Login Preferences
About News Publications Statistics Downloads API Guide License How to use Preferences
bn:00275152n
Noun Named Entity
Categories: Topology stubs, Theorems in differential topology, Articles with short description
EN
Whitney immersion theorem  Cohen immersion theorem  immersion conjecture
EN
In differential topology, the Whitney immersion theorem states that for m > 1 {\displaystyle m>1}, any smooth m {\displaystyle m} -dimensional manifold has a one-to-one immersion in Euclidean 2 m {\displaystyle 2m} -space, and a immersion in {\displaystyle } -space. Wikipedia
Definitions
Relations
Sources
EN
In differential topology, the Whitney immersion theorem states that for m > 1 {\displaystyle m>1}, any smooth m {\displaystyle m} -dimensional manifold has a one-to-one immersion in Euclidean 2 m {\displaystyle 2m} -space, and a immersion in {\displaystyle } -space. Wikipedia
On immersions of smooth m-dimensional manifolds in 2m-space and (2m-1) space Wikidata
IS A
theorem
DIFFERENT FROM
Whitney embedding theorem
NAMED AFTER
Hassler Whitney
Wikipedia
EN
Whitney immersion theorem
Wikidata
EN
Whitney immersion theorem
Wikipedia Redirections
EN
Cohen immersion theorem, immersion conjecture

Please note that, in order to improve your browsing experience on this website, BabelNet® uses various types of cookies, including: browsing functionality, performance and statistical cookies.

By continuing to browse the site you are agreeing to our use of cookies. OK

License