Fréchet space

This article is about Fréchet spaces in functional analysis. For Fréchet spaces in general topology, see T1 space. For the type of sequential space, see Fréchet-Urysohn space.

In functional analysis and related areas of mathematics, Fréchet spaces, named after Maurice Fréchet, are special topological vector spaces. They are generalizations of Banach spaces (normed vector spaces that are complete with respect to the metric induced by the norm). Fréchet spaces are locally convex spaces that are complete with respect to a translation invariant metric. In contrast to Banach spaces, the metric need not arise from a norm.

Even though the topological structure of Fréchet spaces is more complicated than that of Banach spaces due to the lack of a norm, many important results in functional analysis, like the Hahn–Banach theorem, the open mapping theorem, and the Banach–Steinhaus theorem, still hold.

Spaces of infinitely differentiable functions are typical examples of Fréchet spaces.

Definitions

Fréchet spaces can be defined in two equivalent ways: the first employs a translation-invariant metric, the second a countable family of semi-norms.

A topological vector space X is a Fréchet space if and only if it satisfies the following three properties:

it is locally convex
its topology can be induced by a translation invariant metric, i.e. a metric d: X × X → R such that d(x, y) = d(x+a, y+a) for all a,x,y in X. This means that a subset U of X is open if and only if for every u in U there exists an ε > 0 such that {v : d(v, u) < ε} is a subset of U.
it is a complete metric space

Note that there is no natural notion of distance between two points of a Fréchet space: many different translation-invariant metrics may induce the same topology.

The alternative and somewhat more practical definition is the following: a topological vector space X is a Fréchet space if and only if it satisfies the following three properties:

it is a Hausdorff space
its topology may be induced by a countable family of semi-norms ||.||_k, k = 0,1,2,... This means that a subset U of X is open if and only if for every u in U there exists K≥0 and ε>0 such that {v : ||v - u||_k < ε for all k ≤ K} is a subset of U.
it is complete with respect to the family of semi-norms

A sequence (x_n) in X converges to x in the Fréchet space defined by a family of semi-norms if and only if it converges to x with respect to each of the given semi-norms.

Constructing Fréchet spaces

Recall that a seminorm ǁ ⋅ ǁ is a function from a vector space X to the real numbers satisfying three properties. For all x and y in X and all scalars c,

\|x\| \geq 0

\|x+y\| \le \|x\| + \|y\|

\|c\cdot x\| = |c| \|x\|

If ǁxǁ = 0 actually implies that x = 0, then ǁ ⋅ ǁ is in fact a norm. However, seminorms are useful in that they enable us to construct Fréchet spaces, as follows:

To construct a Fréchet space, one typically starts with a vector space X and defines a countable family of semi-norms ǁ ⋅ ǁ_k on X with the following two properties:

if x ∈ X and ǁxǁ_k = 0 for all k ≥ 0, then x = 0;
if (x_n) is a sequence in X which is Cauchy with respect to each semi-norm ǁ ⋅ ǁ_k, then there exists x ∈ X such that (x_n) converges to x with respect to each semi-norm ǁ ⋅ ǁ_k.

Then the topology induced by these seminorms (as explained above) turns X into a Fréchet space; the first property ensures that it is Hausdorff, and the second property ensures that it is complete. A translation-invariant complete metric inducing the same topology on X can then be defined by

d(x,y)=\sum_{k=0}^\infty 2^{-k}\frac{\|x-y\|_k}{1+\|x-y\|_k} \qquad x, y \in X.

Note that the function u → u/(1+u) maps [0, ∞) monotonically to [0, 1), and so the above definition ensures that d(x, y) is "small" if and only if there exists K "large" such that ǁx - yǁ_k is "small" for k = 0, …, K.

Examples

Every Banach space is a Fréchet space, as the norm induces a translation invariant metric and the space is complete with respect to this metric.
The vector space C^∞([0, 1]) of all infinitely differentiable functions ƒ: [0,1] → R becomes a Fréchet space with the seminorms

\|f\|_k = \sup\{|f^{(k)}(x)|: x \in [0,1]\}

for every non-negative integer k. Here, ƒ^(k) denotes the k-th derivative of ƒ, and ƒ⁽⁰⁾ = ƒ.

