. Part 2 Strongly nonlinear problems: solvability of strongly nonlinear problems
  • bifurcations of strongly nonlinear problems.

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