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References
[L1]Levine, J.,An algebraic classification of some knots of codimension two, Comment. Math. Helv.45 (1970), 185–198.
[L2]Levine, J.,Knot cobordism groups in codimension two Comment. Math. Helv.44 (1969), 229–244.
[L3]Levine, J.,Finiteness of symplectic class number and an application to knot theory (preprint).
[L4]Levine, J.,Unknotting spheres in codimension two, Topology4 (1965), 9–16.
[M]Milnor, J.,On isometries of inner product spaces, Inventiones math.8 (1969), 83–97.
[M-H]Milnor, J. etHusemoller, D.,Symmetric bilinear forms, Springer-Verlag
[O]O'Meara, O. T. Introduction to quadratic forms, Springer-Verlag
[S]Swan, Richard G. K-theory of finite groups and orders, Springer-Verlag
[T1]Trotter, H. F..Homology of group systems with applications to knot theory, Ann. Math.76 (1962), 464–498.
[T2]Trotter, H.F.,On S-equivalence of Seifert matrices, Inventiones math.20 (1973), 173–207.
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Cet article contient l'essentiel de la thèse des auteurs soutenue à l'Université de Genève.
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Bayer, E., Michel, F. Finitude du nombre des classes d'isomorphisme des structures isometriques entières. Commentarii Mathematici Helvetici 54, 378–396 (1979). https://doi.org/10.1007/BF02566282
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DOI: https://doi.org/10.1007/BF02566282