Source: wikibot/seifert-weber-space
= Seifert–Weber space
{wiki=Seifert–Weber_space}
The Seifert-Weber space is a specific type of 3-manifold that can be constructed as a nontrivial example of a Seifert fibered space. It is particularly known for its interesting topological properties. In simpler terms, a Seifert fibered space is a 3-manifold that can be decomposed into a collection of circles (fibers) such that around each fiber, there is a well-defined surface that varies continuously.