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

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

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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Superior document:Title is part of eBook package: De Gruyter Princeton Annals of Mathematics eBook-Package 1940-2020
VerfasserIn:
Berkovich, Vladimir G.,
Place / Publishing House:Princeton, NJ : : Princeton University Press, , [2006]
©2007
Year of Publication:2006
Edition:Course Book
Language:English
Series:Annals of Mathematics Studies ; 162
Online Access:
Physical Description:1 online resource (168 p.) :; 14 line illus.
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100 1 |a Berkovich, Vladimir G.,   |e author.  |4 aut  |4 http://id.loc.gov/vocabulary/relators/aut 
245 1 0 |a Integration of One-forms on P-adic Analytic Spaces. (AM-162) /  |c Vladimir G. Berkovich. 
250 |a Course Book 
264 1 |a Princeton, NJ :   |b Princeton University Press,   |c [2006] 
264 4 |c ©2007 
300 |a 1 online resource (168 p.) :  |b 14 line illus. 
336 |a text  |b txt  |2 rdacontent 
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490 0 |a Annals of Mathematics Studies ;  |v 162 
505 0 0 |t Frontmatter --   |t Contents --   |t Introduction --   |t 1. Naive Analytic Functions and Formulation of the Main Result --   |t 2. Étale Neighborhoods of a Point in a Smooth Analytic Space --   |t 3. Properties of Strictly Poly-stable and Marked Formal Schemes --   |t 4. Properties of the Sheaves Ω1.dx/dOX --   |t 5. Isocrystals --   |t 6. F-isocrystals --   |t 7. Construction of the Sheaves SλX --   |t 8. Properties of the sheaves SλX --   |t 9. Integration and Parallel Transport along a Path --   |t References --   |t Index of Notation --   |t Index of Terminology 
506 0 |a restricted access  |u http://purl.org/coar/access_right/c_16ec  |f online access with authorization  |2 star 
520 |a 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. 
530 |a Issued also in print. 
538 |a Mode of access: Internet via World Wide Web. 
546 |a In English. 
588 0 |a Description based on online resource; title from PDF title page (publisher's Web site, viewed 31. Jan 2022) 
650 0 |a Analyse p-adique. 
650 0 |a p-adic analysis. 
650 7 |a MATHEMATICS / Geometry / Non-Euclidean.  |2 bisacsh 
653 |a Abelian category. 
653 |a Acting in. 
653 |a Addition. 
653 |a Aisle. 
653 |a Algebraic closure. 
653 |a Algebraic curve. 
653 |a Algebraic structure. 
653 |a Algebraic variety. 
653 |a Allegory (category theory). 
653 |a Analytic function. 
653 |a Analytic geometry. 
653 |a Analytic space. 
653 |a Archimedean property. 
653 |a Arithmetic. 
653 |a Banach algebra. 
653 |a Bertolt Brecht. 
653 |a Buttress. 
653 |a Centrality. 
653 |a Clerestory. 
653 |a Commutative diagram. 
653 |a Commutative property. 
653 |a Complex analysis. 
653 |a Contradiction. 
653 |a Corollary. 
653 |a Cosmetics. 
653 |a De Rham cohomology. 
653 |a Determinant. 
653 |a Diameter. 
653 |a Differential form. 
653 |a Dimension (vector space). 
653 |a Divisor. 
653 |a Elaboration. 
653 |a Embellishment. 
653 |a Equanimity. 
653 |a Equivalence class (music). 
653 |a Existential quantification. 
653 |a Facet (geometry). 
653 |a Femininity. 
653 |a Finite morphism. 
653 |a Formal scheme. 
653 |a Fred Astaire. 
653 |a Functor. 
653 |a Gavel. 
653 |a Generic point. 
653 |a Geometry. 
653 |a Gothic architecture. 
653 |a Homomorphism. 
653 |a Hypothesis. 
653 |a Imagery. 
653 |a Injective function. 
653 |a Irreducible component. 
653 |a Iterated integral. 
653 |a Linear combination. 
653 |a Logarithm. 
653 |a Marni Nixon. 
653 |a Masculinity. 
653 |a Mathematical induction. 
653 |a Mathematics. 
653 |a Mestizo. 
653 |a Metaphor. 
653 |a Morphism. 
653 |a Natural number. 
653 |a Neighbourhood (mathematics). 
653 |a Neuroticism. 
653 |a Noetherian. 
653 |a Notation. 
653 |a One-form. 
653 |a Open set. 
653 |a P-adic Hodge theory. 
653 |a P-adic number. 
653 |a Parallel transport. 
653 |a Patrick Swayze. 
653 |a Phrenology. 
653 |a Politics. 
653 |a Polynomial. 
653 |a Prediction. 
653 |a Proportion (architecture). 
653 |a Pullback. 
653 |a Purely inseparable extension. 
653 |a Reims. 
653 |a Requirement. 
653 |a Residue field. 
653 |a Rhomboid. 
653 |a Roland Barthes. 
653 |a Satire. 
653 |a Self-sufficiency. 
653 |a Separable extension. 
653 |a Sheaf (mathematics). 
653 |a Shuffle algebra. 
653 |a Subgroup. 
653 |a Suggestion. 
653 |a Technology. 
653 |a Tensor product. 
653 |a Theorem. 
653 |a Transept. 
653 |a Triforium. 
653 |a Tubular neighborhood. 
653 |a Underpinning. 
653 |a Writing. 
653 |a Zariski topology. 
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776 0 |c print  |z 9780691128627 
856 4 0 |u https://doi.org/10.1515/9781400837151 
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912 |a 978-3-11-044250-2 Princeton University Press eBook-Package Backlist 2000-2013  |c 2000  |d 2013 
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