Jump to content

Main menu Navigation ●Main page ●Contents ●Current events ●Random article ●About Wikipedia ●Contact us ●Donate Contribute ●Help ●Learn to edit ●Community portal ●Recent changes ●Upload file

●Create account ●Log in ●Create account ● Log in Pages for logged out editors learn more ●Contributions ●Talk

(Top) 1 Fort space 2 Modified Fort space 3 Fortissimo space 4 See also 5 Notes 6 References

Fort space

●Français Edit links ●Article ●Talk ●Read ●Edit ●View history Tools Actions ●Read ●Edit ●View history General ●What links here ●Related changes ●Upload file ●Special pages ●Permanent link ●Page information ●Cite this page ●Get shortened URL ●Download QR code ●Wikidata item Print/export ●Download as PDF ●Printable version Appearance From Wikipedia, the free encyclopedia

In mathematics, there are a few topological spaces named after M. K. Fort, Jr.

Fort space[edit]

Fort space^[1] is defined by taking an infinite set X, with a particular point pinX, and declaring open the subsets AofX such that:

A does not contain p, or
A contains all but a finite number of points of X.

The subspace $X\setminus \{p\}$ has the discrete topology and is open and dense in X. The space Xishomeomorphic to the one-point compactification of an infinite discrete space.

Modified Fort space[edit]

Modified Fort space^[2] is similar but has two particular points. So take an infinite set X with two distinct points p and q, and declare open the subsets AofX such that:

A contains neither p nor q, or
A contains all but a finite number of points of X.

The space X is compact and T₁, but not Hausdorff.

Fortissimo space[edit]

Fortissimo space^[3] is defined by taking an uncountable set X, with a particular point pinX, and declaring open the subsets AofX such that:

A does not contain p, or
A contains all but a countable number of points of X.

The subspace $X\setminus \{p\}$ has the discrete topology and is open and dense in X. The space X is not compact, but it is a Lindelöf space. It is obtained by taking an uncountable discrete space, adding one point and defining a topology such that the resulting space is Lindelöf and contains the original space as a dense subspace. Similarly to Fort space being the one-point compactification of an infinite discrete space, one can describe Fortissimo space as the one-point Lindelöfication^[4] of an uncountable discrete space.

Notes[edit]

^ Steen & Seebach, Examples #23 and #24

^ Steen & Seebach, Example #27

^ Steen & Seebach, Example #25

^ "One-point Lindelofication".

References[edit]

M. K. Fort, Jr. "Nested neighborhoods in Hausdorff spaces." American Mathematical Monthly vol.62 (1955) 372.
Steen, Lynn Arthur; Seebach, J. Arthur Jr. (1995) [1978], Counterexamples in Topology (Dover reprint of 1978 ed.), Berlin, New York: Springer-Verlag, ISBN 978-0-486-68735-3, MR 0507446

Retrieved from "https://en.wikipedia.org/w/index.php?title=Fort_space&oldid=1191493248" Category: ●Topological spaces Hidden categories: ●Articles with short description ●Short description is different from Wikidata ●Pages displaying short descriptions of redirect targets via Module:Annotated link ●This page was last edited on 23 December 2023, at 22:29 (UTC). ●Text is available under the Creative Commons Attribution-ShareAlike License 4.0; additional terms may apply. By using this site, you agree to the Terms of Use and Privacy Policy. Wikipedia® is a registered trademark of the Wikimedia Foundation, Inc., a non-profit organization. ●Privacy policy ●About Wikipedia ●Disclaimers ●Contact Wikipedia ●Code of Conduct ●Developers ●Statistics ●Cookie statement ●Mobile view