Matches in DBpedia 2016-04 for { ?s ?p "In geometry, a generalized quadrangle is an incidence structure whose main feature is the lack of any triangles (yet containing many quadrangles). A generalized quadrangle is by definition a polar space of rank two. They are the generalized n-gons and near n-gons with n = 4. They are also precisely the partial geometries pg(s,t,α) with α = 1."@en }
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- Generalized_quadrangle abstract "In geometry, a generalized quadrangle is an incidence structure whose main feature is the lack of any triangles (yet containing many quadrangles). A generalized quadrangle is by definition a polar space of rank two. They are the generalized n-gons and near n-gons with n = 4. They are also precisely the partial geometries pg(s,t,α) with α = 1.".
- Q2754558 abstract "In geometry, a generalized quadrangle is an incidence structure whose main feature is the lack of any triangles (yet containing many quadrangles). A generalized quadrangle is by definition a polar space of rank two. They are the generalized n-gons and near n-gons with n = 4. They are also precisely the partial geometries pg(s,t,α) with α = 1.".
- Generalized_quadrangle comment "In geometry, a generalized quadrangle is an incidence structure whose main feature is the lack of any triangles (yet containing many quadrangles). A generalized quadrangle is by definition a polar space of rank two. They are the generalized n-gons and near n-gons with n = 4. They are also precisely the partial geometries pg(s,t,α) with α = 1.".
- Q2754558 comment "In geometry, a generalized quadrangle is an incidence structure whose main feature is the lack of any triangles (yet containing many quadrangles). A generalized quadrangle is by definition a polar space of rank two. They are the generalized n-gons and near n-gons with n = 4. They are also precisely the partial geometries pg(s,t,α) with α = 1.".