Integration of One-forms on P-adic Analytic Spaces. (AM-162) /

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Among the many differences between classical and p-adic objects, those related to differential equations occupy a special place. For example, a closed p-adic analytic one-form defined on a simply-connected domain does not necessarily have a primitive in the class of analytic functions. In the early...

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Detalles Bibliográficos
Clasificación:Libro Electrónico
Autor principal: Berkovich, Vladimir G. (Autor)
Formato: Electrónico eBook
Idioma:Inglés
Publicado: Princeton, NJ : Princeton University Press, [2006]
Edición:Course Book
Colección:Annals of Mathematics Studies ; 162
Temas:
Analyse p-adique.
p-adic analysis.
MATHEMATICS / Geometry / Non-Euclidean.
Abelian category.
Acting in.
Addition.
Aisle.
Algebraic closure.
Algebraic curve.
Algebraic structure.
Algebraic variety.
Allegory (category theory).
Analytic function.
Analytic geometry.
Analytic space.
Archimedean property.
Arithmetic.
Banach algebra.
Bertolt Brecht.
Buttress.
Centrality.
Clerestory.
Commutative diagram.
Commutative property.
Complex analysis.
Contradiction.
Corollary.
Cosmetics.
De Rham cohomology.
Determinant.
Diameter.
Differential form.
Dimension (vector space).
Divisor.
Elaboration.
Embellishment.
Equanimity.
Equivalence class (music).
Existential quantification.
Facet (geometry).
Femininity.
Finite morphism.
Formal scheme.
Fred Astaire.
Functor.
Gavel.
Generic point.
Geometry.
Gothic architecture.
Homomorphism.
Hypothesis.
Imagery.
Injective function.
Irreducible component.
Iterated integral.
Linear combination.
Logarithm.
Marni Nixon.
Masculinity.
Mathematical induction.
Mathematics.
Mestizo.
Metaphor.
Morphism.
Natural number.
Neighbourhood (mathematics).
Neuroticism.
Noetherian.
Notation.
One-form.
Open set.
P-adic Hodge theory.
P-adic number.
Parallel transport.
Patrick Swayze.
Phrenology.
Politics.
Polynomial.
Prediction.
Proportion (architecture).
Pullback.
Purely inseparable extension.
Reims.
Requirement.
Residue field.
Rhomboid.
Roland Barthes.
Satire.
Self-sufficiency.
Separable extension.
Sheaf (mathematics).
Shuffle algebra.
Subgroup.
Suggestion.
Technology.
Tensor product.
Theorem.
Transept.
Triforium.
Tubular neighborhood.
Underpinning.
Writing.
Zariski topology.
Acceso en línea:Texto completo
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Descripción
Sumario:Among the many differences between classical and p-adic objects, those related to differential equations occupy a special place. For example, a closed p-adic analytic one-form defined on a simply-connected domain does not necessarily have a primitive in the class of analytic functions. In the early 1980s, Robert Coleman discovered a way to construct primitives of analytic one-forms on certain smooth p-adic analytic curves in a bigger class of functions. Since then, there have been several attempts to generalize his ideas to smooth p-adic analytic spaces of higher dimension, but the spaces considered were invariably associated with algebraic varieties. This book aims to show that every smooth p-adic analytic space is provided with a sheaf of functions that includes all analytic ones and satisfies a uniqueness property. It also contains local primitives of all closed one-forms with coefficients in the sheaf that, in the case considered by Coleman, coincide with those he constructed. In consequence, one constructs a parallel transport of local solutions of a unipotent differential equation and an integral of a closed one-form along a path so that both depend nontrivially on the homotopy class of the path. Both the author's previous results on geometric properties of smooth p-adic analytic spaces and the theory of isocrystals are further developed in this book, which is aimed at graduate students and mathematicians working in the areas of non-Archimedean analytic geometry, number theory, and algebraic geometry.
Descripción Física:1 online resource (168 p.) : 14 line illus.
ISBN:9781400837151
9783110494914
9783110442502
Acceso:restricted access

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