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It is surprising that fixed point theorems (FPTs) appear in so many different contexts throughout Mathematics: Applying Kakutani's FPT earned Nash a Nobel prize; I am aware of some uses in logic; and of course everyone should know Picard's Theorem in ODEs. There are also results about local and global structure OF the fixed points themselves, and quite some famous conjectures (also labeled FPT for the purpose of this question).

Many results are so far removed from my field that I am sure there are plenty of FPTs out there that I have never encountered. I know of several, and will post later if you do not beat me to them :)

Community wiki rules apply. One FPT per answer, preferably with an inspiring list of interesting applications.

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Not a FPT but a book: "Fixed point theory" by Granas and Dugundji. –  jbc Apr 10 '13 at 9:01
Also: Journal of Fixed Point Theory and Applications, Fixed Point Theory and Applications, Fixed Point Theory, Advances in Fixed Point Theory, and JP Journal of Fixed Point Theory and Applications. –  Rodrigo A. Pérez Apr 10 '13 at 13:19

33 Answers 33

I really like the following result, which allows one to drop the usual compactness assumption.

Okhezin's theorem: For a polyhedron $K$ and a continouous map $f\colon K\to K$ at least one of the following conditions is true:

  • $f$ has a fixed point;
  • $f$ is not nullhomotopic;
  • $K$ contains a closed subset homeomorphic to $[0,\infty)$ (a closed ray).

Since $[0,\infty)$ is an absolute retract without fixed point property, no polyhedron containing it as a closed subset has the fixed point property. This gives the following corollary.

Corollary (Okhezin): A contractible polyhedron has the fixed point property if and only if it is rayless, i.e. contains no closed subset homeomorphic to $[0,\infty)$.

Okhezin also proved some fixed point theorems that apply to other classes of rayless spaces, including some Lefschetz-type results. However, it is not known whether a rayless, acyclic polyhedron has the fixed point property.

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Veblen fixed point theorem A mapping $f$ from the class of ordinals to itself is called normal if it is strictly increasing and continuous, i.e.

1- $\alpha<\beta$ implies $f(\alpha)<f(\beta)$.

2- for any limit ordinal $f(\lambda)=sup\{f(\alpha):\ \alpha<\lambda\}$.

Any normal mapping of the class of ordinals has fixed point and the set of fixed points is unbounded.

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THEOREM:   Let $n$ be a non-negative integer. Let $X$ be a compact Hausdorff ANR, and $f:X\times I^n\rightarrow X$ be a continuous mapping. Assume that the Lefschetz number of the induced mapping $f_0: x\mapsto f(x\ 0)$ of $X$ into itself, is not equal to $0$. Then there exists $x\in X$ such that

$$\dim\{y\in I^n : f(x\ y) = y\}\ \ge\ n-\dim X$$

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THEOREM:   Let $n$ be a non-negative integer. Let $X$ be a Hausdorff compact space such that $X\times I^n$ has the fixed point property. Then for every continuous $f:X\times I^n\rightarrow X$ there exists $x\in X$ such that

$$\dim\{y\in I^n : f(x\ y)=x\}\ \ge\ n-\dim X$$

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The Nielsen fixed point theorem gives a lower bound on the number of fixed points of any map homotopic to a fixed map in terms of the Nielsen number. For closed surfaces, pseudo-Anosov homeomorphisms realize the Nielsen number in a given mapping class.

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There is a celebrated fixed point theorem of A. Borel with applications to algebraic geometry (Ann. of Math. (1)64(1956)).

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The Banach fixed-point theorem (or contraction mapping principle) was already mentioned by Rodrigo A. Pérez, but I would like to stress another application. The principle says that a contraction of a complete metric space $(X,d)$ (namely, a continuous function $f:X\to X$ such that $d\big(f(x),f(y)\big)\leq \rho d(x,y)$ for each $x,y\in X$ where $\rho<1$ is some positive constant depending on $f$ only) has a unique fixed point.

