Smoothness, semi-stability and alterations
Identifieur interne : 001A48 ( Main/Exploration ); précédent : 001A47; suivant : 001A49Smoothness, semi-stability and alterations
Auteurs : A. J. De Jong [États-Unis]Source :
- Publications Mathématiques de l'Institut des Hautes Études Scientifiques [ 0073-8301 ] ; 1996-12-01.
English descriptors
- KwdEn :
- 6tale, Affine, Alteration, Base change, Birational, Closure, Codimension, Cohomology, Crossings divisor, Discrete valuation rings, Disjoint, Disjoint sections, Distinct points, Divisor, Dtale, Equidimensional, Fibre, Field extension, Field extensions, Finite, Finite 6tale, Finite dtale, Finite extension, Finite group, Finite morphism, Finite presentation, Finite type, Finite unramified, Function field, Generic, Generic fibre, Generic point, Generic points, Genus, Geometric fibres, Geometric point, Geometric points, Homomorphism, Ideal sheaf, Induction hypothesis, Integral scheme, Inventiones mathematicae, Inverse image, Irreducible, Irreducible component, Irreducible components, Isomorphism, Jong, Linear subvariety, Local description, Local ring, Locus, Modification, Morphism, Neighbourhood, Noetherian, Noetherian scheme, Nonempty, Nonempty subset, Normal crossings divisor, Normal scheme, Normalization, Normalization morphism, Open immersion, Open neighbourhood, Open subscheme, Projection morphism, Projective, Projective alteration, Projective alterations, Projective morphism, Projective scheme, Projective split curve, Projective varieties, Projective variety, Proper morphism, Pure codimension, Pure dimension, Regular scheme, Residue field, Schematic closure, Scheme spec, Singular locus, Singular point, Singular points, Singularity, Smooth locus, Spec, Special fibre, Split curve, Stable curve, Stable curves, Strict pair, Strict pairs, Subscheme, Subset, Suffices, Valuation ring.
- Teeft :
- 6tale, Affine, Alteration, Base change, Birational, Closure, Codimension, Cohomology, Crossings divisor, Discrete valuation rings, Disjoint, Disjoint sections, Distinct points, Divisor, Dtale, Equidimensional, Fibre, Field extension, Field extensions, Finite, Finite 6tale, Finite dtale, Finite extension, Finite group, Finite morphism, Finite presentation, Finite type, Finite unramified, Function field, Generic, Generic fibre, Generic point, Generic points, Genus, Geometric fibres, Geometric point, Geometric points, Homomorphism, Ideal sheaf, Induction hypothesis, Integral scheme, Inventiones mathematicae, Inverse image, Irreducible, Irreducible component, Irreducible components, Isomorphism, Jong, Linear subvariety, Local description, Local ring, Locus, Modification, Morphism, Neighbourhood, Noetherian, Noetherian scheme, Nonempty, Nonempty subset, Normal crossings divisor, Normal scheme, Normalization, Normalization morphism, Open immersion, Open neighbourhood, Open subscheme, Projection morphism, Projective, Projective alteration, Projective alterations, Projective morphism, Projective scheme, Projective split curve, Projective varieties, Projective variety, Proper morphism, Pure codimension, Pure dimension, Regular scheme, Residue field, Schematic closure, Scheme spec, Singular locus, Singular point, Singular points, Singularity, Smooth locus, Spec, Special fibre, Split curve, Stable curve, Stable curves, Strict pair, Strict pairs, Subscheme, Subset, Suffices, Valuation ring.
Url:
DOI: 10.1007/BF02698644
Affiliations:
Links toward previous steps (curation, corpus...)
