Kolmogorov's normability criterion explained

In mathematics, Kolmogorov's normability criterion is a theorem that provides a necessary and sufficient condition for a topological vector space to be ; that is, for the existence of a norm on the space that generates the given topology.^[1] ^[2] The normability criterion can be seen as a result in same vein as the Nagata–Smirnov metrization theorem and Bing metrization theorem, which gives a necessary and sufficient condition for a topological space to be metrizable. The result was proved by the Russian mathematician Andrey Nikolayevich Kolmogorov in 1934.^[3] ^[4] ^[5]

Statement of the theorem

Because translation (that is, vector addition) by a constant preserves the convexity, boundedness, and openness of sets, the words "of the origin" can be replaced with "of some point" or even with "of every point".

Definitions

It may be helpful to first recall the following terms:

A (TVS) is a vector space

equipped with a topology

\tau

such that the vector space operations of scalar multiplication and vector addition are continuous.

A topological vector space

(X,\tau)

is called if there is a norm

\| ⋅ \|:X\to\R

such that the open balls of the norm

\| ⋅ \|

generate the given topology

\tau.

(Note well that a given normable topological vector space might admit multiple such norms.)

is called a if, for every two distinct points

x,y\inX,

there is an open neighbourhood

U_x

that does not contain

In a topological vector space, this is equivalent to requiring that, for every

x ≠ 0,

there is an open neighbourhood of the origin not containing

Note that being T₁ is weaker than being a Hausdorff space, in which every two distinct points

x,y\inX

admit open neighbourhoods

U_x

and

U_y

with

U_x\capU_y=\varnothing

; since normed and normable spaces are always Hausdorff, it is a "surprise" that the theorem only requires T₁.

A subset

of a vector space

is a if, for any two points

x,y\inA,

the line segment joining them lies wholly within

that is, for all

0\leqt\leq1,

(1-t)x+ty\inA.

A subset

of a topological vector space

(X,\tau)

is a if, for every open neighbourhood

of the origin, there exists a scalar

so that

A\subseteqλU.

(One can think of

as being "small" and

as being "big enough" to inflate

to cover

)

Notes and References

Book: Applied Nonlinear Functional Analysis: An Introduction. Nikolaos S.. Papageorgiou. Patrick. Winkert. Walter de Gruyter. 2018. 9783110531831. Theorem 3.1.41 (Kolmogorov's Normability Criterion).
Book: Edwards, R. E.. Functional Analysis: Theory and Applications. Dover Books on Mathematics. Courier Corporation. 2012. 9780486145105. Section 1.10.7: Kolmagorov's Normability Criterion. 85–86. https://books.google.com/books?id=fdhi90F0HvcC&pg=PA85.
Book: Berberian, Sterling K.. Lectures in Functional Analysis and Operator Theory. Graduate Texts in Mathematics, No. 15. Springer-Verlag. New York-Heidelberg. 1974. 0387900802.
Kolmogorov. A. N.. Zur Normierbarkeit eines allgemeinen topologischen linearen Räumes. Studia Math.. 5. 1934.
Book: Tikhomirov, Vladimir M.. Geometry and approximation theory in A. N. Kolmogorov's works. Kolmogorov's Heritage in Mathematics. limited. 151 - 176. Springer. Berlin. 2007. 10.1007/978-3-540-36351-4_8. Charpentier, Éric. Lesne, Annick. Nikolski, Nikolaï K.. (See Section 8.1.3)