Weights of exponential sums, intersection cohomology, and Newton polyhedra
Identifieur interne : 000641 ( France/Analysis ); précédent : 000640; suivant : 000642Weights of exponential sums, intersection cohomology, and Newton polyhedra
Auteurs : J. Denef [Belgique] ; F. Loeser [France]Source :
- Inventiones mathematicae [ 0020-9910 ] ; 1991-12-01.
English descriptors
- KwdEn :
- Absolute value, Acyclic, Adolphson, Affine, Berlin heidelberg, Closure, Cohomology, Combinatorial type, Commutative ring, Compactification, Convex, Convex polyhedral cone, Convex polytope, Denef, Discrete valuation ring, Duality, Eigenvalue, Explicit formulas, Exponential, Exponential sums, Finite number, Finite type, First assertion, Frobenius action, Infinity, Interior point, Intersection cohomology, Isomorphism, Laurent, Laurent polynomial, Lemma, Locus, Loeser, Natural maps, Newton polyhedra, Newton polyhedron, Nondegenerate, Notes math, Open subscheme, Poincar6, Poincar6 duality, Poincar6 polynomials, Polyhedral, Polyhedron, Polytope, Present paper, Pure dimension, Purity theorem, Ramification, Residue field, Second assertion, Simplicial, Smallest face, Special cases, Sperber, Subscheme, Suffices, Suitable change, Tame ramification, Toric, Toric varieties, Toroidal, Toroidal compactification, Torus, Unique cone.
- Teeft :
- Absolute value, Acyclic, Adolphson, Affine, Berlin heidelberg, Closure, Cohomology, Combinatorial type, Commutative ring, Compactification, Convex, Convex polyhedral cone, Convex polytope, Denef, Discrete valuation ring, Duality, Eigenvalue, Explicit formulas, Exponential, Exponential sums, Finite number, Finite type, First assertion, Frobenius action, Infinity, Interior point, Intersection cohomology, Isomorphism, Laurent, Laurent polynomial, Lemma, Locus, Loeser, Natural maps, Newton polyhedra, Newton polyhedron, Nondegenerate, Notes math, Open subscheme, Poincar6, Poincar6 duality, Poincar6 polynomials, Polyhedral, Polyhedron, Polytope, Present paper, Pure dimension, Purity theorem, Ramification, Residue field, Second assertion, Simplicial, Smallest face, Special cases, Sperber, Subscheme, Suffices, Suitable change, Tame ramification, Toric, Toric varieties, Toroidal, Toroidal compactification, Torus, Unique cone.
Url:
DOI: 10.1007/BF01243914
Affiliations:
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ISTEX:9F445270FB32ED7781609C63DE14670F374704C4Le document en format XML
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<term>Closure</term>
<term>Cohomology</term>
<term>Combinatorial type</term>
<term>Commutative ring</term>
<term>Compactification</term>
<term>Convex</term>
<term>Convex polyhedral cone</term>
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<term>Denef</term>
<term>Discrete valuation ring</term>
<term>Duality</term>
<term>Eigenvalue</term>
<term>Explicit formulas</term>
<term>Exponential</term>
<term>Exponential sums</term>
<term>Finite number</term>
<term>Finite type</term>
<term>First assertion</term>
<term>Frobenius action</term>
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<term>Intersection cohomology</term>
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<term>Laurent</term>
<term>Laurent polynomial</term>
<term>Lemma</term>
<term>Locus</term>
<term>Loeser</term>
<term>Natural maps</term>
<term>Newton polyhedra</term>
<term>Newton polyhedron</term>
<term>Nondegenerate</term>
<term>Notes math</term>
<term>Open subscheme</term>
<term>Poincar6</term>
<term>Poincar6 duality</term>
<term>Poincar6 polynomials</term>
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<term>Polyhedron</term>
<term>Polytope</term>
<term>Present paper</term>
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<term>Convex polyhedral cone</term>
<term>Convex polytope</term>
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<term>Discrete valuation ring</term>
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<term>Eigenvalue</term>
<term>Explicit formulas</term>
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<term>Finite number</term>
<term>Finite type</term>
<term>First assertion</term>
<term>Frobenius action</term>
<term>Infinity</term>
<term>Interior point</term>
<term>Intersection cohomology</term>
<term>Isomorphism</term>
<term>Laurent</term>
<term>Laurent polynomial</term>
<term>Lemma</term>
<term>Locus</term>
<term>Loeser</term>
<term>Natural maps</term>
<term>Newton polyhedra</term>
<term>Newton polyhedron</term>
<term>Nondegenerate</term>
<term>Notes math</term>
<term>Open subscheme</term>
<term>Poincar6</term>
<term>Poincar6 duality</term>
<term>Poincar6 polynomials</term>
<term>Polyhedral</term>
<term>Polyhedron</term>
<term>Polytope</term>
<term>Present paper</term>
<term>Pure dimension</term>
<term>Purity theorem</term>
<term>Ramification</term>
<term>Residue field</term>
<term>Second assertion</term>
<term>Simplicial</term>
<term>Smallest face</term>
<term>Special cases</term>
<term>Sperber</term>
<term>Subscheme</term>
<term>Suffices</term>
<term>Suitable change</term>
<term>Tame ramification</term>
<term>Toric</term>
<term>Toric varieties</term>
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