On the development of lie group theory
Identifieur interne : 002B24 ( Main/Merge ); précédent : 002B23; suivant : 002B25On the development of lie group theory
Auteurs : A. Borel [États-Unis]Source :
- The Mathematical Intelligencer [ 0343-6993 ] ; 1980-06-01.
English descriptors
- KwdEn :
- Affine variety, Algebra, Algebraic, Algebraic geometry, Algebraic groups, Algebraic variety, Arbitrary fields, Arithmetic groups, Automorphic forms, Bruhat decomposition, Cartan, Classical groups, Classical theory, Compact group, Conjugacy classes, Contact transformations, Differential equations, Differential geometry, Fibre bundle theory, Galois theory, General theory, Group structure, Group theory, Harmonic analysis, Homogeneous spaces, Important step, Isotropy groups, Itogi nauk, Many parts, Maximal, Maximal elements, Natural framework, Negative curvature, Note historique, Number field, Orbit lemma, Other parts, Parabolic subgroups, Plancherel formula, Plenum publ, Point theorem, Projective, Projective geometry, Projective transformations, Projective variety, Real case, Real groups, Representation theory, Simple groups, Soviet mathematics, Stability groups, Subgroup, Symmetric domains, Symmetric spaces, Tit, Tits system, Tits systems, Transformation groups, Triangular form, Weyl, Weyl group.
- Teeft :
- Affine variety, Algebra, Algebraic, Algebraic geometry, Algebraic groups, Algebraic variety, Arbitrary fields, Arithmetic groups, Automorphic forms, Bruhat decomposition, Cartan, Classical groups, Classical theory, Compact group, Conjugacy classes, Contact transformations, Differential equations, Differential geometry, Fibre bundle theory, Galois theory, General theory, Group structure, Group theory, Harmonic analysis, Homogeneous spaces, Important step, Isotropy groups, Itogi nauk, Many parts, Maximal, Maximal elements, Natural framework, Negative curvature, Note historique, Number field, Orbit lemma, Other parts, Parabolic subgroups, Plancherel formula, Plenum publ, Point theorem, Projective, Projective geometry, Projective transformations, Projective variety, Real case, Real groups, Representation theory, Simple groups, Soviet mathematics, Stability groups, Subgroup, Symmetric domains, Symmetric spaces, Tit, Tits system, Tits systems, Transformation groups, Triangular form, Weyl, Weyl group.
Url:
DOI: 10.1007/BF03023375
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ISTEX:33064BA0833619781B65AC1DB259FAB184331324Le document en format XML
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