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S-Equivalence et congruence de matrices de Seifert: Une conjecture de Trotter

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Inventiones mathematicae Aims and scope

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Bibliographie

  • [B-M] Bayer, E., Michel, F.: Finitude du nombre des classes d'isomorphisme des structures isométriques entières. Comment. Math. Helv, à paraître (1979)

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  • [L2] Levine, J.: Finiteness of symplectic class number and an application to knot theory, preprint

  • [T] Trotter, H.F.: OnS-equivalence of Seifert matrices. Inventiones Math.20, 173–207 (1973)

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  1. Section de mathematiques, Université de Genève, 2-4, rue du Lièvre, Case postale 124, CH-1211, Genève 24, Suisse

    Eva Bayer

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  1. Eva Bayer
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Bayer, E. S-Equivalence et congruence de matrices de Seifert: Une conjecture de Trotter. Invent Math 56, 97–99 (1980). https://doi.org/10.1007/BF01392543

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