Compact differentiable transformation groups on exotic spheres
Identifieur interne : 001E11 ( Main/Exploration ); précédent : 001E10; suivant : 001E12Compact differentiable transformation groups on exotic spheres
Auteurs : Eldar Straume [Norvège]Source :
- Mathematische Annalen [ 0025-5831 ] ; 1994-05-01.
English descriptors
- KwdEn :
- Algebra, Berlin heidelberg, Boundary sphere, Central torus, Circle group, Classical group, Classical groups, Cohomology, Cohomology theory, Common features, Common vertex, Compact subgroup, Compact subgroups, Concordance classes, Differentiable, Differentiable transformation groups, Disjoint union, Exotic, Exotic sphere, Exotic spheres, Geometric weight system, Geometric weight systems, Heaviest vertex, High density, Homology, Homology sphere, Homology spheres, Homotopy, Homotopy sphere, Homotopy spheres, Hsiang, Integral weight system, Irreducible, Irreducible representations, Isotropy, Isotropy group, Isotropy groups, Kervaire, Kervaire sphere, Kervaire type, Large transformation groups, Linear group, Linear groups, Linear model, Linear type, Local linearity, Local representation, Localization, Math, Maximal, Maximal density, Maximal dimension, Maximal torus, Milnor, Nonzero weights, Normal subgroup, Notes math, Orbit structure, Orbit structures, Orbital simplicity, Orthogonal, Orthogonal model, Orthogonal ones, Orthogonal transformation group, Other hand, Other vertex, Parallelizable, Parallelizable manifold, Parallelizable manifolds, Quotient group, Rational weights, Realizable, Realizable weight pattern, Reflection group, Regular actions, Regular subgroups, Resp, Root system, Same orbits, Same type, Sect, Short roots, Simple groups, Simplex, Simplices, Smooth manifold, Smooth transformation group, Special case, Special simplex, Sphere, Standard representation, Standard sphere, Straume, Subdiagram, Subgroup, Tensor, Tensor product, Tensor products, Theorem, Torus, Transformation group, Transformation groups, Trivial representation, Trivial summand, Unit sphere, Weight lattice, Weight multiplicity, Weight pattern, Weight patterns, Weight system, Weight systems.
- Teeft :
- Algebra, Berlin heidelberg, Boundary sphere, Central torus, Circle group, Classical group, Classical groups, Cohomology, Cohomology theory, Common features, Common vertex, Compact subgroup, Compact subgroups, Concordance classes, Differentiable, Differentiable transformation groups, Disjoint union, Exotic, Exotic sphere, Exotic spheres, Geometric weight system, Geometric weight systems, Heaviest vertex, High density, Homology, Homology sphere, Homology spheres, Homotopy, Homotopy sphere, Homotopy spheres, Hsiang, Integral weight system, Irreducible, Irreducible representations, Isotropy, Isotropy group, Isotropy groups, Kervaire, Kervaire sphere, Kervaire type, Large transformation groups, Linear group, Linear groups, Linear model, Linear type, Local linearity, Local representation, Localization, Math, Maximal, Maximal density, Maximal dimension, Maximal torus, Milnor, Nonzero weights, Normal subgroup, Notes math, Orbit structure, Orbit structures, Orbital simplicity, Orthogonal, Orthogonal model, Orthogonal ones, Orthogonal transformation group, Other hand, Other vertex, Parallelizable, Parallelizable manifold, Parallelizable manifolds, Quotient group, Rational weights, Realizable, Realizable weight pattern, Reflection group, Regular actions, Regular subgroups, Resp, Root system, Same orbits, Same type, Sect, Short roots, Simple groups, Simplex, Simplices, Smooth manifold, Smooth transformation group, Special case, Special simplex, Sphere, Standard representation, Standard sphere, Straume, Subdiagram, Subgroup, Tensor, Tensor product, Tensor products, Theorem, Torus, Transformation group, Transformation groups, Trivial representation, Trivial summand, Unit sphere, Weight lattice, Weight multiplicity, Weight pattern, Weight patterns, Weight system, Weight systems.
