Fiber bundle
English
Alternative forms
Etymology
Coined as Template:M by American mathematician Template:W in 1951, The Topology of Fibre Bundles. The related usages Template:M and Template:M probably derive (as calques respectively of German Template:M and Template:M) from 1933, Template:W, “Topologie dreidimensionaler gefaserter Räume,” Acta Mathematica, 60, (1933), 147-238.[1][2]
Noun
- Template:Lb An abstract object in topology where copies of one object are "attached" to every point of another, as hairs or fibers are attached to a hairbrush. Formally, a topological space E (called the total space), together with a topological space B (called the base space), a topological space F (called the fiber), and surjective map from E to B (called the projection or submersion), such that every point of B has a neighborhood U with homeomorphic to the product space U F (that is, E looks locally the same as the product space B F, although its global structure may be quite different).
Usage notes
Properly, a fiber bundle is either the tuple (E,,B), the tuple (E,,B,F), or the map alone (which formally contains E and B in its definition). Sometimes, by ˞˞˞˞abuse of notation, E maybe referred to as a fiber bundle.
Hypernyms
Hyponyms
Meronyms
Translations
- Catalan: Template:T
- Finnish: Template:T
- German: Template:T
- Korean: Template:T
- Portuguese: Template:T
See also
References
Further reading
- Template:Pedia
- fiber bundle on Template:W
- Fiber Bundle on Template:W
- Fibre space on Template:W
- Bundle on Template:W
- 1951, Template:W, The Topology of Fibre Bundles, Template:W Template:Qualifier