In this Fréchet space, a sequence (ƒ_n) of functions converges towards the element ƒ of C^∞([0, 1]) if and only if for every non-negative integer k, the sequence (

f_n^{(k)}

) converges uniformly towards ƒ^(k).

The vector space C^∞(R) of all infinitely differentiable functions ƒ: R → R becomes a Fréchet space with the seminorms

\|f\|_{k, n} = \sup \{ |f^{(k)}(x)| : x \in [-n, n] \}

for all integers k, n ≥ 0.

The vector space C^m(R) of all m-times continuously differentiable functions ƒ: R → R becomes a Fréchet space with the seminorms

\|f\|_{k, n} = \sup \{ |f^{(k)}(x)| : x \in [-n, n] \}

for all integers n ≥ 0 and k=0, ...,m.

Let H be the space of entire (everywhere holomorphic) functions on the complex plane. Then the family of seminorms

\|f\|_{n} = \sup \{ |f(z)| : |z| \le n \}

makes H into a Fréchet space.

Let H be the space of entire (everywhere holomorphic) functions of exponential type τ. Then the family of seminorms

\|f\|_{n} = \sup_{z \in \mathbb{C}} \exp \left[-\left(\tau + \frac{1}{n}\right)|z|\right]|f(z)|

makes H into a Fréchet space.

If M is a compact C^∞-manifold and B is a Banach space, then the set C^∞(M, B) of all infinitely-often differentiable functions ƒ: M → B can be turned into a Fréchet space by using as seminorms the suprema of the norms of all partial derivatives. If M is a (not necessarily compact) C^∞-manifold which admits a countable sequence K_n of compact subsets, so that every compact subset of M is contained in at least one K_n, then the spaces C^m(M, B) and C^∞(M, B) are also Fréchet space in a natural manner.

In fact, every smooth finite-dimensional manifold M can be made into such a nested union of compact subsets. Equip it with a Riemannian metric g which induces a metric d(x, y), choose x in M, and let

K_n = \{y \in M | d(x,y) \le n \}

Let M be a compact C^∞-manifold and V a vector bundle over M. Let C^∞(M, V) denote the space of smooth sections of V over X. Choose Riemannian metrics and connections, which are guaranteed to exist, on the bundles TX and V. If s is a section, denote its jth covariant derivative by D^js. Then

\|s\|_n = \sum_{j=0}^n \sup_{x\in M}|D^js|

(where |⋅| is the norm induced by the Riemannian metric) is a family of seminorms making C^∞(M, V) into a Fréchet space.

The space R^ω of all real valued sequences becomes a Fréchet space if we define the k-th semi-norm of a sequence to be the absolute value of the k-th element of the sequence. Convergence in this Fréchet space is equivalent to element-wise convergence.

Not all vector spaces with complete translation-invariant metrics are Fréchet spaces. An example is the space L^p([0, 1]) with p < 1. This space fails to be locally convex. It is a F-space.

Properties and further notions

If a Fréchet space admits a continuous norm, we can take all the seminorms to be norms by adding the continuous norm to each of them. A Banach space, C^∞([a,b]), C^∞(X, V) with X compact, and H all admit norms, while R^ω and C(R) do not.

A closed subspace of a Fréchet space is a Fréchet space. A quotient of a Fréchet space by a closed subspace is a Fréchet space. The direct sum of a finite number of Fréchet spaces is a Fréchet space.

Several important tools of functional analysis which are based on the Baire category theorem remain true in Fréchet spaces; examples are the closed graph theorem and the open mapping theorem.

All Fréchet spaces are stereotype. In the theory of stereotype spaces Fréchet spaces are dual objects to Brauner spaces.

Differentiation of functions

Main article: Differentiation in Fréchet spaces

If X and Y are Fréchet spaces, then the space L(X,Y) consisting of all continuous linear maps from X to Y is not a Fréchet space in any natural manner. This is a major difference between the theory of Banach spaces and that of Fréchet spaces and necessitates a different definition for continuous differentiability of functions defined on Fréchet spaces, the Gâteaux derivative:

Suppose X and Y are Fréchet spaces, U is an open subset of X, P: U → Y is a function, x ∈ U and h ∈ X. We say that P is differentiable at x in the direction h if the limit

D(P)(x)(h) = \lim_{t\to 0} \,\frac{1}{t}\Big(P(x+th)-P(x)\Big)

exists. We call P continuously differentiable in U if

D(P):U\times X \to Y

is continuous. Since the product of Fréchet spaces is again a Fréchet space, we can then try to differentiate D(P) and define the higher derivatives of P in this fashion.

