Mathematische Annalen

, Volume 292, Issue 1, pp 103–109 | Cite as

A functional relation in stable knot theory

  • John R. Klein


Functional Relation 
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    Farber, M.S.: Isotopy types of knots of codimension two. Trans. Am. Math. Soc.261, 185–205 (1980)Google Scholar
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    Ganea, T.: Induced fibrations and cofibrations. Trans. Am. Math. Soc.127, 442–459 (1967)Google Scholar
  3. [K]
    Klein, J.: On the homotopy embeddability of complexes in Euclidean space. I. The weak thickening theorem (Preprint)Google Scholar
  4. [K-S]
    Klein, J., Suciu, A.: Inequivalent knots with isometric homotopy Seifert pairings. Math. Ann.289, 683–701 (1991)Google Scholar
  5. [R]
    Richter, W.: Unpublished manuscriptGoogle Scholar
  6. [W]
    Wall, C.T.C.: Surgery on compact manifolds. New York: Academic Press 1970Google Scholar

Copyright information

© Springer-Verlag 1992

Authors and Affiliations

  • John R. Klein
    • 1
  1. 1.Fachbereich MathematikUniversität Gesamthochschule SiegenSiegenFederal Republic of Germany

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