Manifolds that induce approximate fibrations in the PL category
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Publication:1903003
DOI10.1016/0166-8641(95)00051-HzbMath0840.55011MaRDI QIDQ1903003
Publication date: 26 June 1996
Published in: Topology and its Applications (Search for Journal in Brave)
Quotient spaces, decompositions in general topology (54B15) Eilenberg-Mac Lane spaces (55P20) Generalizations of fiber spaces and bundles in algebraic topology (55R65)
Related Items (6)
PL fibrator properties of partially aspherical manifolds ⋮ Complex projective spaces as PL fibrators ⋮ Homology \(n\)-spheres as codimension-\((n+1)\) shape m\(_{\text{simpl}}\)-fibrators ⋮ Special manifolds and shape fibrator properties ⋮ Coperfectly Hopfian groups and shape fibrator's properties ⋮ Fibrator properties of manifolds
Cites Work
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- Piecewise linear approximate fibrations
- The topology of four-dimensional manifolds
- Decompositions and approximate fibrations
- An addendum to the Vietoris-Begle theorem
- Approximate fibrations
- Approximate fibrations and a movability condition for maps
- Ends of maps. I
- Cohopficity of 3-manifold groups
- Convergence groups and Seifert fibered 3-manifolds
- The PL fibrators among aspherical geometric 3-manifolds
- Decompositions into submanifolds that yield generalized manifolds
- Submanifold decompositions that induce approximate fibrations
- On proper surjections with locally trivial Leray sheaves
- Cell-like mappings. I
- Approximation of Approximate Fibrations by Bundle Maps
- PL Maps with Manifold Fibers
- Decompositions into Codimension-Two Manifolds
- Cohopficity of Seifert-Bundle Groups
- On a Theorem of C. B. Thomas
- The Geometries of 3-Manifolds
- Free Surfaces in S 3
- Finding Incompressible Surfaces in 3-Manifolds
- Coverings and Betti numbers
- Convergence groups are Fuchsian groups
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