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Line 4: \| year = 1988 \| publisher = American Mathematical Society \| isbn = 0-8218-5080-6 }} </ref> Results of this kind are amongst the most generally useful in mathematics.<ref>{{cite book \| author1 = Dugundji, James \| author2 = Granas, Andrzej \| title = Fixed Point Theory \| year = 2003 \| publisher = Springer-Verlag \| isbn = 0-387-00173-5 }}</ref> == In mathematical analysis == The [[Banach fixed-point theorem]] gives a general criterion guaranteeing that, if it is satisfied, the procedure of [[iteration\|iterating]] a function yields a fixed point.<ref>{{cite book \| author = Giles, John R. \| title = Introduction to the Analysis of Metric Spaces \| year = 1987 \| publisher = Cambridge University Press \| isbn = 978-0-521-35928-3 }}</ref> By contrast, the [[Brouwer fixed-point theorem]] is a non-[[Constructivism (mathematics)\|constructive result]]: it says that any [[continuous function]] from the closed [[unit ball]] in ''n''-dimensional [[Euclidean space]] to itself must have a fixed point,<ref>Eberhard Zeidler, ''Applied Functional Analysis: main principles and their applications'', Springer, 1995.</ref> but it doesn't describe how to find the fixed point (See also [[Sperner's lemma]]). For example, the [[cosine]] function is continuous in [~~−1~~−1,1] and maps it into [~~−1~~−1, 1], and thus must have a fixed point. This is clear when examining a sketched graph of the cosine function; the fixed point occurs where the cosine curve ''y'' = cos(''x'') intersects the line ''y'' = ''x''. Numerically, the fixed point is approximately ''x'' = 0.73908513321516 (thus ''x'' = cos(''x'') for this value of ''x''). The [[Lefschetz fixed-point theorem]]<ref>{{cite journal \|author=Solomon Lefschetz \|title=On the fixed point formula \|journal=[[Annals of Mathematics\|Ann. of Math.]] \|year=1937 \|volume=38 \|pages=819–822 \|doi=10.2307/1968838 \|issue=4}}</ref> (and the [[Nielsen theory\|Nielsen fixed-point theorem]])<ref>{{cite book \| last1=Fenchel \| first1=Werner \| author1link=Werner Fenchel \| last2=Nielsen \| first2=Jakob \| author2link=Jakob Nielsen (mathematician)▼ ~~\| first=Werner~~ \| editor-last=Schmidt \| editor-first=Asmus L.▼ ~~\| author1link=Werner Fenchel~~ \| title=Discontinuous groups of isometries in the hyperbolic plane▼ ~~\| last2=Nielsen~~ \| series=De Gruyter Studies in mathematics▼ ~~\| first2=Jakob~~ \| volume=29▼ ▲\| author2link=Jakob Nielsen (mathematician) \| publisher=Walter de Gruyter & Co.▼ ~~\| editor-last=Schmidt~~ \| ___location=Berlin▼ ▲\| editor-first=Asmus L. \| year=2003▼ ▲\| title=Discontinuous groups of isometries in the hyperbolic plane ▲\| series=De Gruyter Studies in mathematics ▲\| volume=29 ▲\| publisher=Walter de Gruyter & Co. ▲\| ___location=Berlin ▲\| year=2003 }}</ref> from [[algebraic topology]] is notable because it gives, in some sense, a way to count fixed points. Line 48 ⟶ 45: \| author = Barnsley, Michael. \| title = Fractals Everywhere \| url = https://archive.org/details/fractalseverywhe0000barn \| url-access = registration \| year = 1988 \| publisher = Academic Press, Inc. \| isbn = 0-12-079062-9 }}</ref> Line 80 ⟶ 77: \| title = A one-sentence proof that every prime ''p'' ≡ 1 (mod 4) is a sum of two squares \| volume = 97 \| year = 1990 }}.</ref> == List of fixed-point theorems == Line 115 ⟶ 113: == References == {{cite book \| author1 = Agarwal, Ravi P. \| author2 = Meehan, Maria \| author3 = O'Regan, Donal \| title = Fixed Point Theory and Applications \| year = 2001 \| publisher = Cambridge University Press \| isbn = 0-521-80250-4 }} {{cite book \| author1 = Aksoy, Asuman\|author1-link=Asuman Aksoy \| author2 = Khamsi, Mohamed A. \| title = Nonstandard Methods in fixed point theory \| url = https://archive.org/details/nonstandardmetho0000akso \| url-access = registration \| year = 1990 \| publisher = Springer Verlag \| isbn = 0-387-97364-8 }} {{cite book Line 131 ⟶ 136: \| year = 2005 \| publisher = Springer Verlag \| isbn = 978-3-540-72233-5 }} {{cite book Line 138 ⟶ 143: \| year = 1989 \| publisher = Cambridge University Press \| isbn = 0-521-38808-2 }} {{cite book Line 144 ⟶ 149: \| year = 1990 \| publisher = Cambridge University Press \| isbn = 0-521-38289-0 }} {{cite book

Fixed-point theorem: Difference between revisions