An Introduction to G-Functions. (AM-133), Volume 133 / / Bernard Dwork, Francis J. Sullivan, Giovanni Gerotto
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| Autore: |
Dwork Bernard
|
| Titolo: |
An Introduction to G-Functions. (AM-133), Volume 133 / / Bernard Dwork, Francis J. Sullivan, Giovanni Gerotto
|
| Pubblicazione: | Princeton, NJ : , : Princeton University Press, , [2016] |
| ©1994 | |
| Descrizione fisica: | 1 online resource (349 pages) : illustrations |
| Disciplina: | 515/.55 |
| Soggetto topico: | H-functions |
| p-adic analysis | |
| Soggetto non controllato: | Adjoint |
| Algebraic Method | |
| Algebraic closure | |
| Algebraic number field | |
| Algebraic number theory | |
| Algebraic variety | |
| Algebraically closed field | |
| Analytic continuation | |
| Analytic function | |
| Argument principle | |
| Arithmetic | |
| Automorphism | |
| Bearing (navigation) | |
| Binomial series | |
| Calculation | |
| Cardinality | |
| Cartesian coordinate system | |
| Cauchy sequence | |
| Cauchy's theorem (geometry) | |
| Coefficient | |
| Cohomology | |
| Commutative ring | |
| Complete intersection | |
| Complex analysis | |
| Conjecture | |
| Density theorem | |
| Differential equation | |
| Dimension (vector space) | |
| Direct sum | |
| Discrete valuation | |
| Eigenvalues and eigenvectors | |
| Elliptic curve | |
| Equation | |
| Equivalence class | |
| Estimation | |
| Existential quantification | |
| Exponential function | |
| Exterior algebra | |
| Field of fractions | |
| Finite field | |
| Formal power series | |
| Fuchs' theorem | |
| G-module | |
| Galois extension | |
| Galois group | |
| General linear group | |
| Generic point | |
| Geometry | |
| Hypergeometric function | |
| Identity matrix | |
| Inequality (mathematics) | |
| Intercept method | |
| Irreducible element | |
| Irreducible polynomial | |
| Laurent series | |
| Limit of a sequence | |
| Linear differential equation | |
| Lowest common denominator | |
| Mathematical induction | |
| Meromorphic function | |
| Modular arithmetic | |
| Module (mathematics) | |
| Monodromy | |
| Monotonic function | |
| Multiplicative group | |
| Natural number | |
| Newton polygon | |
| Number theory | |
| P-adic number | |
| Parameter | |
| Permutation | |
| Polygon | |
| Polynomial | |
| Projective line | |
| Q.E.D. | |
| Quadratic residue | |
| Radius of convergence | |
| Rational function | |
| Rational number | |
| Residue field | |
| Riemann hypothesis | |
| Ring of integers | |
| Root of unity | |
| Separable polynomial | |
| Sequence | |
| Siegel's lemma | |
| Special case | |
| Square root | |
| Subring | |
| Subset | |
| Summation | |
| Theorem | |
| Topology of uniform convergence | |
| Transpose | |
| Triangle inequality | |
| Unipotent | |
| Valuation ring | |
| Weil conjecture | |
| Wronskian | |
| Y-intercept | |
| Persona (resp. second.): | GerottoGiovanni |
| SullivanFrancis J. | |
| Nota di bibliografia: | Includes bibliographical references and index. |
| Nota di contenuto: | Frontmatter -- CONTENTS -- PREFACE / Dwork, B. -- INTRODUCTION -- LIST OF SYMBOLS -- CHAPTER I. VALUED FIELDS -- CHAPTER II. ZETA FUNCTIONS -- CHAPTER III. DIFFERENTIAL EQUATIONS -- CHAPTER IV. EFFECTIVE BOUNDS. ORDINARY DISKS -- CHAPTER V. EFFECTIVE BOUNDS. SINGULAR DISKS -- CHAPTER VI. TRANSFER THEOREMS INTO DISKS WITH ONE SINGULARITY -- CHAPTER VII. DIFFERENTIAL EQUATIONS OF ARITHMETIC TYPE -- CHAPTER VIII. G-SERIES. THE THEOREM OF CHUDNOVSKY -- APPENDIX I. CONVERGENCE POLYGON FOR DIFFERENTIAL EQUATIONS -- APPENDIX II. ARCHIMEDEAN ESTIMATES -- APPENDIX III. CAUCHY'S THEOREM -- BIBLIOGRAPHY -- INDEX |
| Sommario/riassunto: | Written for advanced undergraduate and first-year graduate students, this book aims to introduce students to a serious level of p-adic analysis with important implications for number theory. The main object is the study of G-series, that is, power series y=aij=0 Ajxj with coefficients in an algebraic number field K. These series satisfy a linear differential equation Ly=0 with LIK(x) [d/dx] and have non-zero radii of convergence for each imbedding of K into the complex numbers. They have the further property that the common denominators of the first s coefficients go to infinity geometrically with the index s. After presenting a review of valuation theory and elementary p-adic analysis together with an application to the congruence zeta function, this book offers a detailed study of the p-adic properties of formal power series solutions of linear differential equations. In particular, the p-adic radii of convergence and the p-adic growth of coefficients are studied. Recent work of Christol, Bombieri, André, and Dwork is treated and augmented. The book concludes with Chudnovsky's theorem: the analytic continuation of a G -series is again a G -series. This book will be indispensable for those wishing to study the work of Bombieri and André on global relations and for the study of the arithmetic properties of solutions of ordinary differential equations. |
| Titolo autorizzato: | An Introduction to G-Functions. (AM-133), Volume 133 |
| ISBN: | 1-4008-8254-0 |
| Formato: | Materiale a stampa  |
| Livello bibliografico | Monografia |
| Lingua di pubblicazione: | Inglese |
| Record Nr.: | 9910154744303321 |
| Lo trovi qui: | Univ. Federico II |
| Opac: | Controlla la disponibilità qui |
Serie:
Annals of mathematics studies ; ; no. 133.