Rigid Local Systems. (AM-139), Volume 139 / / Nicholas M. Katz
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| Autore: |
Katz Nicholas M.
|
| Titolo: |
Rigid Local Systems. (AM-139), Volume 139 / / Nicholas M. Katz
|
| Pubblicazione: | Princeton, NJ : , : Princeton University Press, , [2016] |
| ©1996 | |
| Descrizione fisica: | 1 online resource (233 pages) |
| Disciplina: | 515/.35 |
| Soggetto topico: | Differential equations - Numerical solutions |
| Hypergeometric functions | |
| Sheaf theory | |
| Soggetto non controllato: | Additive group |
| Alexander Grothendieck | |
| Algebraic closure | |
| Algebraic differential equation | |
| Algebraically closed field | |
| Algorithm | |
| Analytic continuation | |
| Automorphism | |
| Axiom of choice | |
| Bernhard Riemann | |
| Big O notation | |
| Calculation | |
| Carlos Simpson | |
| Coefficient | |
| Cohomology | |
| Commutator | |
| Compactification (mathematics) | |
| Comparison theorem | |
| Complex analytic space | |
| Complex conjugate | |
| Complex manifold | |
| Conjecture | |
| Conjugacy class | |
| Convolution | |
| Corollary | |
| Cube root | |
| Cusp form | |
| De Rham cohomology | |
| Differential equation | |
| Dimension | |
| Dimensional analysis | |
| Discrete valuation ring | |
| Disjoint union | |
| Divisor | |
| Duality (mathematics) | |
| Eigenfunction | |
| Eigenvalues and eigenvectors | |
| Elliptic curve | |
| Equation | |
| Equivalence of categories | |
| Exact sequence | |
| Existential quantification | |
| Finite field | |
| Finite set | |
| Fourier transform | |
| Functor | |
| Fundamental group | |
| Generic point | |
| Ground field | |
| Hodge structure | |
| Hypergeometric function | |
| Integer | |
| Invertible matrix | |
| Isomorphism class | |
| Jordan normal form | |
| Level of measurement | |
| Linear differential equation | |
| Local system | |
| Mathematical induction | |
| Mathematics | |
| Matrix (mathematics) | |
| Monodromy | |
| Monomial | |
| Morphism | |
| Natural filtration | |
| Parameter | |
| Parity (mathematics) | |
| Perfect field | |
| Perverse sheaf | |
| Polynomial | |
| Prime number | |
| Projective representation | |
| Projective space | |
| Pullback (category theory) | |
| Pullback | |
| Rational function | |
| Regular singular point | |
| Relative dimension | |
| Residue field | |
| Ring of integers | |
| Root of unity | |
| Sequence | |
| Sesquilinear form | |
| Set (mathematics) | |
| Sheaf (mathematics) | |
| Six operations | |
| Special case | |
| Subgroup | |
| Subobject | |
| Subring | |
| Suggestion | |
| Summation | |
| Tensor product | |
| Theorem | |
| Theory | |
| Topology | |
| Triangular matrix | |
| Trivial representation | |
| Vector space | |
| Zariski topology | |
| Nota di bibliografia: | Includes bibliographical references. |
| Nota di contenuto: | Frontmatter -- Contents -- Introduction -- CHAPTER 1. First results on rigid local systems -- CHAPTER 2. The theory of middle convolution -- CHAPTER 3. Fourier Transform and rigidity -- CHAPTER 4. Middle convolution: dependence on parameters -- CHAPTER 5. Structure of rigid local systems -- CHAPTER 6. Existence algorithms for rigids -- CHAPTER 7. Diophantine aspects of rigidity -- CHAPTER 8. Motivic description of rigids -- CHAPTER 9. Grothendieck's p-curvature conjecture for rigids -- References |
| Sommario/riassunto: | Riemann introduced the concept of a "local system" on P1-{a finite set of points} nearly 140 years ago. His idea was to study nth order linear differential equations by studying the rank n local systems (of local holomorphic solutions) to which they gave rise. His first application was to study the classical Gauss hypergeometric function, which he did by studying rank-two local systems on P1- {0,1,infinity}. His investigation was successful, largely because any such (irreducible) local system is rigid in the sense that it is globally determined as soon as one knows separately each of its local monodromies. It became clear that luck played a role in Riemann's success: most local systems are not rigid. Yet many classical functions are solutions of differential equations whose local systems are rigid, including both of the standard nth order generalizations of the hypergeometric function, n F n-1's, and the Pochhammer hypergeometric functions. This book is devoted to constructing all (irreducible) rigid local systems on P1-{a finite set of points} and recognizing which collections of independently given local monodromies arise as the local monodromies of irreducible rigid local systems. Although the problems addressed here go back to Riemann, and seem to be problems in complex analysis, their solutions depend essentially on a great deal of very recent arithmetic algebraic geometry, including Grothendieck's etale cohomology theory, Deligne's proof of his far-reaching generalization of the original Weil Conjectures, the theory of perverse sheaves, and Laumon's work on the l-adic Fourier Transform. |
| Titolo autorizzato: | Rigid Local Systems. (AM-139), Volume 139 |
| ISBN: | 1-4008-8259-1 |
| Formato: | Materiale a stampa  |
| Livello bibliografico | Monografia |
| Lingua di pubblicazione: | Inglese |
| Record Nr.: | 9910154746203321 |
| Lo trovi qui: | Univ. Federico II |
| Opac: | Controlla la disponibilità qui |
Serie:
Annals of mathematics studies ; ; no. 139.