eBook ISBN: | 978-0-8218-7834-7 |
Product Code: | CONM/244.E |
List Price: | $125.00 |
MAA Member Price: | $112.50 |
AMS Member Price: | $100.00 |
eBook ISBN: | 978-0-8218-7834-7 |
Product Code: | CONM/244.E |
List Price: | $125.00 |
MAA Member Price: | $112.50 |
AMS Member Price: | $100.00 |
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Book DetailsContemporary MathematicsVolume: 244; 2000; 126 ppMSC: Primary 14; Secondary 13; 32
This volume contains three papers on the foundations of Grothendieck duality on Noetherian formal schemes and on not-necessarily-Noetherian ordinary schemes.
The first paper presents a self-contained treatment for formal schemes which synthesizes several duality-related topics, such as local duality, formal duality, residue theorems, dualizing complexes, etc. Included is an exposition of properties of torsion sheaves and of limits of coherent sheaves. A second paper extends Greenlees-May duality to complexes on formal schemes. This theorem has important applications to Grothendieck duality. The third paper outlines methods for eliminating the Noetherian hypotheses. A basic role is played by Kiehl's theorem affirming conservation of pseudo-coherence of complexes under proper pseudo-coherent maps.
This work gives a detailed introduction to Grothendieck Duality, unifying diverse topics. For example, local and global duality appear as different cases of the same theorem. Even for ordinary schemes, the approach—inspired by that of Deligne and Verdier—is considerably more general than the one in Hartshorne's classic ”Residues and Duality.“ Moreover, close attention is paid to the category-theoretic aspects, especially to justification of all needed commutativities in diagrams of derived functors.
ReadershipGraduate students and research mathematicians interested in algebraic geometry.
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Table of Contents
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Chapters
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Part 1. Duality and Flat Base Change on Formal Schemes
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Part 2. Greenlees-May Duality on Formal Schemes
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Part 3. Non-noetherian Grothendieck Duality
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Index
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Reviews
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This volume consists of three essentially independent articles which are, however, connected by the common theme of duality theory. They provide very interesting treatments of various fundamental aspects of abstract duality theory in the style of Grothendieck for formal and ordinary schemes.
Mathematical Reviews
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This volume contains three papers on the foundations of Grothendieck duality on Noetherian formal schemes and on not-necessarily-Noetherian ordinary schemes.
The first paper presents a self-contained treatment for formal schemes which synthesizes several duality-related topics, such as local duality, formal duality, residue theorems, dualizing complexes, etc. Included is an exposition of properties of torsion sheaves and of limits of coherent sheaves. A second paper extends Greenlees-May duality to complexes on formal schemes. This theorem has important applications to Grothendieck duality. The third paper outlines methods for eliminating the Noetherian hypotheses. A basic role is played by Kiehl's theorem affirming conservation of pseudo-coherence of complexes under proper pseudo-coherent maps.
This work gives a detailed introduction to Grothendieck Duality, unifying diverse topics. For example, local and global duality appear as different cases of the same theorem. Even for ordinary schemes, the approach—inspired by that of Deligne and Verdier—is considerably more general than the one in Hartshorne's classic ”Residues and Duality.“ Moreover, close attention is paid to the category-theoretic aspects, especially to justification of all needed commutativities in diagrams of derived functors.
Graduate students and research mathematicians interested in algebraic geometry.
-
Chapters
-
Part 1. Duality and Flat Base Change on Formal Schemes
-
Part 2. Greenlees-May Duality on Formal Schemes
-
Part 3. Non-noetherian Grothendieck Duality
-
Index
-
This volume consists of three essentially independent articles which are, however, connected by the common theme of duality theory. They provide very interesting treatments of various fundamental aspects of abstract duality theory in the style of Grothendieck for formal and ordinary schemes.
Mathematical Reviews