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On stability of 3-manifolds

Tom 182 / 2004

S/lawomir Kwasik, Witold Rosicki Fundamenta Mathematicae 182 (2004), 169-180 MSC: Primary 58R80, 57S25. DOI: 10.4064/fm182-2-6

Streszczenie

We address the following question: How different can closed, oriented $3$-manifolds be if they become homeomorphic after taking a product with a sphere?

For geometric $3$-manifolds this paper provides a complete answer to this question. For possibly non-geometric $3$-manifolds, we establish results which concern $3$-manifolds with finite fundamental group (i.e., $3$-dimensional fake spherical space forms) and compare these results with results involving fake spherical space forms of higher dimensions.

Autorzy

  • S/lawomir KwasikDepartment of Mathematics
    Tulane University
    New Orleans, LA 70118, U.S.A.
    e-mail
  • Witold RosickiDepartment of Mathematics
    Gdańsk University
    Wita Stwosza 57
    80-952 Gdańsk, Poland
    e-mail

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