Abstract
Formally we have arrived at the middle of the book. So you may need a pause for recovering, a pause which we want to fill up by some fixed point theorems supplementing those which you already met or which you will meet in later chapters. The first group of results centres around Banach’s fixed point theorem. The latter is certainly a nice result since it contains only one simple condition on the map F, since it is so easy to prove and since it nevertheless allows a variety of applications. Therefore it is not astonishing that many mathematicians have been attracted by the question to which extent the conditions on F and the space Ω can be changed so that one still gets the existence of a unique or of at least one fixed point. The number of results produced this way is still finite, but of a statistical magnitude, suggesting at a first glance that only a random sample can be covered by a chapter or even a book of the present size. Fortunately (or unfortunately?) most of the modifications have not found applications up to now, so that there is no reason to write a cookery book about conditions but to write at least a short outline of some ideas indicating that this field can be as interesting as other chapters. A systematic account of more recent ideas and examples in fixed point theory should however be written by one of the true experts. Strange as it is, such a book does not seem to exist though so many people are puzzling out so many results.
The essence of mathematics lies in its freedom.
Georg Cantor
He who does not employ mathematics for himself, will some day find it employed against himself.
Johann Friedrich Herbart
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© 1985 Springer-Verlag Berlin Heidelberg
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Deimling, K. (1985). Fixed Point Theory. In: Nonlinear Functional Analysis. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-662-00547-7_5
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DOI: https://doi.org/10.1007/978-3-662-00547-7_5
Publisher Name: Springer, Berlin, Heidelberg
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