Normal structure of isotropic reductive groups over rings
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Publication:6568826
DOI10.1016/J.JALGEBRA.2022.11.014MaRDI QIDQ6568826
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Publication date: 8 July 2024
Published in: Journal of Algebra (Search for Journal in Brave)
normal structurecongruence subgroupgeneric elementparabolic subgroupuniversal localizationunipotent elementelementary subgroupisotropic reductive groups
Unimodular groups, congruence subgroups (group-theoretic aspects) (20H05) Linear algebraic groups over adèles and other rings and schemes (20G35) Congruence subgroup problems (19B37)
Cites Work
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- Centralizer of the elementary subgroup of an isotropic reductive group.
- Subgroups of classical groups normalized by relative elementary groups.
- The linear homogeneous group. III
- Subnormal structure of non-stable unitary groups over rings.
- Structure of Chevalley groups over rings via universal localization.
- On the congruence subgroup problem. II
- Location of subgroups in the general linear group over a commutative ring
- Nonabelian \(K\)-theory: The nilpotent class of \(K_ 1\) and general stability
- The \(E(2,A)\) sections of \(SL(2,A)\)
- On the congruence subgroup problem
- Sandwich classification for \(\mathrm{GL}_{n}(R)\), \(\mathrm{O}_{2n}(R)\) and \(\mathrm{U}_{2n}(R,\lambda)\) revisited
- Basic reductions in the description of normal subgroups.
- Algebraic and abstract simple groups
- Finite factor groups of the unimodular group
- Groupes reductifs
- Solution of the congruence subgroup problem for \(\text{SL}_ n\) \((n\geq 3)\) and \(\text{Sp}_{2n}\) \((n\geq 2)\)
- Schémas en groupes. II: Groupes de type multiplicatif, et structure des schémas en groupes généraux. Exposés VIII à XVIII. Séminaire de Géométrie Algébrique du Bois Marie 1962/64 (SGA 3) dirigé par Michel Demazure et Alexander Grothendieck. Revised reprint
- Le problème des groupes de congruence pour \(SL_2\)
- \(K\)-theory and stable algebra
- The linear homogeneous group.
- The linear homogeneous groups. II
- Sur certains groupes simples
- Non-stable \(K_1\)-functors of multiloop groups
- Elementary subgroup of an isotropic reductive group is perfect.
- A new look at the decomposition of unipotents and the normal structure of Chevalley groups
- Elementary subgroups of isotropic reductive groups
- Homotopy invariance of non-stable K1-functors
- Lineare Gruppen Uber Lokalen Ringen
- Orthogonale Gruppen Uber Lokalen Ringen
- The Finite Simple Groups
- Centers of chevalley groups over commutative rings
- Normal Subgroups of Orthogonal Groups Over Commutative Rings
- Octonion Planes Over Local Rings
- ON THE STRUCTURE OF THE SPECIAL LINEAR GROUP OVER POLYNOMIAL RINGS
- On the Normal Subgroups of $G_2(A)$
- On the congruence kernel of isotropic groups over rings
- Sous-groupes d'indice fini dans $SL\left( {n,Z} \right)$
- Sur les sous-groupes arithmétiques des groupes semi-simples déployés
- Symplectic Groups Over Local Rings
- On the structure of parabolic subgroups
- On normal subgroups of Chevalley groups over commutative rings
- On normal subgroups of Chevalley groups over commutative rings
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