The derivative operator P : C^∞([0,1]) → C^∞([0,1]) defined by P(ƒ) = ƒ′ is itself infinitely differentiable. The first derivative is given by

D(P)(f)(h) = h'

for any two elements ƒ and h in C^∞([0,1]). This is a major advantage of the Fréchet space C^∞([0,1]) over the Banach space C^k([0,1]) for finite k.

If P : U → Y is a continuously differentiable function, then the differential equation

x'(t) = P(x(t)),\quad x(0) = x_0\in U

need not have any solutions, and even if does, the solutions need not be unique. This is in stark contrast to the situation in Banach spaces.

The inverse function theorem is not true in Fréchet spaces; a partial substitute is the Nash–Moser theorem.

Fréchet manifolds and Lie groups

Main article: Fréchet manifold

One may define Fréchet manifolds as spaces that "locally look like" Fréchet spaces (just like ordinary manifolds are defined as spaces that locally look like Euclidean space Rⁿ), and one can then extend the concept of Lie group to these manifolds. This is useful because for a given (ordinary) compact C^∞ manifold M, the set of all C^∞ diffeomorphisms ƒ: M → M forms a generalized Lie group in this sense, and this Lie group captures the symmetries of M. Some of the relations between Lie algebras and Lie groups remain valid in this setting.

Generalizations

If we drop the requirement for the space to be locally convex, we obtain F-spaces: vector spaces with complete translation-invariant metrics.

LF-spaces are countable inductive limits of Fréchet spaces.

References

Conway, John B. (1990), A Course in Functional Analysis, Graduate Texts in Mathematics, 96 (2nd ed.), Springer, ISBN 0-387-97245-5
Hazewinkel, Michiel, ed. (2001), "Fréchet space", Encyclopedia of Mathematics, Springer, ISBN 978-1-55608-010-4
Rudin, Walter (1991), Functional Analysis, McGraw-Hill Science/Engineering/Math, ISBN 978-0-07-054236-5
Treves, François (1967), Topological vector spaces, distributions and kernels, Boston, MA: Academic Press

Functional analysis

Set / subset types	Absolutely convex Absorbing Balanced Bounded Convex Radial Star-shaped Symmetric Linear cone (subset) Convex cone (subset)

TVS types	Banach Barrelled Bornological Brauner F-space Finite-dimensional Fréchet (tame) Hilbert LF-space Locally convex Mackey Montel Nuclear Normed (norm) Quasinormed Reflexive Riesz Smith Stereotype Webbed Topological tensor product (of Hilbert spaces)

Mapping topologies	Dual Dual space Operator Ultraweak Weak (operator) Mackey Strong (polar operator) Ultrastrong Uniform convergence

Linear operators	Adjoint Bilinear (form) Bounded / Unbounded Closed Continuous / Discontinuous Compact Fredholm Hilbert–Schmidt Functionals (positive) Normal Nuclear Self-adjoint Strictly singular Trace class Transpose Unitary

Set operations	Algebraic interior (core) Interior Minkowski addition Polar

Operator theory	Banach algebras C-algebras Spectrum (C-algebra radius) Spectral theory (of ODEs Spectral theorem) Polar decomposition Singular value decomposition

Theorems	Banach–Alaoglu Banach–Saks Banach–Mazur Bessel's inequality Cauchy–Schwarz inequality Closed range Closed graph Eberlein–Šmulian Freudenthal spectral Gelfand–Mazur Goldstine Hahn–Banach (hyperplane separation) Kakutani fixed-point Lomonosov's invariant subspace Mackey–Arens Mazur's lemma M. Riesz extension Open mapping Parseval's identity Schauder fixed-point

Analysis	Bochner space Differentiation in Fréchet spaces Derivatives (Fréchet Gâteaux functional holomorphic) Integrals (Bochner Dunford Gelfand–Pettis regulated weak) Functional calculus (Borel continuous holomorphic) Inverse function theorem (Nash–Moser theorem) Vector measure Weakly measurable function

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