In his milestone 1981 paper Fractals and Self Similarities, (Indiana Univ. Math. J., vol. 30, n. 5) J. Hutchinson axiomatized the relation between fractals and collections of contractions of $\mathbb{R}^n$. He showed that for each set $\mathscr{S}=\{S_1,\dots,S_N\}$ of contractions $S_i\colon\mathbb{R}^n\to\mathbb{R}^n$, there exists a unique closed, bounded set $K$ such that $$ K=\bigcup_{i=1}^N S_i(K)\;. $$ Such fixed closed sets are "fractals" in a very natural way. For instance, the Koch curve can be obtained in $\mathbb{R}^2$ by using two contractions (see p. 729 of Hutchinson's work), as well as the Cantor set - for this, take $\mathscr{S}=\{S_1,S_2\}$ with $$ S_1(x)=\frac{x}{3}\quad\text{and}\quad S_2(x)=\frac{x}{3}+\frac{2}{3}\;. $$ The three-line proof of the existence of $K$ is an application of the contraction mapping principle (and is Theorem 1 on p. 728 of Hutchinsons's work) and goes as follows: let, as before, $n\geq 1$ and $\mathscr{S}=\{S_1,\dots,S_N\}$ be contractions of $\mathbb{R}^n$. Let $\mathscr{B}$ be the set of all closed bounded subsets of $\mathbb{R}^n$ and, for two bounded closed $A,B\in\mathscr{B}$, let $\delta(A,B)=\sup \{d(a,B),d(b,A):a\in A,b\in B\}$. This turns $(\mathscr{B},\delta)$ into a complete metric space for which $$ \mathscr{S}:A\mapsto \bigcup _{i=1}^{N}S_i(A) $$ is a contraction. Hence, there is a unique fixed point $K\in\mathscr{B}$. Needless to say, one can replace $\mathbb{R}^n$ with any other complete metric space without affecting the proof.

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Another one, from MR0151632 Michel Hervé: Several complex variables. Local theory. Published for the Tata Institute of Fundamental Research, Bombay by Oxford University Press, London 1963 vii+134 pp.

Let $G$ be an open and connected set of the affine space $X$. If the image $f(G)$ under a holomorphic map $f: G \to G$ is relatively compact in $G$, then $f$ has a unique fixed point.

The proof uses Montel theorem and the fact that every analytic and compact subset of an affine space must be finite.

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The main theorem of Smith theory asserts that if a $p$-group $G$ acts on a mod-$p$-acyclic space $X$ (which must also be 'finitistic', a fairly weak condition), then the fixed point set $X^G$ is also mod-$p$ acyclic; in particular, it is non-empty.

This is especially useful because $X$ is not assumed to be compact, as is the case for the Lefschetz fixed point theorem, say.

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I thought this result was a bit interesting. Mahlon M. Day in the paper [1] showed that the amenable groups are precisely the groups where there Markov-Kakutani theorem holds.

If $(X,\mathcal{M})$ is an algebra of sets, then a function $\mu:\mathcal{M}\rightarrow[0,1]$ is said to be a finitely additive probability measure if $\mu(\emptyset)=0,\mu(X)=1$ and $\mu(A\cup B)=\mu(A)+\mu(B)$ whenever $A,B\in\mathcal{M}$ and $A\cap B=\emptyset$. If $G$ is a group, then a finitely additive probability measure $\mu:P(G)\rightarrow G$ on the algebra of sets $(G,P(G))$ is said to be left-invariant if $\mu(aR)=\mu(R)$ for each $R\subseteq G$.

A group $G$ is said to be amenable if there exists a left-invariant finitely additive probability measure $\mu:P(G)\rightarrow[0,1]$. For example, every finite group is amenable, and every abelian group is amenable. Furthermore, the class of amenable groups is closed under taking quotients, subgroups, direct limits, and finite products.

Let $C$ be a convex subset of a real vector space. Then a function $f:C\rightarrow C$ is said to be an affine map if $f(\lambda x+(1-\lambda)y)=\lambda f(x)+(1-\lambda)f(y)$ for each $\lambda\in[0,1]$ and $x,y\in C$.

$\textbf{Theorem}$(Day) Let $G$ be a group. Then the following are equivalent.

  1. $G$ is amenable.

  2. Let $X$ be a Hausdorff topological vector space and let $C\subseteq X$ be a compact convex subset. Let $\phi:G\rightarrow C^{C}$ be a group action such that each $\phi(g)$ is a continuous affine map. Then there is a point in $C$ fixed by every element of $G$.

  3. Let $X$ be a locally convex topological vector space and let $C\subseteq X$ be a compact convex subset. Let $\phi:G\rightarrow C^{C}$ be a group action such that each $\phi(g)$ is a continuous affine map. Then there is a point in $C$ fixed by every element in $G$.

