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In mathematics, a fixed-point theorem is a result saying that a function F will have at least one fixed point (a point x for which ), under some conditions on F that can be stated in general terms. Results of this kind are amongst the most generally useful in mathematics.
In mathematical analysis
By contrast, the Brouwer fixed-point theorem is a non-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, 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] 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 intersects the line . Numerically, the fixed point is approximately (thus ).
There are a number of generalisations to Banach spaces and further; these are applied in PDE theory. See fixed-point theorems in infinite-dimensional spaces.
The collage theorem in fractal compression proves that, for many images, there exists a relatively small description of a function that, when iteratively applied to any starting image, rapidly converges on the desired image.
In algebra and discrete mathematics
A common theme in lambda calculus is to find fixed points of given lambda expressions. Every lambda expression has a fixed point, and a fixed-point combinator is a "function" which takes as input a lambda expression and produces as output a fixed point of that expression. An important fixed-point combinator is the Y combinator used to give recursive definitions.
In denotational semantics of programming languages, a special case of the Knaster–Tarski theorem is used to establish the semantics of recursive definitions. While the fixed-point theorem is applied to the "same" function (from a logical point of view), the development of the theory is quite different.
The same definition of recursive function can be given, in computability theory, by applying Kleene's recursion theorem. These results are not equivalent theorems; the Knaster–Tarski theorem is a much stronger result than what is used in denotational semantics. However, in light of the Church–Turing thesis their intuitive meaning is the same: a recursive function can be described as the least fixed point of a certain functional, mapping functions to functions.
The above technique of iterating a function to find a fixed point can also be used in set theory; the fixed-point lemma for normal functions states that any continuous strictly increasing function from ordinals to ordinals has one (and indeed many) fixed points.
Every closure operator on a poset has many fixed points; these are the "closed elements" with respect to the closure operator, and they are the main reason the closure operator was defined in the first place.
- Atiyah–Bott fixed-point theorem
- Banach fixed-point theorem
- Borel fixed-point theorem
- Brouwer 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
- Fixed-point property
- Injective metric space
- Kakutani fixed-point theorem
- Kleene fixpoint theorem
- Topological degree theory
- Tychonoff fixed-point theorem
- Woods Hole fixed-point theorem
- The foundations of program verification, 2nd edition, Jacques Loeckx and Kurt Sieber, John Wiley & Sons, ISBN 0-471-91282-4, Chapter 4; theorem 4.24, page 83, is what is used in denotational semantics, while Knaster–Tarski theorem is given to prove as exercise 4.3–5 on page 90.
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