Tychonoff cube explained

In mathematics, more specifically in general topology, the Tychonoff cube is the generalization of the unit cube from the product of a finite number of unit intervals to the product of an infinite, even uncountable number of unit intervals. The Tychonoff cube is named after Andrey Tychonoff, who first considered the arbitrary product of topological spaces and who proved in the 1930s that the Tychonoff cube is compact. Tychonoff later generalized this to the product of collections of arbitrary compact spaces. This result is now known as Tychonoff's theorem and is considered one of the most important results in general topology.

Definition

Let

I

denote the unit interval

[0,1]

. Given a cardinal number

\kappa\geq\aleph0

, we define a Tychonoff cube of weight

\kappa

as the space

I\kappa

with the product topology, i.e. the product

\prods\inIs

where

\kappa

is the cardinality of

S

and, for all

s\inS

,

Is=I

.

The Hilbert cube,

\aleph0
I

, is a special case of a Tychonoff cube.

Properties

The axiom of choice is assumed throughout.

λ\leq\kappa

, the space

Iλ

is embeddable in

I\kappa

.

I\kappa

is a universal space for every compact space of weight

\kappa\geq\aleph0

.

I\kappa

is a universal space for every Tychonoff space of weight

\kappa\geq\aleph0

.

x\inI\kappa

is

\kappa

.

See also

[0,\omega1]

and

[0,\omega]

, where

\omega

is the first infinite ordinal and

\omega1

the first uncountable ordinal

References

This article is licensed under the GNU Free Documentation License. It uses material from the Wikipedia article "Tychonoff cube".

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