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Nonlinear interpolation and boundary value problems. (English) Zbl 1385.34003

Trends in Abstract and Applied Analysis 2. Hackensack, NJ: World Scientific (ISBN 978-981-4733-47-2/hbk; 978-981-4733-49-6/ebook). xii, 236 p. (2016).
Publisher’s description: This book is devoted to the study of boundary value problems for nonlinear ordinary differential equations and focuses on questions related to the study of nonlinear interpolation. In 1967, Andrzej Lasota and Zdzisław Opial showed that, under suitable hypotheses, if solutions of a second-order nonlinear differential equation passing through two distinct points are unique, when they exist, then, in fact, a solution passing through two distinct points does exist. That result, coupled with the pioneering work of Philip Hartman on what was then called unrestricted \(n\)-parameter families, has stimulated 50 years of development in the study of solutions of boundary value problems as nonlinear interpolation problems.
The purpose of this book is two-fold. First, the results that have been generated in the past 50 years are collected for the first time to produce a comprehensive and coherent treatment of what is now a well-defined area of study in the qualitative theory of ordinary differential equations. Second, methods and technical tools are sufficiently exposed so that the interested reader can contribute to the study of nonlinear interpolation.

MSC:

34-02 Research exposition (monographs, survey articles) pertaining to ordinary differential equations
34B10 Nonlocal and multipoint boundary value problems for ordinary differential equations
65L10 Numerical solution of boundary value problems involving ordinary differential equations
65D05 Numerical interpolation
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