Url:
DOI: 10.1007/BF01459789
Affiliations:
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representation</term><term>Localization</term><term>Math</term><term>Maximal</term><term>Maximal density</term><term>Maximal dimension</term><term>Maximal torus</term><term>Milnor</term><term>Nonzero weights</term><term>Normal subgroup</term><term>Notes math</term><term>Orbit structure</term><term>Orbit structures</term><term>Orbital simplicity</term><term>Orthogonal</term><term>Orthogonal model</term><term>Orthogonal ones</term><term>Orthogonal transformation group</term><term>Other hand</term><term>Other vertex</term><term>Parallelizable</term><term>Parallelizable manifold</term><term>Parallelizable manifolds</term><term>Quotient group</term><term>Rational weights</term><term>Realizable</term><term>Realizable weight pattern</term><term>Reflection group</term><term>Regular actions</term><term>Regular subgroups</term><term>Resp</term><term>Root system</term><term>Same orbits</term><term>Same type</term><term>Sect</term><term>Short roots</term><term>Simple groups</term><term>Simplex</term><term>Simplices</term><term>Smooth manifold</term><term>Smooth transformation group</term><term>Special case</term><term>Special simplex</term><term>Sphere</term><term>Standard representation</term><term>Standard sphere</term><term>Straume</term><term>Subdiagram</term><term>Subgroup</term><term>Tensor</term><term>Tensor product</term><term>Tensor products</term><term>Theorem</term><term>Torus</term><term>Transformation group</term><term>Transformation groups</term><term>Trivial representation</term><term>Trivial summand</term><term>Unit sphere</term><term>Weight lattice</term><term>Weight multiplicity</term><term>Weight pattern</term><term>Weight patterns</term><term>Weight system</term><term>Weight systems</term></keywords><keywords scheme="Teeft" xml:lang="en"><term>Algebra</term><term>Berlin heidelberg</term><term>Boundary sphere</term><term>Central torus</term><term>Circle group</term><term>Classical group</term><term>Classical groups</term><term>Cohomology</term><term>Cohomology theory</term><term>Common features</term><term>Common vertex</term><term>Compact subgroup</term><term>Compact subgroups</term><term>Concordance classes</term><term>Differentiable</term><term>Differentiable transformation groups</term><term>Disjoint union</term><term>Exotic</term><term>Exotic sphere</term><term>Exotic spheres</term><term>Geometric weight system</term><term>Geometric weight systems</term><term>Heaviest vertex</term><term>High density</term><term>Homology</term><term>Homology sphere</term><term>Homology spheres</term><term>Homotopy</term><term>Homotopy sphere</term><term>Homotopy spheres</term><term>Hsiang</term><term>Integral weight system</term><term>Irreducible</term><term>Irreducible representations</term><term>Isotropy</term><term>Isotropy group</term><term>Isotropy groups</term><term>Kervaire</term><term>Kervaire sphere</term><term>Kervaire type</term><term>Large transformation groups</term><term>Linear 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system</term><term>Same orbits</term><term>Same type</term><term>Sect</term><term>Short roots</term><term>Simple groups</term><term>Simplex</term><term>Simplices</term><term>Smooth manifold</term><term>Smooth transformation group</term><term>Special case</term><term>Special simplex</term><term>Sphere</term><term>Standard representation</term><term>Standard sphere</term><term>Straume</term><term>Subdiagram</term><term>Subgroup</term><term>Tensor</term><term>Tensor product</term><term>Tensor products</term><term>Theorem</term><term>Torus</term><term>Transformation group</term><term>Transformation groups</term><term>Trivial representation</term><term>Trivial summand</term><term>Unit sphere</term><term>Weight lattice</term><term>Weight multiplicity</term><term>Weight pattern</term><term>Weight patterns</term><term>Weight system</term><term>Weight systems</term></keywords></textClass><langUsage><language ident="en">en</language></langUsage></profileDesc></teiHeader></TEI><affiliations><list><country><li>Norvège</li></country></list><tree><country name="Norvège"><noRegion><name sortKey="Straume, Eldar" sort="Straume, Eldar" uniqKey="Straume E" first="Eldar" last="Straume">Eldar Straume</name></noRegion></country></tree></affiliations></record>Pour manipuler ce document sous Unix (Dilib)
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