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Weil's Conjecture for Function Fields: Volume I (AMS-199) (Annals of Mathematics Studies (199))
Published by Princeton University Press, 2019
ISBN 10: 0691182132 ISBN 13: 9780691182131
Language: English
Condition: New.
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Weil's Conjecture for Function Fields
Published by Princeton University Press, 2019
ISBN 10: 0691182132 ISBN 13: 9780691182131
Language: English
Condition: New.
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Weil`s Conjecture for Function Fields - Volume I
Published by Princeton University Press, 2019
ISBN 10: 0691182132 ISBN 13: 9780691182131
Language: English
HRD. Condition: New. New Book. Shipped from UK. Established seller since 2000.
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Weil`s Conjecture for Function Fields - Volume I
Published by Princeton University Press, 2019
ISBN 10: 0691182132 ISBN 13: 9780691182131
Language: English
Seller: PBShop.store UK, Fairford, GLOS, United Kingdom
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Weil's Conjecture for Function Fields
Published by Princeton University Press, 2019
ISBN 10: 0691182132 ISBN 13: 9780691182131
Language: English
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Weil's Conjecture for Function Fields
Published by Princeton University Press, 2019
ISBN 10: 0691182132 ISBN 13: 9780691182131
Language: English
Condition: As New. Unread book in perfect condition.
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Weil?s Conjecture for Function Fields: Volume I (AMS-199)
Published by Princeton University Press, 2019
ISBN 10: 0691182132 ISBN 13: 9780691182131
Language: English
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Weil's Conjecture for Function Fields
Published by Princeton University Press, 2019
ISBN 10: 0691182132 ISBN 13: 9780691182131
Language: English
Seller: GreatBookPricesUK, Woodford Green, United Kingdom
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Weil's Conjecture for Function Fields: Volume I (Annals of Mathematics Studies, 199)
Published by Princeton University Press, 2019
ISBN 10: 0691182132 ISBN 13: 9780691182131
Language: English
Seller: Ria Christie Collections, Uxbridge, United Kingdom
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Add to basketCondition: New. Über den AutorDennis Gaitsgory is professor of mathematics at Harvard University. He is the coauthor of A Study in Derived Algebraic Geometry. Jacob Lurie is professor of mathematics at Harvard University. He is.
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Weil s Conjecture for Function Fields: Volume I (AMS-199)
Published by Princeton University Press, 2019
ISBN 10: 0691182132 ISBN 13: 9780691182131
Language: English
Condition: New. 2019. Hardcover. . . . . . Books ship from the US and Ireland.
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Weil's Conjecture for Function Fields
Published by Princeton University Press, US, 2019
ISBN 10: 0691182132 ISBN 13: 9780691182131
Language: English
Hardback. Condition: New. A central concern of number theory is the study of local-to-global principles, which describe the behavior of a global field K in terms of the behavior of various completions of K. This book looks at a specific example of a local-to-global principle: Weil's conjecture on the Tamagawa number of a semisimple algebraic group G over K. In the case where K is the function field of an algebraic curve X, this conjecture counts the number of G-bundles on X (global information) in terms of the reduction of G at the points of X (local information). The goal of this book is to give a conceptual proof of Weil's conjecture, based on the geometry of the moduli stack of G-bundles. Inspired by ideas from algebraic topology, it introduces a theory of factorization homology in the setting ?-adic sheaves. Using this theory, Dennis Gaitsgory and Jacob Lurie articulate a different local-to-global principle: a product formula that expresses the cohomology of the moduli stack of G-bundles (a global object) as a tensor product of local factors.Using a version of the Grothendieck-Lefschetz trace formula, Gaitsgory and Lurie show that this product formula implies Weil's conjecture. The proof of the product formula will appear in a sequel volume.
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Add to basketHardcover. Condition: Brand New. 328 pages. 9.00x6.50x1.00 inches. In Stock.
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Weil's Conjecture for Function Fields : Volume I
Published by Princeton University Press Feb 2019, 2019
ISBN 10: 0691182132 ISBN 13: 9780691182131
Language: English
£ 172.10
Convert currency£ 55.29 shipping from Germany to U.S.A.Quantity: 1 available
Add to basketBuch. Condition: Neu. Neuware - A central concern of number theory is the study of local-to-global principles, which describe the behavior of a global field K in terms of the behavior of various completions of K. This book looks at a specific example of a local-to-global principle: Weil's conjecture on the Tamagawa number of a semisimple algebraic group G over K. In the case where K is the function field of an algebraic curve X, this conjecture counts the number of G-bundles on X (global information) in terms of the reduction of G at the points of X (local information). The goal of this book is to give a conceptual proof of Weil's conjecture, based on the geometry of the moduli stack of G-bundles. Inspired by ideas from algebraic topology, it introduces a theory of factorization homology in the setting ¿-adic sheaves. Using this theory, Dennis Gaitsgory and Jacob Lurie articulate a different local-to-global principle: a product formula that expresses the cohomology of the moduli stack of G-bundles (a global object) as a tensor product of local factors.Using a version of the Grothendieck-Lefschetz trace formula, Gaitsgory and Lurie show that this product formula implies Weil's conjecture. The proof of the product formula will appear in a sequel volume.
-
Weil's Conjecture for Function Fields
Published by Princeton University Press, US, 2019
ISBN 10: 0691182132 ISBN 13: 9780691182131
Language: English
Hardback. Condition: New. A central concern of number theory is the study of local-to-global principles, which describe the behavior of a global field K in terms of the behavior of various completions of K. This book looks at a specific example of a local-to-global principle: Weil's conjecture on the Tamagawa number of a semisimple algebraic group G over K. In the case where K is the function field of an algebraic curve X, this conjecture counts the number of G-bundles on X (global information) in terms of the reduction of G at the points of X (local information). The goal of this book is to give a conceptual proof of Weil's conjecture, based on the geometry of the moduli stack of G-bundles. Inspired by ideas from algebraic topology, it introduces a theory of factorization homology in the setting ?-adic sheaves. Using this theory, Dennis Gaitsgory and Jacob Lurie articulate a different local-to-global principle: a product formula that expresses the cohomology of the moduli stack of G-bundles (a global object) as a tensor product of local factors.Using a version of the Grothendieck-Lefschetz trace formula, Gaitsgory and Lurie show that this product formula implies Weil's conjecture. The proof of the product formula will appear in a sequel volume.