[1] Fixed-point theorems for compact convex sets. Mahlon M. Day.Illinois J. Math. Volume 5, Issue 4 (1961), 585-590.

[2] Ceccherini-Silberstein, Tullio, and M. Coornaert. Cellular Automata and Groups. Heidelberg: Springer, 2010.

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Alexander Abian (1923-1999) proved around 1998 the following result he named "the most fundamental fixed-point theorem". "Let F be a mapping from a set A into itself. Let G(x,0)=x, G(1,x)=F(x), G(2,x)= F(F(x)) be the iterates values of the function F for the argument x in A. Then F has a fixed point if and only if: there exists an element x of A such that, for every ordinal v, G(v,x) is an element of A and if G(v) is not a fixed point of A then G(u,x)'s are all distincts elements of A for u∈v." Details can be found at http://us2.metamath.org:88//abianfp.html Gérard Lang

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Now there's a name from Usenet past. –  Aaron Bergman May 28 '13 at 15:02

Let $p:E\rightarrow B$($B$ is locally path wise connected) be a covering map then every isomorphism $h:E\rightarrow E$(isomorphism between covering spaces)is called automorphism and the set of automorphisms of $E$ relative to $p$ has a group structure and is shown with $A(E,p)$,now if $f\in A(E,p)$ has a fixed point then $f=I_{E}$.

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There is the Bruhat-Tits theorem that a group acting by isometries on a CAT(0) space with a bounded orbit has a fixed point. This is often applied to compact subgroups of grous acting on Euclidean buildings.

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Allow me to mention another version of the Lefschetz fixed-point theorem. If $X$ is a (say smooth projective, though this works in greater generality) variety over $\mathbb F_q$ of dimension $d$, then \begin{equation} \left|X\left(\mathbb F_{q^n}\right)\right| = q^d \sum_i (-1)^i \mathrm{tr}\left(\Phi_{q^n} : H_{et}^i(\bar X,\mathbb Q_\ell)\right) \end{equation} where $\ell$ is prime to $q$ and $\Phi_{q^n}$ is the geometric Frobenius.

As a corollary one gets the rationality of the zeta-function of $X$.

(Note that this actually is a fixed-point theorem. $X(\mathbb F_{q^n})$ is just the set of fixed points under $\Phi_{q^n}$ applied to $X$.)

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The Fiber contraction theorem due to Hirsch and Pugh:

Let $F: E \to E$ be a mapping on the fiber bundle $\pi: E \to B$ covering $f: B \to B$, where $B$ is a topological space and the fibers $Y$ of $E$ are complete metric spaces. Let $f$ have a globally attractive fixed point $b \in B$ and the fiber mapping is a uniform contraction in a neighborhood $\pi^{-1}(U), b \in U \subset B$ (and thus there exists a unique fixed point $e = (b,y) \in \pi^{-1}(b)$), and $b \mapsto F(b,y)$ be continuous. Then $e$ is the unique, globally attracting fixed point of $F$.

This result is an extension of the Banach fixed point theorem that can be used to prove e.g. the existence of center manifolds and normally hyperbolic invariant manifolds. It is specifically useful when one cannot find a contraction on an space of $C^k$ functions, but can construct inductively a contraction on the $k$-th jet when the $k-1$ jets are known to converge to a fixed point.

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It would be a pity not to mention the work of F. Browder, in particular his study of non linear pde's, the main tool being FPT's on Banach spaces. This is documented in many of his publications, perhaps most memorably in his "Nonlinear operators and nonlinear equations of evolution".

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Euler's Theorem, that every non-trivial rotation $R$ of 3-space has a unique axis. It really just days that $R$ acting on the space of lines through the origin has a unique fixed point.

(Added April 11, 2013) I just received my copy of the latest issue of The Journal of Fixed Point Theory and its Applications (Vol.12, Nos. 1--2) and starting on page 27 there is an article with the title "Chasles' fixed point theorem for Euclidean motions". Chasles' theorem is a generalization of Euler's Theorem; it says that every orientation preserving Euclidean motion of 3-space that is not a pure translation is a "twist" or "screw motion", that is, a rotation about some unique line (NOT necessarily through the origin) called the axis followed by a translation that is parallel to the axis. I really should have given this as my example rather than Euler's Theorem, since as I said it is more general. And I have no excuse for not recalling it since the authors of that paper are myself and my son Bob.

