Fixed-point theorem: Difference between revisions

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Revision as of 05:15, 1 April 2023 edit David Eppstein (talk \| contribs) Autopatrolled, Administrators 235,695 edits Undid revision 1147609609 by Dabed (talk) did you have some particular trace formula in mind? Or was this an intentional link to a disambiguation page, in which case the link should be formatted as WP:INTDABLINK describes? Tag: Undo ← Previous edit		Latest revision as of 00:51, 3 February 2024 edit undo SomeoneIguess (talk \| contribs) Extended confirmed users 1,250 edits Reverting edit(s) by 2603:7000:7700:4BE3:5E74:9912:8C1E:8CD2 (talk) to rev. 1201422669 by JoaoFrancisco1812: Non-constructive edit (UV 0.1.5) Tags: Ultraviolet Undo
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Line 7: \| isbn = 0-8218-5080-6 }} }}</ref>▼ ~~</ref> Some authors claim that 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 == Line 25 ⟶ 18: }}</ref> By contrast, the [[Brouwer fixed-point theorem]] (1911) 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~~see also [[Sperner's lemma]]). For example, the [[cosine]] function is continuous in [−1, 1] and maps it into [−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 (known as the [[Dottie number]]) 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 Line 90 ⟶ 83: [[Browder fixed-point theorem]] [[Brouwer fixed-point theorem]] [[Rothe's fixed-point theorem]] [[Caristi fixed-point theorem]] [[Diagonal lemma]], also known as the fixed-point lemma, for producing self-referential sentences of [[first-order logic]] [[Lawvere's fixed-point theorem]] [[Discrete fixed-point theorem]]s [[Earle-Hamilton fixed-point theorem]] Line 110 ⟶ 105: [[Tychonoff fixed-point theorem]] {{div col end}} == See also == [[Trace formula (disambiguation)\|Trace formula]] == Footnotes == {{Reflist}} ~~<references/>~~ == References == Line 165 ⟶ 164: ==External links== *[http://www.math-linux.com/spip.php?article60 Fixed Point Method] {{Authority control}} [[Category:Closure operators]]