Connectedness of the Hilbert scheme
Identifieur interne : 003195 ( Istex/Checkpoint ); précédent : 003194; suivant : 003196Connectedness of the Hilbert scheme
Auteurs : Robin HartshorneSource :
- Publications Mathématiques de l'Institut des Hautes Études Scientifiques [ 0073-8301 ] ; 1966-01-01.
English descriptors
- KwdEn :
- Base extension, Base field extension, Canonical, Canonical distraction, Codimension, Coherent sheaf, Coherent sheaves, Connectedness, Discrete valuation ring, Disjoint, Exact sequence, Extension field, Fibre, Finite type, First place, First statement, Functor, Functors, Generic, Generic flatness, Generic point, Group prescheme, Hartshorne, Hilbert, Hilbert polynomial, Hilbert polynomials, Hilbert scheme, Homomorphism, Independent indeterminates, Indeterminates, Irreducible, Irreducible components, Irredundant, Irredundant intersection, Isomorphism, Linear specialization, Linear specializations, Local domain, Monomial, Monomial ideals, Monomials, Morphism, Noetherian, Noetherian preschemes, Numerical polynomial, Open subset, Polynomial ring, Prescheme, Preschemes, Prime cycle, Prime cycles, Prime ideals, Prime sequence, Projective, Projective space, Quotient, Quotient field, Rational curve, Representable, Residue field, Resp, Robin, Robin hartshorne, Same dimension, Same hilbert polynomial, Sheaf, Spec, Subprescheme, Subpreschemes, Subscheme, Subset, Sufficient condition, Surjective, Tight fans.
- Teeft :
- Base extension, Base field extension, Canonical, Canonical distraction, Codimension, Coherent sheaf, Coherent sheaves, Connectedness, Discrete valuation ring, Disjoint, Exact sequence, Extension field, Fibre, Finite type, First place, First statement, Functor, Functors, Generic, Generic flatness, Generic point, Group prescheme, Hartshorne, Hilbert, Hilbert polynomial, Hilbert polynomials, Hilbert scheme, Homomorphism, Independent indeterminates, Indeterminates, Irreducible, Irreducible components, Irredundant, Irredundant intersection, Isomorphism, Linear specialization, Linear specializations, Local domain, Monomial, Monomial ideals, Monomials, Morphism, Noetherian, Noetherian preschemes, Numerical polynomial, Open subset, Polynomial ring, Prescheme, Preschemes, Prime cycle, Prime cycles, Prime ideals, Prime sequence, Projective, Projective space, Quotient, Quotient field, Rational curve, Representable, Residue field, Resp, Robin, Robin hartshorne, Same dimension, Same hilbert polynomial, Sheaf, Spec, Subprescheme, Subpreschemes, Subscheme, Subset, Sufficient condition, Surjective, Tight fans.
Url:
DOI: 10.1007/BF02684803
Affiliations:
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ISTEX:EDBF1F3F417F6A552C57FDAAC05E059264879030Le document en format XML
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indeterminates</term><term>Indeterminates</term><term>Irreducible</term><term>Irreducible components</term><term>Irredundant</term><term>Irredundant intersection</term><term>Isomorphism</term><term>Linear specialization</term><term>Linear specializations</term><term>Local domain</term><term>Monomial</term><term>Monomial ideals</term><term>Monomials</term><term>Morphism</term><term>Noetherian</term><term>Noetherian preschemes</term><term>Numerical polynomial</term><term>Open subset</term><term>Polynomial ring</term><term>Prescheme</term><term>Preschemes</term><term>Prime cycle</term><term>Prime cycles</term><term>Prime ideals</term><term>Prime sequence</term><term>Projective</term><term>Projective space</term><term>Quotient</term><term>Quotient field</term><term>Rational curve</term><term>Representable</term><term>Residue field</term><term>Resp</term><term>Robin</term><term>Robin hartshorne</term><term>Same dimension</term><term>Same hilbert polynomial</term><term>Sheaf</term><term>Spec</term><term>Subprescheme</term><term>Subpreschemes</term><term>Subscheme</term><term>Subset</term><term>Sufficient condition</term><term>Surjective</term><term>Tight fans</term></keywords><keywords scheme="Teeft" xml:lang="en"><term>Base extension</term><term>Base field extension</term><term>Canonical</term><term>Canonical distraction</term><term>Codimension</term><term>Coherent sheaf</term><term>Coherent sheaves</term><term>Connectedness</term><term>Discrete valuation ring</term><term>Disjoint</term><term>Exact sequence</term><term>Extension field</term><term>Fibre</term><term>Finite type</term><term>First place</term><term>First statement</term><term>Functor</term><term>Functors</term><term>Generic</term><term>Generic flatness</term><term>Generic point</term><term>Group prescheme</term><term>Hartshorne</term><term>Hilbert</term><term>Hilbert polynomial</term><term>Hilbert polynomials</term><term>Hilbert scheme</term><term>Homomorphism</term><term>Independent indeterminates</term><term>Indeterminates</term><term>Irreducible</term><term>Irreducible components</term><term>Irredundant</term><term>Irredundant intersection</term><term>Isomorphism</term><term>Linear specialization</term><term>Linear specializations</term><term>Local domain</term><term>Monomial</term><term>Monomial ideals</term><term>Monomials</term><term>Morphism</term><term>Noetherian</term><term>Noetherian preschemes</term><term>Numerical polynomial</term><term>Open subset</term><term>Polynomial ring</term><term>Prescheme</term><term>Preschemes</term><term>Prime cycle</term><term>Prime cycles</term><term>Prime ideals</term><term>Prime sequence</term><term>Projective</term><term>Projective space</term><term>Quotient</term><term>Quotient field</term><term>Rational curve</term><term>Representable</term><term>Residue field</term><term>Resp</term><term>Robin</term><term>Robin hartshorne</term><term>Same dimension</term><term>Same hilbert polynomial</term><term>Sheaf</term><term>Spec</term><term>Subprescheme</term><term>Subpreschemes</term><term>Subscheme</term><term>Subset</term><term>Sufficient condition</term><term>Surjective</term><term>Tight fans</term></keywords></textClass><langUsage><language ident="en">en</language></langUsage></profileDesc></teiHeader></TEI><affiliations><list></list><tree><noCountry><name sortKey="Hartshorne, Robin" sort="Hartshorne, Robin" uniqKey="Hartshorne R" first="Robin" last="Hartshorne">Robin Hartshorne</name></noCountry></tree></affiliations></record>Pour manipuler ce document sous Unix (Dilib)
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