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- JSJ_decomposition abstract "In mathematics, the JSJ decomposition, also known as the toral decomposition, is a topological construct given by the following theorem: Irreducible orientable closed (i.e., compact and without boundary) 3-manifolds have a unique (up to isotopy) minimal collection of disjointly embedded incompressible tori such that each component of the 3-manifold obtained by cutting along the tori is either atoroidal or Seifert-fibered.The acronym JSJ is for William Jaco, Peter Shalen, and Klaus Johannson. The first two worked together, and the third worked independently.".
- JSJ_decomposition wikiPageExternalLink 3Mdownloads.html.
- JSJ_decomposition wikiPageExternalLink LectureVA.pdf.
- JSJ_decomposition wikiPageExternalLink LectureVB.pdf.
- JSJ_decomposition wikiPageID "228599".
- JSJ_decomposition wikiPageRevisionID "563439443".
- JSJ_decomposition hasPhotoCollection JSJ_decomposition.
- JSJ_decomposition subject Category:3-manifolds.
- JSJ_decomposition comment "In mathematics, the JSJ decomposition, also known as the toral decomposition, is a topological construct given by the following theorem: Irreducible orientable closed (i.e., compact and without boundary) 3-manifolds have a unique (up to isotopy) minimal collection of disjointly embedded incompressible tori such that each component of the 3-manifold obtained by cutting along the tori is either atoroidal or Seifert-fibered.The acronym JSJ is for William Jaco, Peter Shalen, and Klaus Johannson.".
- JSJ_decomposition label "Decomposizione JSJ".
- JSJ_decomposition label "JSJ decomposition".
- JSJ_decomposition label "JSJ-Zerlegung".
- JSJ_decomposition sameAs JSJ-Zerlegung.
- JSJ_decomposition sameAs Decomposizione_JSJ.
- JSJ_decomposition sameAs m.01h8r6.
- JSJ_decomposition sameAs Q683430.
- JSJ_decomposition sameAs Q683430.
- JSJ_decomposition wasDerivedFrom JSJ_decomposition?oldid=563439443.
- JSJ_decomposition isPrimaryTopicOf JSJ_decomposition.