Mean curvature functions of codimension-one foliations. II.
Gen-Ichi Oshikiri (1991)
Commentarii mathematici Helvetici
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Gen-Ichi Oshikiri (1991)
Commentarii mathematici Helvetici
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Gen-ichi Oshikiri (1990)
Mathematische Zeitschrift
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Paul S. Schweitzer (1995)
Commentarii mathematici Helvetici
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Ronaldo Garcia, Rémi Langevin, Paweł Walczak (2015)
Annales Polonici Mathematici
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We study the global behavior of foliations of ellipsoids by curves making a constant angle with the lines of curvature.
Sue E. Goodman (1975)
Commentarii mathematici Helvetici
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William Thurston (1974)
Commentarii mathematici Helvetici
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Rachel Roberts (1995)
Commentarii mathematici Helvetici
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J. Barbosa, K. Kenmotsu, G. Oshikiri (1991)
Mathematische Zeitschrift
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Konrad Blachowski (2002)
Annales Polonici Mathematici
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We study nontaut codimension one foliations on closed Riemannian manifolds. We find an estimate of some constant derived from the mean curvature function of the leaves of a foliation by some isoperimetric constant of the manifold. Moreover, for foliated 2-tori and the 3-dimensional unit sphere, we find the infimum of the former constants for all nontaut codimension one foliations.
Shigenori Matsumoto (1993)
Commentarii mathematici Helvetici
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John Cantwell, Lawrence Conlon (1989)
Commentarii mathematici Helvetici
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Adam Bartoszek, Jerzy Kalina, Antoni Pierzchalski (2010)
Bulletin of the Polish Academy of Sciences. Mathematics
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A Weitzenböck formula for SL(q)-foliations is derived. Its linear part is a relative trace of the relative curvature operator acting on vector valued forms.
Chaouch, Mohamed A. (2007)
Balkan Journal of Geometry and its Applications (BJGA)
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