Arzelà–Ascoli theorem
The Arzelà–Ascoli theorem is a fundamental result of mathematical analysis giving necessary and sufficient conditions to decide whether every sequence of a given family of real-valued continuous functions defined on a closed and bounded interval has a uniformly convergent subsequence. The main condition is the equicontinuity of the family of functions. The theorem is the basis of many proofs in mathematics, including that of the Peano existence theorem in the theory of ordinary differential equations, Montel's theorem in complex analysis, and the Peter–Weyl theorem in harmonic analysis and various results concerning compactness of integral operators.
The notion of equicontinuity was introduced in the late 19th century by the Italian mathematicians Cesare Arzelà and Giulio Ascoli. A weak form of the theorem was proven by, who established the sufficient condition for compactness, and by, who established the necessary condition and gave the first clear presentation of the result. A further generalization of the theorem was proven by, to sets of real-valued continuous functions with domain a compact metric space. Modern formulations of the theorem allow for the domain to be compact Hausdorff and for the range to be an arbitrary metric space. More general formulations of the theorem exist that give necessary and sufficient conditions for a family of functions from a compactly generated Hausdorff space into a uniform space to be compact in the compact-open topology; see.
Statement and first consequences
By definition, a sequence of continuous functions on an interval is uniformly bounded if there is a number such thatfor every function belonging to the sequence, and every.
The sequence is said to be uniformly equicontinuous if, for every, there exists a such that
whenever for all functions in the sequence.
One version of the theorem can be stated as follows:
Examples
Differentiable functions
The hypotheses of the theorem are satisfied by a uniformly bounded sequence of differentiable functions with uniformly bounded derivatives. Indeed, uniform boundedness of the derivatives implies by the mean value theorem that for all and,where K is the supremum of the derivatives of functions in the sequence and is independent of. So, given, let to verify the definition of equicontinuity of the sequence. This proves the following corollary:
- Let be a uniformly bounded sequence of real-valued differentiable functions on such that the derivatives are uniformly bounded. Then there exists a subsequence that converges uniformly on.
The diagonalization argument can also be used to show that a family of infinitely differentiable functions, whose derivatives of each order are uniformly bounded, has a uniformly convergent subsequence, all of whose derivatives are also uniformly convergent. This is particularly important in the theory of distributions.
Lipschitz and Hölder continuous functions
The argument given above proves slightly more, specifically- If is a uniformly bounded sequence of real valued functions on such that each f is Lipschitz continuous with the same Lipschitz constant :
- A set of functions on that is uniformly bounded and satisfies a Hölder condition of order,, with a fixed constant,
Euclidean spaces
The Arzelà–Ascoli theorem holds, more generally, if the functions take values in -dimensional Euclidean space, and the proof is very simple: just apply the -valued version of the Arzelà–Ascoli theorem times to extract a subsequence that converges uniformly in the first coordinate, then a sub-subsequence that converges uniformly in the first two coordinates, and so on. The above examples generalize easily to the case of functions with values in Euclidean space.Generalizations
Compact metric spaces and compact Hausdorff spaces
The definitions of boundedness and equicontinuity can be generalized to the setting of arbitrary compact metric spaces and, more generally still, compact Hausdorff spaces. Let X be a compact Hausdorff space, and let C be the space of real-valued continuous functions on X. A subset is said to be equicontinuous if for every x ∈ X and every, x has a neighborhood Ux such thatA set is said to be pointwise bounded if for every x ∈ X,
A version of the Theorem holds also in the space C of real-valued continuous functions on a compact Hausdorff space X :
The Arzelà–Ascoli theorem is thus a fundamental result in the study of the algebra of continuous functions on a compact Hausdorff space.
Various generalizations of the above quoted result are possible. For instance, the functions can assume values in a metric space or topological vector space with only minimal changes to the statement :
Here pointwise relatively compact means that for each x ∈ X, the set is relatively compact in Y.
The proof given can be generalized in a way that does not rely on the separability of the domain. On a compact Hausdorff space X, for instance, the equicontinuity is used to extract, for each ε = 1/n, a finite open covering of X such that the oscillation of any function in the family is less than ε on each open set in the cover. The role of the rationals can then be played by a set of points drawn from each open set in each of the countably many covers obtained in this way, and the main part of the proof proceeds exactly as above.
Necessity
Whereas most formulations of the Arzelà–Ascoli theorem assert sufficient conditions for a family of functions to be compact in some topology, these conditions are typically also necessary. For instance, if a set F is compact in C, the Banach space of real-valued continuous functions on a compact Hausdorff space with respect to its uniform norm, then it is bounded in the uniform norm on C and in particular is pointwise bounded. Let N be the set of all functions in F whose oscillation over an open subset U ⊂ X is less than ε:For a fixed x∈X and ε, the sets N form an open covering of F as U varies over all open neighborhoods of x. Choosing a finite subcover then gives equicontinuity.
Examples
- To every function that is -integrable on, with, associate the function defined on by
- When is a compact linear operator from a Banach space to a Banach space, its transpose is compact from the dual to. This can be checked by the Arzelà-Ascoli theorem.
- When is holomorphic in an open disk, with modulus bounded by, then its derivative has modulus bounded by in the smaller disk If a family of holomorphic functions on is bounded by on, it follows that the family of restrictions to is equicontinuous on. Therefore, a sequence converging uniformly on can be extracted. This is a first step in the direction of Montel's theorem.