F-space

In functional analysis, an F-space is a vector space V over the real or complex numbers together with a metric $d : V \times V \to ℝ$ so that

Scalar multiplication in V is continuous with respect to d and the standard metric on ℝ or ℂ.
Addition in V is continuous with respect to d.
The metric is translation-invariant; i.e., $d (x + a, y + a) = d (x, y)$ for all x, y and a in V
The metric space $(V, d)$ is complete.

The operation x ↦ ||x|| := d(0,x) is called an F-norm, although in general an F-norm is not required to be complete. By translation-invariance, the metric is recoverable from the F-norm. Thus, a real or complex F-space is equivalently a real or complex vector space equipped with a complete F-norm.

Some authors use the term Fréchet space rather than F-space, but usually the term "Fréchet space" is reserved for locally convex F-spaces. Some other authors use the term "F-space" as a synonym of "Fréchet space", by which they mean a locally convex complete metrizable TVSs. The metric may or may not necessarily be part of the structure on an F-space; many authors only require that such a space be metrizable in a manner that satisfies the above properties.

Examples

All Banach spaces and Fréchet spaces are F-spaces. In particular, a Banach space is an F-space with an additional requirement that $d (αx, 0) = |α|\cdot d (x, 0)$ .[1]

The L^p spaces can be made into F-spaces for all p ≥ 0 and for p ≥ 1 they can be made into locally convex and thus Fréchet spaces and even Banach spaces.

Example 1

$\scriptstyle L^{\frac {1}{2}}[0,\,1]$ is an F-space. It admits no continuous seminorms and no continuous linear functionals — it has trivial dual space.

Example 2

Let $\scriptstyle W_{p}(\mathbb {D} )$ be the space of all complex valued Taylor series

f(z)=\sum _{n\geq 0}a_{n}z^{n}

on the unit disc $\scriptstyle \mathbb {D}$ such that

\sum _{n}|a_{n}|^{p}<\infty

then (for 0 < p < 1) $\scriptstyle W_{p}(\mathbb {D} )$ are F-spaces under the p-norm:

\|f\|_{p}=\sum _{n}|a_{n}|^{p}\qquad (0<p<1)

In fact, $\scriptstyle W_{p}$ is a quasi-Banach algebra. Moreover, for any $\scriptstyle \zeta$ with $\scriptstyle |\zeta |\;\leq \;1$ the map $\scriptstyle f\,\mapsto \,f(\zeta )$ is a bounded linear (multiplicative functional) on $\scriptstyle W_{p}(\mathbb {D} )$ .

Sufficient conditions

Theorem[2][3] (Klee) — Let $d$ be any[note 1] metric on a vector space $X$ such that the topology $𝜏$ induced by $d$ on $X$ makes $(X, 𝜏)$ into a topological vector space. If $(X, d)$ is a complete metric space then $(X, 𝜏)$ is a complete-TVS.

Related properties

A linear almost continuous map into an F-space whose graph is closed is continuous.[4]
A linear almost open map into an F-space whose graph is closed is necessarily an open map.[4]
A linear continuous almost open map from an F-space is necessarily an open map.[5]
A linear continuous almost open map from an F-space whose image is of the second category in the codomain is necessarily a surjective open map.[4]

References

Not assume to be translation-invariant.

Dunford N., Schwartz J.T. (1958). Linear operators. Part I: general theory. Interscience publishers, inc., New York. p. 59
Schaefer & Wolff 1999, p. 35.
Klee, V. L. (1952). "Invariant metrics in groups (solution of a problem of Banach)" (PDF). Proc. Amer. Math. Soc. 3 (3): 484–487. doi:10.1090/s0002-9939-1952-0047250-4.
Husain 1978, p. 14.
Husain 1978, p. 15.

Husain, Taqdir (1978). Barrelledness in topological and ordered vector spaces. Berlin New York: Springer-Verlag. ISBN 3-540-09096-7. OCLC 4493665.
Khaleelulla, S. M. (1982). Counterexamples in Topological Vector Spaces. Lecture Notes in Mathematics. 936. Berlin, Heidelberg, New York: Springer-Verlag. ISBN 978-3-540-11565-6. OCLC 8588370.
Rudin, Walter (1966), Real & Complex Analysis, McGraw-Hill, ISBN 0-07-054234-1
Schaefer, Helmut H.; Wolff, Manfred P. (1999). Topological Vector Spaces. GTM. 8 (Second ed.). New York, NY: Springer New York Imprint Springer. ISBN 978-1-4612-7155-0. OCLC 840278135.

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[4] Not assume to be translation-invariant.

[1] Dunford N., Schwartz J.T. (1958). Linear operators. Part I: general theory. Interscience publishers, inc., New York. p. 59

[FOOTNOTESchaeferWolff199935-2] Schaefer & Wolff 1999, p. 35.

[Klee_Inv_metrics-3] Klee, V. L. (1952). "Invariant metrics in groups (solution of a problem of Banach)" (PDF). Proc. Amer. Math. Soc. 3 (3): 484–487. doi:10.1090/s0002-9939-1952-0047250-4.

[FOOTNOTEHusain197814-5] Husain 1978, p. 14.

[FOOTNOTEHusain197815-6] Husain 1978, p. 15.

Topological vector spaces (TVSs)
Basic concepts	Banach space Continuous linear operator Functionals Hilbert space Linear operators Locally convex space Homomorphism Topological vector space Vector space
Main results	Closed graph theorem F. Riesz's theorem Hahn–Banach (hyperplane separation Vector-valued Hahn–Banach) Open mapping (Banach–Schauder) (Bounded inverse) Uniform boundedness (Banach–Steinhaus)
Maps	Almost open Bilinear (form operator) and Sesquilinear forms Closed Compact operator Continuous and Discontinuous Linear maps Densely defined Homomorphism Functionals Norm Operator Seminorm Sublinear Transpose
Types of sets	Absolutely convex/disk Absorbing/Radial Affine Balanced/Circled Banach disks Bounding points Bounded Complemented subspace Convex Convex cone (subset) Linear cone (subset) Extreme point Pre-compact/Totally bounded Radial Radially convex/Star-shaped Symmetric
Set operations	Affine hull (Relative) Algebraic interior (core) Convex hull Linear span Minkowski addition Polar (Quasi) Relative interior
Types of TVSs	Asplund B-complete/Ptak Banach (Countably) Barrelled (Ultra-) Bornological Brauner Complete (DF)-space Distinguished F-space Fréchet (tame Fréchet) Grothendieck Hilbert Infrabarreled Interpolation space LB-space LF-space Locally convex space Mackey (Pseudo)Metrizable Montel Quasibarrelled Quasi-complete Quasinormed (Polynomially Semi-) Reflexive Riesz Schwartz Semi-complete Smith Stereotype (B Strictly Uniformly convex (Quasi-) Ultrabarrelled Uniformly smooth Webbed With the approximation property