Some functional properties of the Bruhat-Tits building
Identifieur interne : 001366 ( Main/Exploration ); précédent : 001365; suivant : 001367Some functional properties of the Bruhat-Tits building
Auteurs : E. LandvogtSource :
- Journal für die reine und angewandte Mathematik (Crelles Journal) [ 0075-4102 ] ; 2000-01-05.
English descriptors
- KwdEn :
- Acts isometrically, Algebraic, Algebraic group, Bruhat, Canonical, Canonical image, Canonical projection, Central isogeny, Centralizer, Convex, Convex hull, Discrete valuation, Eld, Galois, Galois action, Galois extension, Group scheme, Hand side, Henselian, Homomorphism, Injective, Isometrical, Isometry, Landvogt, Maximal, Maximal torus, Metric, Minimal distance, Nite, Point lemma, Reductive, Reductive groups, Residue class, Resp, Right hand side, Root system, Scalar product, Sequel, Special point, Stab, Stabilizer, Subgroup, Subset, Suitable normalization, Tit, Topology, Toral, Toral maps, Torus, Unique point.
- Teeft :
- Acts isometrically, Algebraic, Algebraic group, Bruhat, Canonical, Canonical image, Canonical projection, Central isogeny, Centralizer, Convex, Convex hull, Discrete valuation, Eld, Galois, Galois action, Galois extension, Group scheme, Hand side, Henselian, Homomorphism, Injective, Isometrical, Isometry, Landvogt, Maximal, Maximal torus, Metric, Minimal distance, Nite, Point lemma, Reductive, Reductive groups, Residue class, Resp, Right hand side, Root system, Scalar product, Sequel, Special point, Stab, Stabilizer, Subgroup, Subset, Suitable normalization, Tit, Topology, Toral, Toral maps, Torus, Unique point.
Url:
DOI: 10.1515/crll.2000.006
Affiliations:
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Le document en format XML
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<term>Canonical image</term>
<term>Canonical projection</term>
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<term>Right hand side</term>
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<term>Subset</term>
<term>Suitable normalization</term>
<term>Tit</term>
<term>Topology</term>
<term>Toral</term>
<term>Toral maps</term>
<term>Torus</term>
<term>Unique point</term>
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<term>Algebraic group</term>
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<term>Canonical image</term>
<term>Canonical projection</term>
<term>Central isogeny</term>
<term>Centralizer</term>
<term>Convex</term>
<term>Convex hull</term>
<term>Discrete valuation</term>
<term>Eld</term>
<term>Galois</term>
<term>Galois action</term>
<term>Galois extension</term>
<term>Group scheme</term>
<term>Hand side</term>
<term>Henselian</term>
<term>Homomorphism</term>
<term>Injective</term>
<term>Isometrical</term>
<term>Isometry</term>
<term>Landvogt</term>
<term>Maximal</term>
<term>Maximal torus</term>
<term>Metric</term>
<term>Minimal distance</term>
<term>Nite</term>
<term>Point lemma</term>
<term>Reductive</term>
<term>Reductive groups</term>
<term>Residue class</term>
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<term>Right hand side</term>
<term>Root system</term>
<term>Scalar product</term>
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<term>Special point</term>
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<term>Stabilizer</term>
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<term>Subset</term>
<term>Suitable normalization</term>
<term>Tit</term>
<term>Topology</term>
<term>Toral</term>
<term>Toral maps</term>
<term>Torus</term>
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