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Uniformly quasi-isometric foliations

Published online by Cambridge University Press:  19 September 2008

Mark Kellum
Mark Kellum
Affiliation:
Ecole Normale Supérieure de Lyon, 69364 Lyon, France and University of Maryland, College Park, Maryland, USA
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Abstract

Consider the natural action of 1-jets of the holonomy pseudogroup H on the transverse tangent bundle of a C1 compact foliated manifold (M, ℱ). If these 1-jets act in an equicontinuous way then it is possible to use a C1 ‘Ellis semi-group’ technique, as applied to a neighborhood of the identity in H, to produce a sheaf of compact local transformation groups whose orbits are the topological closures of leaves of ℱ. This action on the transverse manifold to ℱ then decomposes M into a union of minimal sets. These minimal sets we show to be C1 embedded submanifolds of M and the action of H on them is locally transitive.

Type
Research Article
Information
Ergodic Theory and Dynamical Systems , Volume 13 , Issue 1 , March 1993 , pp. 101 - 122
Copyright
Copyright © Cambridge University Press 1993

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References

REFERENCES

[Aus88]Auslander, J.. Minimal Flows and Their Extensions. North-Holland, Amsterdam, 1988.Google Scholar
[Car36]Cartan, H.. Sur les Groupes de Transformations Analyliques. Hermann, Paris, 1936.Google Scholar
[Cav87]Cavalier, V.. Feuilletages transversalment holomorphes, quasi-transversalment parallelisables. Thèse, Academie Montpellier, Université des Sciences et Techniques du Languedoc, Mont pellier, 1987.Google Scholar
[Chev46]Chevalley, C.. Theory of Lie Groups. Princton University Press, Princeton, NJ, 1946.Google Scholar
[DS89]Donaldson, S. K. & Sullivan, D. P.. Quasiconformal 4-manifolds. Acta Math. 163 (1989), 181252.CrossRefGoogle Scholar
[Ell69]Ellis, R.. Lectures on Topological Dynamics. W. A. Benjamin, New York, 1969.Google Scholar
[Eps]Epstein, D.. Problem session on foliations. 1CM Berkeley, 1986.Google Scholar
[ES56]Ehresmann, C. & Shih, W.. Sur les espaces feuilletés; théorème de stabilitè. C. R. Acad Sci. Paris, Série A, 243 (1956), 344346.Google Scholar
[Furst 63]Furstenberg, H.. The structure of distal flows. Amer. J. Math. 85 (1963), 477515.Google Scholar
[Ghy88]Ghys, E.. In: Riemannian Foliations (by P. Molino), Appendix E—Riemannian Foliations: Examples and Problems, pp. 297314. Birkhäuser, Boston, 1988.Google Scholar
[Gle52]Gleason, A.. Groups without small subgroups. Ann. Math. 56 (1952), 193212.CrossRefGoogle Scholar
[Hae62]Haefliger, A.. Variétés feuilletées. Ann. Scuola Norm. Sup. Pisa 16 (1962), 367397.Google Scholar
[Hae89]Haefliger, A.. Feuilletages riemanniens. In: Séminaire Bourbaki 707 (1989), 115.Google Scholar
[Hae84]Haefliger, A.. Pseudogroups of local isometries. Preprint, 1984.Google Scholar
[Herm]Herman, M.. Private communication.Google Scholar
[Jac57]Jacoby, R.. Some theorems on the structure of locally compact local groups. Ann. Math. 66 (1957), 3669.Google Scholar
[Kap71]Kaplansky, I.. Lie Algebras and Locally Compact Groups. The University of Chicago Press, Chicago and London, 1971.Google Scholar
[Karu66]Karube, T.. Transformation groups satisfying some local metric conditions. J. Math. Soc. Japan 18 (1966), 4550.Google Scholar
[Mk-Mk91]Keane, M. S. & Kellum, M.. On topologically Riemannian foliations. Preprint.Google Scholar
[Mk1-91]Kellum, M.. Stability for uniformly quasi-isometric foliations. Preprint.Google Scholar
[Mk2-92]Kellum, M.. Measurable orbit equivalence for uniformly Lipschitz foliations. Preprint.Google Scholar
[Kur50]Kuranishi, M.. On conditions of differentiability of locally compact groups. Nagoya Math. J. 1 (1950), 7181.Google Scholar
[Mol82]Molino, P.. Geométrie globale des feuilletages riemanniens. Ned. Akad. von Wet., Indag. Math. 85 (1982), 4576.Google Scholar
[Mon45]Montgomery, D.. Topological groups of differentiable transformations. Ann. Math. 46 (1945), 382387.CrossRefGoogle Scholar
[MZ55]Montgomery, D. & Zippin, L.. Topological Transformation Groups. Interscience Publishers, New York, 1955.Google Scholar
[Pon39]Pontryagin, L.. Topological Groups. Princeton University Press, Princeton, NJ, 1939.Google Scholar
[Ree52]Reeb, G.. Sur Certains Propriétés Topologiques des Variétés Feuilletées. Hermann, Paris, 1952.Google Scholar
[Rei59]Reinhart, B.. Foliated manifolds with bundle-like metrics. Ann. Math. 69 (1959), 119132.Google Scholar
[Sa65]Sacksteder, R.. Foliations and pseudogroups. Amer. J. Math. 87 (1965), 79102.Google Scholar
[Sal88]Salem, E.. Riemannian Foliations (by P. Molino), Appendix D—Riemannian Foliations and Pseudogroups of Isometries. Pp. 265296. Birkhäuser, Boston, 1988.Google Scholar
[Sul]Sullivan, D.. Private communication.Google Scholar
[Sul81]Sullivan, D.. On the ergodic theory at infinity of an arbitrary discrete group of hyperbolic motions. In: Riemann Surfaces and Related Topics; Proc. 1978 Stony Brook Conf. Pp 465496. Princeton University Press, Princeton, 1981.Google Scholar
[Sul83]Sullivan, D.. Conformal dynamical systems. In: Proc. Int. Conf. on Dynamical Systems, Rio de Janeiro. P. 725. Springer Lecture Notes in Mathematics 1007. Springer, Berlin, 1983.Google Scholar
[Yam53]Yamabe, H.. A generalization of a theorem of Gleason. Ann. Math. 58 (1953), 351365.Google Scholar