Reflection subgroups of Euclidean reflection groups
Identifieur interne : 002517 ( Istex/Corpus ); précédent : 002516; suivant : 002518Reflection subgroups of Euclidean reflection groups
Auteurs :Source :
- Sbornik: Mathematics [ 1064-5616 ] ; 2005-10-31.
English descriptors
- KwdEn :
- Admissible sequence, Arbitrary subgroups, Automorphism, Coxeter, Coxeter diagram, Coxeter diagrams, Coxeter polytope, Coxeter simplex, Coxeter simplices, Decomposable, Dilation factor, Direct product, English transl, Euclidean, Euclidean coxeter simplices, Euclidean groups, Facet, Felikson, Fundamental chamber, Fundamental domain, Fundamental simplex, Homothety, Indecomposable, Indecomposable components, Linear parts, Lowest root, Maximal, Maximal subgroup, Maximal subgroups, Nite, Nite groups, Nite root system, Nite subgroup, Node, Orthogonal, Other hand, Other words, Polytope, Root subsystem, Root subsystems, Root system, Root systems, Same type, Short roots, Similar simplices, Simple roots, Simplex, Simplices, Special vertex, Stabilizer, Subgroup, Subsystem, Tumarkin, Weyl, Weyl group.
- Teeft :
- Admissible sequence, Arbitrary subgroups, Automorphism, Coxeter, Coxeter diagram, Coxeter diagrams, Coxeter polytope, Coxeter simplex, Coxeter simplices, Decomposable, Dilation factor, Direct product, English transl, Euclidean, Euclidean coxeter simplices, Euclidean groups, Facet, Felikson, Fundamental chamber, Fundamental domain, Fundamental simplex, Homothety, Indecomposable, Indecomposable components, Linear parts, Lowest root, Maximal, Maximal subgroup, Maximal subgroups, Nite, Nite groups, Nite root system, Nite subgroup, Node, Orthogonal, Other hand, Other words, Polytope, Root subsystem, Root subsystems, Root system, Root systems, Same type, Short roots, Similar simplices, Simple roots, Simplex, Simplices, Special vertex, Stabilizer, Subgroup, Subsystem, Tumarkin, Weyl, Weyl group.
Url:
DOI: 10.1070/SM2005v196n09ABEH003646
Links to Exploration step
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