The geometry of ℝ–covered foliations

Calegari, Danny

doi:10.2140/gt.2000.4.457

Geodesic

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The geometry of ℝ–covered foliations

Calegari, Danny ¹

¹ Department of Mathematics, Harvard University, Cambridge, Massachusetts 02138, USA

Geometry & topology, Tome 4 (2000) no. 1, pp. 457-515.

Voir la notice de l'article provenant de la source Mathematical Sciences Publishers

Résumé

We study $ℝ$ –covered foliations of 3–manifolds from the point of view of their transverse geometry. For an $ℝ$ –covered foliation in an atoroidal 3–manifold $M$ , we show that $\tilde{M}$ can be partially compactified by a canonical cylinder $S_{univ}^{1} \times ℝ$ on which $π_{1} (M)$ acts by elements of $Homeo (S^{1}) \times Homeo (ℝ)$ , where the $S^{1}$ factor is canonically identified with the circle at infinity of each leaf of $\tilde{ℱ}$ . We construct a pair of very full genuine laminations $Λ^{\pm}$ transverse to each other and to $ℱ$ , which bind every leaf of $ℱ$ . This pair of laminations can be blown down to give a transverse regulating pseudo-Anosov flow for $ℱ$ , analogous to Thurston’s structure theorem for surface bundles over a circle with pseudo-Anosov monodromy.

A corollary of the existence of this structure is that the underlying manifold $M$ is homotopy rigid in the sense that a self-homeomorphism homotopic to the identity is isotopic to the identity. Furthermore, the product structures at infinity are rigid under deformations of the foliation $ℱ$ through $ℝ$ –covered foliations, in the sense that the representations of $π_{1} (M)$ in $Homeo ({(S_{univ}^{1})}_{t})$ are all conjugate for a family parameterized by $t$ . Another corollary is that the ambient manifold has word-hyperbolic fundamental group.

Finally we speculate on connections between these results and a program to prove the geometrization conjecture for tautly foliated 3–manifolds.

DOI : 10.2140/gt.2000.4.457

Keywords: taut foliation, $\mathbb{R}$–covered, genuine lamination, regulating flow, pseudo-Anosov, geometrization

Affiliations des auteurs :

Calegari, Danny ¹

¹ Department of Mathematics, Harvard University, Cambridge, Massachusetts 02138, USA

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Calegari, Danny. The geometry of ℝ–covered foliations. Geometry & topology, Tome 4 (2000) no. 1, pp. 457-515. doi : 10.2140/gt.2000.4.457. http://geodesic.mathdoc.fr/articles/10.2140/gt.2000.4.457/

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