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Bibliographie
[B]Bourbaki,Algèbre, chapitre 1, nouvelle édition, §7, no. 3, cor. de la proposition 5.
[G]Goodman, S.,On the structure of foliated 3-manifolds separated by a compact leaf, Inventiones Math.,39 (1977), 213–227.
[GP]Goodman, S. andPlante, J.,Holonomy and averaging in foliated sets, preprint.
[H]Haefliger, A.,Variétés feuilletées, Ann. scu. norm. sup., Pisa16 (1962), 367–397.
[M]Moussu, R., Thèse, Orsay, 1971, I, Théorème 1.2.
[MR]Moussu, R. andRoussarie, R.,Relations de conjugaison et de cobordisme entre certains feuilletages, Publ. Math. I.H.E.S.43 (1974), 143–168.
[N]Novikov, S. P.,Topology of foliations, Trans. Moscow Mt. Soc. (1965), 268–304.
[P]Plante, J.,Foliations with measure-preserving holonomy, Ann. of Math.102 (1975), cor. 7.4.
[R]Roussarie, R.,Plongements dans les variétés feuilletées et classification de feuilletages sans holonomie, Publ. Math. I.H.E.S.43 (1974), 101–141.
[R1]Roussarie, R.,Sur les feuilletages des variétés de dimension trois, Ann. Inst. Fourier21 (1971), 13–81.
[S]Schwartz, A. J.,A generalization of a Poincaré-Bendixson theorem to closed two-dimensional manifoelds, Amer. Jour. of Math.85 (1963), 453–458.
[T]Thurston, W.,Foliations of 3-manifolds which are circle bundles, Thesis, Berkeley, 1972.
[W]Wood, J.,Bundles with totally disconnected structure group, Comment. Math. Helv.46 (1971), 257–273.
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Levitt, G. Feuilletages des variétés de dimension 3 qui sont des fibrés en cercles. Commentarii Mathematici Helvetici 53, 572–594 (1978). https://doi.org/10.1007/BF02566099
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DOI: https://doi.org/10.1007/BF02566099