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- Open_book_decomposition abstract "In mathematics, an open book decomposition (or simply an open book) is a decomposition of a closed oriented 3-manifold M into a union of surfaces (necessarily with boundary) and solid tori. Open books have relevance to contact geometry, with a famous theorem of Emmanuel Giroux (given below) that shows that contact geometry can be studied from an entirely topological viewpoint.".
- Open_book_decomposition wikiPageExternalLink m120110.htm.
- Open_book_decomposition wikiPageExternalLink 0409402.
- Open_book_decomposition wikiPageID "5608629".
- Open_book_decomposition wikiPageLength "5103".
- Open_book_decomposition wikiPageOutDegree "30".
- Open_book_decomposition wikiPageRevisionID "691711290".
- Open_book_decomposition wikiPageWikiLink 3-manifold.
- Open_book_decomposition wikiPageWikiLink Ambient_isotopy.
- Open_book_decomposition wikiPageWikiLink Bijection.
- Open_book_decomposition wikiPageWikiLink Category:3-manifolds.
- Open_book_decomposition wikiPageWikiLink Category:Contact_geometry.
- Open_book_decomposition wikiPageWikiLink Category:Structures_on_manifolds.
- Open_book_decomposition wikiPageWikiLink Category:Topology.
- Open_book_decomposition wikiPageWikiLink Closed_manifold.
- Open_book_decomposition wikiPageWikiLink Complement_(set_theory).
- Open_book_decomposition wikiPageWikiLink Confoliation.
- Open_book_decomposition wikiPageWikiLink Contact_geometry.
- Open_book_decomposition wikiPageWikiLink Dehn_twist.
- Open_book_decomposition wikiPageWikiLink Emmanuel_Giroux.
- Open_book_decomposition wikiPageWikiLink Fibration.
- Open_book_decomposition wikiPageWikiLink Frank_Quinn_(mathematician).
- Open_book_decomposition wikiPageWikiLink Handle_decomposition.
- Open_book_decomposition wikiPageWikiLink Homeomorphism.
- Open_book_decomposition wikiPageWikiLink Link_(knot_theory).
- Open_book_decomposition wikiPageWikiLink Manifold_decomposition.
- Open_book_decomposition wikiPageWikiLink Mapping_torus.
- Open_book_decomposition wikiPageWikiLink Mathematics.
- Open_book_decomposition wikiPageWikiLink Orientability.
- Open_book_decomposition wikiPageWikiLink Rolodex.
- Open_book_decomposition wikiPageWikiLink Solid_torus.
- Open_book_decomposition wikiPageWikiLink Surface.
- Open_book_decomposition wikiPageWikiLink Up_to.
- Open_book_decomposition wikiPageWikiLink Witt_group.
- Open_book_decomposition wikiPageWikiLinkText "Open book decomposition".
- Open_book_decomposition wikiPageWikiLinkText "open book decomposition".
- Open_book_decomposition subject Category:3-manifolds.
- Open_book_decomposition subject Category:Contact_geometry.
- Open_book_decomposition subject Category:Structures_on_manifolds.
- Open_book_decomposition subject Category:Topology.
- Open_book_decomposition hypernym Decomposition.
- Open_book_decomposition type Field.
- Open_book_decomposition comment "In mathematics, an open book decomposition (or simply an open book) is a decomposition of a closed oriented 3-manifold M into a union of surfaces (necessarily with boundary) and solid tori. Open books have relevance to contact geometry, with a famous theorem of Emmanuel Giroux (given below) that shows that contact geometry can be studied from an entirely topological viewpoint.".
- Open_book_decomposition label "Open book decomposition".
- Open_book_decomposition sameAs Q3527238.
- Open_book_decomposition sameAs Offenes_Buch.
- Open_book_decomposition sameAs Théorème_des_livres_ouverts.
- Open_book_decomposition sameAs m.0dw1gb.
- Open_book_decomposition sameAs Q3527238.
- Open_book_decomposition wasDerivedFrom Open_book_decomposition?oldid=691711290.
- Open_book_decomposition isPrimaryTopicOf Open_book_decomposition.