fibered

The result is a new fibered manifold where all the fibers except two are connected.

For categories with fibered products, there is a converse.

The virtually fibered conjecture was not actually conjectured by Thurston.

Every differentiable covering space is a fibered manifold with discrete fiber.

The raw material is long fibered softwood fluff pulp in roll form.

Then the fibered manifold is a fiber bundle in tori .

In 2009 he announced a solution to the virtually fibered conjecture for cusped hyperbolic 3-manifolds.

No fibered 2-bridge knot can be Lissajous.

The figure-eight knot is also a fibered knot.

The fibered product of two projective spaces is projective.

It follows from this that the fibered product of projective varieties is also projective.

An arithmetic surface is then a regular fibered surface over a Dedekind scheme of dimension one.

Fibered knots and links arise naturally, but not exclusively, in complex algebraic geometry.

One gets immediately that in this situation also satisfies the fibered isomorphism conjecture for the family .

Let be a fibered manifold.

Suppose every group satisfies the (fibered) isomorphism conjecture with respect to the family .

Then also H"' satisfies the fibered isomorphism conjecture for the family .

In general, a fibered manifold needs not to be a fiber bundle: different fibers may have different topologies.

A fibered manifold admits fiber charts.

A fibered manifold is a fiber bundle if and only if it admits such an Ehresmann connection.

Taken together with Daniel Wise's results, this implies the virtually fibered conjecture for all closed hyperbolic 3-manifolds.

In this setting, the tensor product become a fibered coproduct in the category of R-algebras.

The Hopf link is a fibered link.

Locally trivial fibered manifolds are fiber bundles.

Given a fibered manifold , let be a morphism and the pullback bundle of by .