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The infinite dimensional version of Brouwer's FPT is Schauder's FPT. If $K$ is a non-void closed convex subset of a TVS, and $f:K\rightarrow K$ is compact ($f$ is continuous and $f(K)$ is compact), then $f$ has a fixed point.

It has numerous applications in nonlinear analysis. One of the earliest being the existence of a solution to the stationnary Navier-Stokes equations with Dirichlet boundary condition, proven by J. Leray.

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It is worth mentioning the sensationally short proof given by Lomonosov of his theorem that every continuous linear mapping on a Banach space which commutes with a non-zero compact operator has a non-trivial invariant subspace. This was then the strongest positive result on the invariant subspace problem (and might still be for all I know) and the key ingredient was the Schauder-Tychonoff FTP. –  jbc Apr 11 '13 at 15:54

Let $p$ be a prime and let $G$ be a finite $p$-group which acts on a finite set $X$. Suppose that $p$ does not divide $|X|$ then this action has a fixed point.

This has many applications, e.g. the proof of the fact that Sylow subgroups are conjugated.

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This is false. For example, let $G = C_p \times C_q$. Then $G$ acts on a set of size $p$ and on a set of size $q$, hence on a set of size $p + q$. If $p, q > 1$ then this action doesn't have a fixed point, but we can arrange to have $\gcd(pq, p + q) = 1$ (e.g. take $p = 2, q = 3$). The correct statement is that $G$ needs to be a $p$-group. –  Qiaochu Yuan Apr 11 '13 at 1:02
Nice example. You can get the full Sylow theorem(s) from this fixed point theorem (not just the conjugacy), see mathoverflow.net/questions/18716/sylow-subgroups/19543#19543. –  j.p. May 28 '13 at 8:17

Suppose that $S$ is a finite set with an odd number of elements. Then every involution $f:S\rightarrow S$ has a fixed point.

Application: Every prime of the form $p=4m+1$ may be written as a sum of two squares. The result above is used on p.20 here.

Also, although not of the usual fixed point theorem form, is something I call the fixed point factor theorem. If $f:\mathbb{C}\rightarrow \mathbb{C}$ is a polynomial and $n>1$, then $f(x)-x$ is a factor of $f^n (x)-x$ for natural $n$. This has a very obvious generalisation...

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Here is a teeny tiny toy version of the Lefschetz fixed point theorem: let $f : S \to S$ be an endomorphism of a finite set and let $K[f] : K[S] \to K[S]$ be the induced linear map on free vector spaces. Then $\text{tr}(K[f])$ is the number of fixed points of $f$. This is one way to prove Burnside's lemma.

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One of the most awesome fixed-point theorems I know of is due to Pataraia:

  • If $L$ is a poset with a bottom element and with joins of directed subsets, then every monotone function $f: L \to L$ has a (least) fixed point.

It is a strengthening of the Knaster-Tarski theorem, and is somewhat reminiscent of the Bourbaki-Witt theorem, but is entirely constructive. Related discussion at the n-Category Café here.

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The Lefschetz Fixed Point Theorem is wonderful. It generalizes the Fixed Point Theorem of Brouwer, and is an indispensable tool in topological analysis of dynamical systems.

The weakest form goes like this. For any continuous function $f:X \to X$ from a triangulable space $X$ to itself, let $H_\ast f:H_\ast X\to H_\ast X$ denote the induced endomorphism of the Rational homology groups. If the alternating sum (over dimension) of the traces

$$\Lambda(f) := \sum_{d \in \mathbb{N}}(-1)^d\text{ Tr}(H_df)$$

is non-zero, then $f$ has a fixed point! Since everything is defined in terms of homology, which is a homotopy invariant, one gets to add "for free" the conclusion that any other self-map of $X$ homotopic to $f$ also has a fixed point.

When $f$ is the identity map, $\Lambda(f)$ equals the Euler characteristic of $X$.

Update: Here is a lively document written by James Heitsch as a tribute to Raoul Bott. Along with an outline of the standard proof of the LFPT, you can find a large list of interesting applications.

