Basic conjugacy theorems for G 2
Identifieur interne : 001C99 ( Main/Merge ); précédent : 001C98; suivant : 001D00Basic conjugacy theorems for G 2
Auteurs : Robert L. Griess Jr. [États-Unis]Source :
- Inventiones mathematicae [ 0020-9910 ] ; 1995-12-01.
English descriptors
- KwdEn :
- Abelian, Acts transitively, Adjoint module, Algebra, Automorphism, Automorphism group, Basic conjugacy theorems, Cayley, Central factor, Centralizer, Conjugacy, Conjugacy class, Conjugacy classes, Conjugation, Double cosets, Elementary abelian, Embedding, Embeddings, Finite group, Finite groups, Finite subgroup, Finite subgroups, Fours group, Griess, Indecomposable root system, Inner product, Irreducible, Isomorphic, Levi, Levi factor, Local subgroup, Long root, Maximal, Maximal toms, Maximal tori, Maximal torus, Module, Natural subgroup, Notation, Orthogonal, Orthogonal complement, Parabolic subgroup, Reductive, Reductive group, Reductive subgroup, Root group, Root system, Singular vectors, Stabilizer, Standard root groups, Strong control, Subalgebra, Subgroup, Subset, Torus, Trivial character, Unique class, Vector space, Weight theory, Weyl, Weyl group.
- Teeft :
- Abelian, Acts transitively, Adjoint module, Algebra, Automorphism, Automorphism group, Basic conjugacy theorems, Cayley, Central factor, Centralizer, Conjugacy, Conjugacy class, Conjugacy classes, Conjugation, Double cosets, Elementary abelian, Embedding, Embeddings, Finite group, Finite groups, Finite subgroup, Finite subgroups, Fours group, Griess, Indecomposable root system, Inner product, Irreducible, Isomorphic, Levi, Levi factor, Local subgroup, Long root, Maximal, Maximal toms, Maximal tori, Maximal torus, Module, Natural subgroup, Notation, Orthogonal, Orthogonal complement, Parabolic subgroup, Reductive, Reductive group, Reductive subgroup, Root group, Root system, Singular vectors, Stabilizer, Standard root groups, Strong control, Subalgebra, Subgroup, Subset, Torus, Trivial character, Unique class, Vector space, Weight theory, Weyl, Weyl group.
Url:
DOI: 10.1007/BF01884298
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Griess Jr.</name><affiliation wicri:level="2"><country xml:lang="fr">États-Unis</country><wicri:regionArea>Department of Mathematics, University of Michigan, 48109-1003, Ann Arbor, MI</wicri:regionArea><placeName><region type="state">Michigan</region></placeName></affiliation></author></analytic><monogr></monogr><series><title level="j">Inventiones mathematicae</title><title level="j" type="abbrev">Invent Math</title><idno type="ISSN">0020-9910</idno><idno type="eISSN">1432-1297</idno><imprint><publisher>Springer-Verlag</publisher><pubPlace>Berlin/Heidelberg</pubPlace><date type="published" when="1995-12-01">1995-12-01</date><biblScope unit="volume">121</biblScope><biblScope unit="issue">1</biblScope><biblScope unit="page" from="257">257</biblScope><biblScope unit="page" to="277">277</biblScope></imprint><idno type="ISSN">0020-9910</idno></series></biblStruct></sourceDesc><seriesStmt><idno type="ISSN">0020-9910</idno></seriesStmt></fileDesc><profileDesc><textClass><keywords scheme="KwdEn" xml:lang="en"><term>Abelian</term><term>Acts transitively</term><term>Adjoint module</term><term>Algebra</term><term>Automorphism</term><term>Automorphism group</term><term>Basic conjugacy theorems</term><term>Cayley</term><term>Central factor</term><term>Centralizer</term><term>Conjugacy</term><term>Conjugacy class</term><term>Conjugacy classes</term><term>Conjugation</term><term>Double cosets</term><term>Elementary abelian</term><term>Embedding</term><term>Embeddings</term><term>Finite group</term><term>Finite groups</term><term>Finite subgroup</term><term>Finite subgroups</term><term>Fours group</term><term>Griess</term><term>Indecomposable root system</term><term>Inner product</term><term>Irreducible</term><term>Isomorphic</term><term>Levi</term><term>Levi factor</term><term>Local subgroup</term><term>Long root</term><term>Maximal</term><term>Maximal toms</term><term>Maximal tori</term><term>Maximal torus</term><term>Module</term><term>Natural subgroup</term><term>Notation</term><term>Orthogonal</term><term>Orthogonal complement</term><term>Parabolic subgroup</term><term>Reductive</term><term>Reductive group</term><term>Reductive subgroup</term><term>Root group</term><term>Root system</term><term>Singular vectors</term><term>Stabilizer</term><term>Standard root groups</term><term>Strong control</term><term>Subalgebra</term><term>Subgroup</term><term>Subset</term><term>Torus</term><term>Trivial character</term><term>Unique class</term><term>Vector space</term><term>Weight theory</term><term>Weyl</term><term>Weyl group</term></keywords><keywords scheme="Teeft" xml:lang="en"><term>Abelian</term><term>Acts transitively</term><term>Adjoint module</term><term>Algebra</term><term>Automorphism</term><term>Automorphism group</term><term>Basic conjugacy theorems</term><term>Cayley</term><term>Central factor</term><term>Centralizer</term><term>Conjugacy</term><term>Conjugacy class</term><term>Conjugacy classes</term><term>Conjugation</term><term>Double cosets</term><term>Elementary abelian</term><term>Embedding</term><term>Embeddings</term><term>Finite group</term><term>Finite groups</term><term>Finite subgroup</term><term>Finite subgroups</term><term>Fours group</term><term>Griess</term><term>Indecomposable root system</term><term>Inner product</term><term>Irreducible</term><term>Isomorphic</term><term>Levi</term><term>Levi factor</term><term>Local subgroup</term><term>Long root</term><term>Maximal</term><term>Maximal toms</term><term>Maximal tori</term><term>Maximal torus</term><term>Module</term><term>Natural subgroup</term><term>Notation</term><term>Orthogonal</term><term>Orthogonal complement</term><term>Parabolic subgroup</term><term>Reductive</term><term>Reductive group</term><term>Reductive subgroup</term><term>Root group</term><term>Root system</term><term>Singular vectors</term><term>Stabilizer</term><term>Standard root groups</term><term>Strong control</term><term>Subalgebra</term><term>Subgroup</term><term>Subset</term><term>Torus</term><term>Trivial character</term><term>Unique class</term><term>Vector space</term><term>Weight theory</term><term>Weyl</term><term>Weyl group</term></keywords></textClass><langUsage><language ident="en">en</language></langUsage></profileDesc></teiHeader></TEI></record>Pour manipuler ce document sous Unix (Dilib)
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