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This book provides a lucid exposition of the connections between non-commutative geometry and the famous Riemann Hypothesis, focusing on the theory of one-dimensional varieties over a finite field. The reader will encounter many important aspects of the theory, such as Bombieri's proof of the Riemann Hypothesis for function fields, along with an explanation of the connections with Nevanlinna theory and non-commutative geometry. The connection with non-commutative geometry is given special attention, with a complete determination of the Weil terms in the explicit formula for the point counting function as a trace of a shift operator on the additive space, and a discussion of how to obtain the explicit formula from the action of the idele class group on the space of adele classes. The exposition is accessible at the graduate level and above, and provides a wealth of motivation for further research in this area.
Riemann hypothesis. --- Noncommutative differential geometry. --- Algebraic fields.
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Théorie --- Riemann, Hugo, --- Théorie --- Music theory --- Music --- Musical theory --- Theory of music --- Theory --- Riemann, Karl Wilhelm Julius Hugo, --- Riemann, Carl Wilhelm Julius Hugo, --- Riman, Gugo, --- Riemann, H. --- Riemann, Ugo, --- Criticism and interpretation. --- Musique --- Handbooks, manuals, etc --- Guides, manuels, etc --- Riemann, Hugo --- Duitsland
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Ce Petit traité d’intégration développe une approche originale de l’intégrale. Cette approche, que l’on pourrait qualifier de globale, est due aux deux mathématiciens Jaroslaw Kurzweil et Ralph Henstock. L’enseignement de l’intégration se fait d’ordinaire en deux temps. On débute en proposant des approximations de l’aire située sous le graphe de la fonction sous la forme de sommes de Riemann, ce qui est bien adapté au calcul différentiel et intégral portant sur des fonctions régulières. On présente ensuite l’intégrale de Lebesgue en lien avec la théorie de la mesure. L’approche de Kurzweil et Henstock est proche de celle de Riemann, à cela près que le pas des subdivisions de l’intervalle pour le calcul de l’aire peut ne pas être constant. L’intérêt de cette méthode est de contenir la théorie de Lebesgue et d’être optimale pour le calcul différentiel. Ce livre concerne au premier chef les étudiants de mathématiques de tous les cycles (licence, master, préparation aux concours de l’enseignement…). Il intéressera également les enseignants de mathématiques ou de physique et, plus généralement, les ingénieurs et scientifiques qui font usage de la théorie de l’intégration.
Integration, Functional. --- Riemann integral. --- Henstock-Kurzweil integral. --- Riemann, Bernhard, --- Lebesgue, Henri Léon, --- Gauge integral --- Generalized Riemann integral --- Henstock integrals --- HK integral --- Kurzweil-Henstock integral --- Kurzweil integral --- Riemann integral, Generalized --- Integral, Riemann --- Functional integration --- Lebeg, Anri, --- Riemann, B. --- Riman, Georg Fridrikh Bernkhard, --- Riman, Bernkhard, --- Riemann, Georg Friedrich Bernhard, --- Integrals, Generalized --- Definite integrals --- Functional analysis --- Lebesgue, Henri, --- Functions of several complex variables. --- Fonctions de plusieurs variables complexes. --- Intégration de fonctions.
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Differential geometry. Global analysis --- Polytopes. --- Orthogonal polynomials. --- Geometry, Riemannian. --- Polytopes --- Polynômes orthogonaux --- Riemann, Géométrie de --- Polynômes orthogonaux --- Riemann, Géométrie de
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Krichever and Novikov introduced certain classes of infinite dimensional Lie algebras to extend the Virasoro algebra and its related algebras to Riemann surfaces of higher genus. The author of this book generalized and extended them to a more general setting needed by the applications. Examples of applications are Conformal Field Theory, Wess-Zumino-Novikov-Witten models, moduli space problems, integrable systems, Lax operator algebras, and deformation theory of Lie algebra. Furthermore they constitute an important class of infinite dimensional Lie algebras which due to their geometric
Infinite dimensional Lie algebras. --- Conformal field theory. --- Lie algebras. --- Mathematical physics. --- Moduli spaces. --- Riemann surfaces.
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Mathematical physics. --- Geometry, Riemannian. --- Topological spaces. --- Physique mathématique --- Riemann, Géométrie de --- Espaces topologiques
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Krichever and Novikov introduced certain classes of infinite dimensional Lie algebras to extend the Virasoro algebra and its related algebras to Riemann surfaces of higher genus. The author of this book generalized and extended them to a more general setting needed by the applications. Examples of applications are Conformal Field Theory, Wess-Zumino-Novikov-Witten models, moduli space problems, integrable systems, Lax operator algebras, and deformation theory of Lie algebra. Furthermore they constitute an important class of infinite dimensional Lie algebras which due to their geometric
Infinite dimensional Lie algebras. --- Conformal field theory. --- Lie algebras. --- Mathematical physics. --- Moduli spaces. --- Riemann surfaces.
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This volume is a compilation of papers presented at the conference on differential geometry, in particular, minimal surfaces, real hypersurfaces of a non-flat complex space form, submanifolds of symmetric spaces and curve theory. It also contains new results or brief surveys in these areas. This volume provides fundamental knowledge to readers (such as differential geometers) who are interested in the theory of real hypersurfaces in a non-flat complex space form.
Geometry, Differential. --- CR submanifolds. --- Differentiable manifolds. --- Differential manifolds --- Manifolds (Mathematics) --- Cauchy-Riemann submanifolds --- Submanifolds, CR --- Differential geometry --- Geometry, Differential --- Submanifolds
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Riemannian manifolds --- Global differential geometry --- Orbifolds --- Three-manifolds (Topology) --- Ricci, flow --- Riemann, Variétés de --- Géométrie différentielle globale --- Orbivariétés --- Variétés topologiques à 3 dimensions --- Ricci, Flot de --- Riemann, Variétés de. --- Géométrie différentielle globale. --- Orbivariétés. --- Variétés topologiques à 3 dimensions. --- Ricci, Flot de. --- Ricci flow.
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