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Algebraic geometry --- Algebraïsche meetkunde --- Geometry [Algebraic ] --- Géométrie algébrique --- Meetkunde [Algebraïsche ] --- Geometry, Algebraic. --- Geometry --- Geometry, Algebraic
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Ordered algebraic structures --- Algebraic geometry --- Algebraic topology --- Algebras [Associative ] --- Algebraïsche meetkunde --- Algebraïsche topologie --- Algèbres associatives --- Associatieve algebra's --- Associative algebras --- Geometry [Algebraic ] --- Géométrie algébrique --- Meetkunde [Algebraïsche ] --- Schema's (Algebraïsche meetkunde) --- Schemes (Algebraic geometry) --- Schémas (Géometrie algébrique) --- Topologie algébrique
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In September 1997, the Working Week on Resolution of Singularities was held at Obergurgl in the Tyrolean Alps. Its objective was to manifest the state of the art in the field and to formulate major questions for future research. The four courses given during this week were written up by the speakers and make up part I of this volume. They are complemented in part II by fifteen selected contributions on specific topics and resolution theories. The volume is intended to provide a broad and accessible introduction to resolution of singularities leading the reader directly to concrete research problems.
Differential geometry. Global analysis --- 512.76 --- Singularities (Mathematics) --- Geometry, Algebraic --- Birational geometry. Mappings etc. --- 512.76 Birational geometry. Mappings etc. --- Birational geometry. Mappings etc --- Géométrie algébrique --- Singularités (mathématiques) --- Algebraic geometry. --- Topology. --- Applied mathematics. --- Engineering mathematics. --- Algebraic Geometry. --- Applications of Mathematics. --- Engineering --- Engineering analysis --- Mathematical analysis --- Analysis situs --- Position analysis --- Rubber-sheet geometry --- Geometry --- Polyhedra --- Set theory --- Algebras, Linear --- Algebraic geometry --- Mathematics --- Géométrie algébrique.
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Grothendieck's duality theory for coherent cohomology is a fundamental tool in algebraic geometry and number theory, in areas ranging from the moduli of curves to the arithmetic theory of modular forms. Presented is a systematic overview of the entire theory, including many basic definitions and a detailed study of duality on curves, dualizing sheaves, and Grothendieck's residue symbol. Along the way proofs are given of some widely used foundational results which are not proven in existing treatments of the subject, such as the general base change compatibility of the trace map for proper Cohen-Macaulay morphisms (e.g., semistable curves). This should be of interest to mathematicians who have some familiarity with Grothendieck's work and wish to understand the details of this theory.
Duality theory (Mathematics) --- Schemes (Algebraic geometry) --- Dualiteit [Theorie van de ] (Wiskunde) --- Dualité [Théorie de la ] (Mathématiques) --- Mathematics duality theory --- Schema's (Algebraïsche meetkunde) --- Schémas (Géometrie algébrique) --- Theorie van de dualiteit (Wiskunde) --- Théorie de la dualité (Mathématiques) --- Ordered algebraic structures --- Algebraic geometry. --- Number theory. --- Algebraic Geometry. --- Number Theory. --- Number study --- Numbers, Theory of --- Algebra --- Algebraic geometry --- Geometry
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