Laminations and groups of homeomorphisms of the circle

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Laminations and groups of homeomorphisms of the circle

https://devfeature-collection.sl.nsw.gov.au/record/TN_cdi_proquest_journals_881392947

Laminations and groups of homeomorphisms of the circle

About this item

Full title

Laminations and groups of homeomorphisms of the circle

Author / Creator

Dunfield, Nathan M. and Calegari, Danny

Publisher

Heidelberg: Springer Nature B.V

Journal title

Inventiones mathematicae, 2003-04, Vol.152 (1), p.149-204

Language

English

Formats

Articles

Publication information

Publisher

Heidelberg: Springer Nature B.V

More information

Scope and Contents

Contents

If M is an atoroidal 3-manifold with a taut foliation, Thurston showed that π^sub 1^(M) acts on a circle. Here, we show that some other classes of essential laminations also give rise to actions on circles. In particular, we show this for tight essential laminations with solid torus guts. We also show that pseudo-Anosov flows induce actions on circ...

Alternative Titles

Full title

Laminations and groups of homeomorphisms of the circle

Authors, Artists and Contributors

Author / Creator

Dunfield, Nathan M.
Calegari, Danny

Identifiers

Primary Identifiers

Record Identifier

TN_cdi_proquest_journals_881392947

Permalink

https://devfeature-collection.sl.nsw.gov.au/record/TN_cdi_proquest_journals_881392947

Other Identifiers

ISSN

0020-9910

E-ISSN

1432-1297

DOI

10.1007/s00222-002-0271-6

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