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One cute application is to the fundamental theorem of algebra: a linear map $f : \mathbb{C}^{n+1} \to \mathbb{C}^{n+1}$ has an eigenvector iff the induced map on projective spaces has a fixed point. $\mathbb{CP}^n$ has Euler characteristic $n+1$ and $\text{GL}_n(\mathbb{C})$ is path-connected, so the conclusion follows by the Lefschetz fixed point theorem. The corresponding calculation for real projective spaces is enlightening as to "why" FTA fails over the reals: $\mathbb{RP}^n$ has Euler characteristic $0$ if $n$ is odd and $1$ if $n$ is even... –  Qiaochu Yuan Apr 11 '13 at 1:13

Kakutani's FPT: Let $S$ be a non-empty, compact, convex subset of $\mathbb{R}^n$, and $\varphi:S \longrightarrow 2^S$ a set-valued function with a closed graph and the property that $\varphi(x)$ is non-empty and convex for all $x \in S$. Then $\varphi$ has a fixed point.

Application: Consider a game with finitely many players and finitely many strategies. If players are allowed to choose mixed strategies, there is always a Nash equilibrium; that is, a set of strategy choices for all players such that no player can do better by unilaterally switching to a different strategy. This is the theorem that resulted in J. Nash getting the 1994 Nobel Prize in Economics.

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Another contribution to the theme "FTP's and Nobel Prizes in economics". The Arrow-Debreu theory of equilibrium in economics uses the Brouwer FTP and its extension by Kakutani in an essential way. Both are laureates and this theory is generally regarded as one of their most significant contributions. –  jbc Apr 11 '13 at 16:08

Lawvere's fixed point theorem. If $f \colon A \to Y^A$ is a surjective morphism in a Cartesian closed category, then any $t \colon Y \to Y$ has a fixed point.

(Surjectivity is a technical term, which basically means that any $g \colon A \to Y$ equals $f(a)$ on points for some point $a$ of $A$. See here)

Applications: Cantor's diagonal argument, Turing's halting problem, Russell's paradox, Gödel's incompleteness theorem, Tarski's incompleteness theorem, Rice's theorem, and many more, see here.

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Let $X$ be a nonempty compact Hausdorff space, and $f\colon X\to X$ be continuous. Denote by $\mathcal P(X)$ the powerset of $X$. Then the function $f^+\colon\mathcal P(X)\to\mathcal P(X)$ defined by $f^+(A)=f[A]$ has a fixed point $f^+(A)=A$, where $A\subseteq X$ is nonempty and closed.

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I have taken the liberty to clarify the notation. –  Emil Jeřábek Apr 10 '13 at 15:21
Notice that this is a special case of the Pataraia fixed-point theorem from Todd Trimble’s answer ($L$ is the poset of nonempty closed subspaces of $X$ ordered by reverse inclusion). –  Emil Jeřábek Apr 12 '13 at 12:06

The Arithmetic fixed point theorem (see also MO/30874) states that if $F$ is a formula in number theory with only one free variable $v$, then there is a sentence $A$ such that number theory can prove $A \Leftrightarrow F_v(\underline{[A]})$. An immediate application is Gödel's Theorem.

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Ryll-Nardzewski FPT: If $K$ is a nonempty weakly compact convex subset of a Banach space, then every semigroup of affine isometries of $K$ has a common fixed point.

This implies the existence of Haar measures on compact groups.

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Also used all over the place in various reaults about Banach algebras, especially in questions regarding derivations –  Yemon Choi Apr 11 '13 at 2:49

Kleene's Second Recursion Theorem If $F$ is a total computable function then there is an index $e$ such that $\{e\} \simeq \{F(e)\}$.

This has many applications such as effective transfinite recursion.

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Knaster-Tarski's fixed point theorem: If $L$ is a complete lattice and $f:L \rightarrow L$ is order preserving, then the set of fixed points of $f$ form a (non-empty) complete lattice.

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More generally, if $C$ is a category with colimits of $\omega$-chains and an initial object $0$, then every functor $F : C \to C$ has an initial $F$-algebra (namely the colimit of $0 \to F(0) \to F(F(0)) \to \dotsc$). Actually this gives a neat construction of the Banach space $L^1([0,1])$, including the integral $L^1([0,1]) \to \mathbb{R}$, see mathoverflow.net/questions/23143 –  Martin Brandenburg Apr 10 '13 at 13:10
@Martin: no, you also need for $F$ to preserve colimits of $\omega$-chains. (E.g., otherwise you could prove that the covariant power-set functor on $Set$ has an initial algebra, which would run counter to Cantor's theorem.) –  Todd Trimble Apr 10 '13 at 20:14

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