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Let $ℱ$ be a transversely orientable transversely real-analytic codimension one minimal foliation of a paracompact manifold $M$ . We show that if the fundamental group of each leaf of $ℱ$ is isomorphic to $Z$ , then $ℱ$ is without holonomy. We also show that if $π_{2} (M) ≅ 0$ and the fundamental group of each leaf of $ℱ$ is isomorphic to $Z^{k}$ ( $k \in Z_{\geq 0}$ ), then $ℱ$ is without holonomy.

Codimension one symplectic foliations.

Omegar Calvo, Vicente Muñoz, Francisco Presas (2005)

Revista Matemática Iberoamericana

We define the concept of symplectic foliation on a symplectic manifold and provide a method of constructing many examples, by using asymptotically holomorphic techniques.

Cohomologie basique et dualité des feuilletages riemanniens

Vlad Sergiescu (1985)

Annales de l'institut Fourier

Nous démontrons des théorèmes de dualité de Poincaré et de de Rham pour la cohomologie basique et l’homologie des courants transverses invariants d’un feuilletage riemannien.

Complétude des deux-tores lorentziens

Yves Carrière, Luc Rozoy (1993/1994)

Séminaire de théorie spectrale et géométrie

Complétude et flots nul-géodésibles en géométrie lorentzienne

Pierre Mounoud (2004)

Bulletin de la Société Mathématique de France

On étudie la complétude géodésique des flots nul-prégéodésiques sur les variétés lorentziennes compactes, ce qui donne une obstruction à être nul-géodésique. On montre que lorsque l’orthogonal du champ de vecteurs engendrant le flot considéré s’intègre en un feuilletage $ℱ$ , la complétude du flot se lit sur l’holonomie de $ℱ$ . On montre ainsi qu’il n’existe pas de flots nul-géodésiques lisses sur $S^{3}$ . On montre aussi qu’un $2$ -tore lorentzien est nul-complet si et seulement si ses feuilletages de type lumière...

Constancy of maps into $f$ -manifolds and pseudo $f$ -manifolds.

Erdem, Sadettin (2007)

Beiträge zur Algebra und Geometrie

Controlled constructions of Reeb fields and applications. (Constructions contrôlées de champs de Reeb et applications.)

Colin, Vincent, Honda, Ko (2005)

Geometry & Topology

Correspondence between diffeomorphism groups and singular foliations

Tomasz Rybicki (2012)

Annales Polonici Mathematici

It is well-known that any isotopically connected diffeomorphism group G of a manifold determines a unique singular foliation $ℱ_{G}$ . A one-to-one correspondence between the class of singular foliations and a subclass of diffeomorphism groups is established. As an illustration of this correspondence it is shown that the commutator subgroup [G,G] of an isotopically connected, factorizable and non-fixing $C^{r}$ diffeomorphism group G is simple iff the foliation $ℱ_{[G, G]}$ defined by [G,G] admits no proper minimal sets....

Cosymplectic and α-cosymplectic Lie algebras

Giovanni Calvaruso, Antonella Perrone (2016)

Complex Manifolds

Courbure totale des feuilletages des surfaces.

Gilbert Levitt, Rémi Langevin (1982)

Commentarii mathematici Helvetici

De Rham Decomposition of Affinely connected manifolds.

Thomas Meumertzheim (1990)

Manuscripta mathematica

De Rham decomposition theorems for foliated manifolds

Robert A. Blumenthal, James J. Hebda (1983)

Annales de l'institut Fourier

We prove that if $M$ is a complete simply connected Riemannian manifold and $F$ is a totally geodesic foliation of $M$ with integrable normal bundle, then $M$ is topologically a product and the two foliations are the product foliations. We also prove a decomposition theorem for Riemannian foliations and a structure theorem for Riemannian foliations with recurrent curvature.

De Rham-Hodge Theory for Riemannian Foliations.

F.W. Kamber, P. Tondeur (1987)

Mathematische Annalen

Decomposition theorems in differential geometry.

Reckziegel, H., Schaaf, M. (1997)

General Mathematics

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