Matches in DBpedia 2014 for { <http://dbpedia.org/resource/Three-torus> ?p ?o. }
Showing items 1 to 17 of
17
with 100 items per page.
- Three-torus abstract "The three-dimensional torus, or triple torus, is defined as the Cartesian product of three circles,In contrast, the usual torus is the Cartesian product of two circles only.The triple torus is a three-dimensional compact manifold with no boundary. It can be obtained by gluing the three pairs of opposite faces of a cube. (After gluing the first pair of opposite faces the cube looks like a thick washer, after gluing the second pair — the flat faces of the washer — it looks like a hollow torus, the last gluing — the inner surface of the hollow torus to the outer surface — is physically impossible in three-dimensional space so it has to happen in four dimensions.)".
- Three-torus wikiPageExternalLink books?id=9kkuP3lsEFQC&pg=PA31.
- Three-torus wikiPageExternalLink books?id=A8WBiUWy3SgC&pg=PA13.
- Three-torus wikiPageID "2455103".
- Three-torus wikiPageRevisionID "604237709".
- Three-torus subject Category:Differential_geometry.
- Three-torus subject Category:Differential_topology.
- Three-torus subject Category:Geometric_topology.
- Three-torus subject Category:Manifolds.
- Three-torus subject Category:Topology.
- Three-torus comment "The three-dimensional torus, or triple torus, is defined as the Cartesian product of three circles,In contrast, the usual torus is the Cartesian product of two circles only.The triple torus is a three-dimensional compact manifold with no boundary. It can be obtained by gluing the three pairs of opposite faces of a cube.".
- Three-torus label "Three-torus".
- Three-torus sameAs m.0x19h4h.
- Three-torus sameAs Q17093905.
- Three-torus sameAs Q17093905.
- Three-torus wasDerivedFrom Three-torus?oldid=604237709.
- Three-torus isPrimaryTopicOf Three-torus.