THE PL FIBRATORS AMONG GEOMETRIC 4-MANIFOLDS |
Kim, Yong-Kuk (Department of Mathematics Kyungpook National University) |
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Hyperhopfian groups and approximate fibrations
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Hyperbolic groups are hyperhopfian
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DOI |
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The Hopf property of free products
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DOI |
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Complex surfaces which are fibre bundles
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DOI ScienceOn |
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Remarks on geometric structures on compact complex surfaces
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DOI ScienceOn |
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Real projective spaces are nonfibrators.Special issue in memory of B.J.Ball
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DOI ScienceOn |
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Connected sums of 4-manifolds as codimension-k fibrators
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DOI |
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PL maps with manifold fibers
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DOI |
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Complex projective spaces as PL fibrators
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DOI ScienceOn |
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Four-manifolds,geometries and knots
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Residual finiteness for 3-manifolds,Combinatorial group theory and topology(Alta,Utah,1984)
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Submanifold decompositions that induce opproximate fibrations
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DOI ScienceOn |
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Codimension-2-fibrators with finite fundamental groups
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DOI ScienceOn |
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Hopfian and strongly hopfian manifolds
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Nontorus knot groups are hyper-Hopfian
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DOI |
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On 4-manifolds with universal covering space S² ×R² or S³×R
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DOI ScienceOn |
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Manifolds with hyperhopfian fundamental group as condimension-2 fibrators
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DOI ScienceOn |
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Geometric structures on compact complex analytic surfaces
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DOI ScienceOn |
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3-manifolds fibering over the Klein bottle and codimension 2 orientable fibrators
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DOI ScienceOn |
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The PL fibrators among aspherical geometric 3-manifolds
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DOI |
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Co-Hopficity of 3-manifold groups
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DOI ScienceOn |
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Strongly Hopfian manifolds as codimension-2 fibrators
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DOI ScienceOn |
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Geometric hopfian and non-hopfian situations
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3-manifolds with geometric structure and approximate fibrations
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DOI |
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On 4-dimensional mapping tori and product geometries
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DOI |
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PL fibrator properties of partially aspherical manifolds
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Manifolds that induce approximate fibrations in the PL category
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DOI ScienceOn |
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On the homotopy types of closed 4-manifolds covered by S² ×R²
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DOI ScienceOn |
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Necessary and sufficient conditions for s-Hopfian manifolds to be condimension-2 fibrators
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DOI ScienceOn |