- to stream Istex, to step Corpus: 002808
- to stream Istex, to step Curation: 002808
- to stream Istex, to step Checkpoint: 001850
- to stream Main, to step Merge: 001A68
- to stream Main, to step Curation: 001A48
Le document en format XML
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<profileDesc><textClass><keywords scheme="KwdEn" xml:lang="en"><term>6tale</term>
<term>Affine</term>
<term>Alteration</term>
<term>Base change</term>
<term>Birational</term>
<term>Closure</term>
<term>Codimension</term>
<term>Cohomology</term>
<term>Crossings divisor</term>
<term>Discrete valuation rings</term>
<term>Disjoint</term>
<term>Disjoint sections</term>
<term>Distinct points</term>
<term>Divisor</term>
<term>Dtale</term>
<term>Equidimensional</term>
<term>Fibre</term>
<term>Field extension</term>
<term>Field extensions</term>
<term>Finite</term>
<term>Finite 6tale</term>
<term>Finite dtale</term>
<term>Finite extension</term>
<term>Finite group</term>
<term>Finite morphism</term>
<term>Finite presentation</term>
<term>Finite type</term>
<term>Finite unramified</term>
<term>Function field</term>
<term>Generic</term>
<term>Generic fibre</term>
<term>Generic point</term>
<term>Generic points</term>
<term>Genus</term>
<term>Geometric fibres</term>
<term>Geometric point</term>
<term>Geometric points</term>
<term>Homomorphism</term>
<term>Ideal sheaf</term>
<term>Induction hypothesis</term>
<term>Integral scheme</term>
<term>Inventiones mathematicae</term>
<term>Inverse image</term>
<term>Irreducible</term>
<term>Irreducible component</term>
<term>Irreducible components</term>
<term>Isomorphism</term>
<term>Jong</term>
<term>Linear subvariety</term>
<term>Local description</term>
<term>Local ring</term>
<term>Locus</term>
<term>Modification</term>
<term>Morphism</term>
<term>Neighbourhood</term>
<term>Noetherian</term>
<term>Noetherian scheme</term>
<term>Nonempty</term>
<term>Nonempty subset</term>
<term>Normal crossings divisor</term>
<term>Normal scheme</term>
<term>Normalization</term>
<term>Normalization morphism</term>
<term>Open immersion</term>
<term>Open neighbourhood</term>
<term>Open subscheme</term>
<term>Projection morphism</term>
<term>Projective</term>
<term>Projective alteration</term>
<term>Projective alterations</term>
<term>Projective morphism</term>
<term>Projective scheme</term>
<term>Projective split curve</term>
<term>Projective varieties</term>
<term>Projective variety</term>
<term>Proper morphism</term>
<term>Pure codimension</term>
<term>Pure dimension</term>
<term>Regular scheme</term>
<term>Residue field</term>
<term>Schematic closure</term>
<term>Scheme spec</term>
<term>Singular locus</term>
<term>Singular point</term>
<term>Singular points</term>
<term>Singularity</term>
<term>Smooth locus</term>
<term>Spec</term>
<term>Special fibre</term>
<term>Split curve</term>
<term>Stable curve</term>
<term>Stable curves</term>
<term>Strict pair</term>
<term>Strict pairs</term>
<term>Subscheme</term>
<term>Subset</term>
<term>Suffices</term>
<term>Valuation ring</term>
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<keywords scheme="Teeft" xml:lang="en"><term>6tale</term>
<term>Affine</term>
<term>Alteration</term>
<term>Base change</term>
<term>Birational</term>
<term>Closure</term>
<term>Codimension</term>
<term>Cohomology</term>
<term>Crossings divisor</term>
<term>Discrete valuation rings</term>
<term>Disjoint</term>
<term>Disjoint sections</term>
<term>Distinct points</term>
<term>Divisor</term>
<term>Dtale</term>
<term>Equidimensional</term>
<term>Fibre</term>
<term>Field extension</term>
<term>Field extensions</term>
<term>Finite</term>
<term>Finite 6tale</term>
<term>Finite dtale</term>
<term>Finite extension</term>
<term>Finite group</term>
<term>Finite morphism</term>
<term>Finite presentation</term>
<term>Finite type</term>
<term>Finite unramified</term>
<term>Function field</term>
<term>Generic</term>
<term>Generic fibre</term>
<term>Generic point</term>
<term>Generic points</term>
<term>Genus</term>
<term>Geometric fibres</term>
<term>Geometric point</term>
<term>Geometric points</term>
<term>Homomorphism</term>
<term>Ideal sheaf</term>
<term>Induction hypothesis</term>
<term>Integral scheme</term>
<term>Inventiones mathematicae</term>
<term>Inverse image</term>
<term>Irreducible</term>
<term>Irreducible component</term>
<term>Irreducible components</term>
<term>Isomorphism</term>
<term>Jong</term>
<term>Linear subvariety</term>
<term>Local description</term>
<term>Local ring</term>
<term>Locus</term>
<term>Modification</term>
<term>Morphism</term>
<term>Neighbourhood</term>
<term>Noetherian</term>
<term>Noetherian scheme</term>
<term>Nonempty</term>
<term>Nonempty subset</term>
<term>Normal crossings divisor</term>
<term>Normal scheme</term>
<term>Normalization</term>
<term>Normalization morphism</term>
<term>Open immersion</term>
<term>Open neighbourhood</term>
<term>Open subscheme</term>
<term>Projection morphism</term>
<term>Projective</term>
<term>Projective alteration</term>
<term>Projective alterations</term>
<term>Projective morphism</term>
<term>Projective scheme</term>
<term>Projective split curve</term>
<term>Projective varieties</term>
<term>Projective variety</term>
<term>Proper morphism</term>
<term>Pure codimension</term>
<term>Pure dimension</term>
<term>Regular scheme</term>
<term>Residue field</term>
<term>Schematic closure</term>
<term>Scheme spec</term>
<term>Singular locus</term>
<term>Singular point</term>
<term>Singular points</term>
<term>Singularity</term>
<term>Smooth locus</term>
<term>Spec</term>
<term>Special fibre</term>
<term>Split curve</term>
<term>Stable curve</term>
<term>Stable curves</term>
<term>Strict pair</term>
<term>Strict pairs</term>
<term>Subscheme</term>
<term>Subset</term>
<term>Suffices</term>
<term>Valuation ring</term>
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