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Grothendieck Duality and Base Change

Grothendieck Duality and Base Change
Author: Brian Conrad
Publisher: Springer
Total Pages: 302
Release: 2003-07-01
Genre: Mathematics
ISBN: 354040015X
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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.

Foundations of Grothendieck Duality for Diagrams of Schemes

Foundations of Grothendieck Duality for Diagrams of Schemes
Author: Joseph Lipman
Publisher: Springer
Total Pages: 471
Release: 2009-03-07
Genre: Mathematics
ISBN: 3540854207
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Part One of this book covers the abstract foundations of Grothendieck duality theory for schemes in part with noetherian hypotheses and with some refinements for maps of finite tor-dimension. Part Two extends the theory to the context of diagrams of schemes.

Arithmetic Duality Theorems

Arithmetic Duality Theorems
Author: J. S. Milne
Publisher:
Total Pages: 440
Release: 1986
Genre: Mathematics
ISBN:
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Here, published for the first time, are the complete proofs of the fundamental arithmetic duality theorems that have come to play an increasingly important role in number theory and arithmetic geometry. The text covers these theorems in Galois cohomology, ,tale cohomology, and flat cohomology and addresses applications in the above areas. The writing is expository and the book will serve as an invaluable reference text as well as an excellent introduction to the subject.

Category Theory in Context

Category Theory in Context
Author: Emily Riehl
Publisher: Courier Dover Publications
Total Pages: 273
Release: 2017-03-09
Genre: Mathematics
ISBN: 0486820807
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Introduction to concepts of category theory — categories, functors, natural transformations, the Yoneda lemma, limits and colimits, adjunctions, monads — revisits a broad range of mathematical examples from the categorical perspective. 2016 edition.

Tame Topology and O-minimal Structures

Tame Topology and O-minimal Structures
Author: Lou Van den Dries
Publisher: Cambridge University Press
Total Pages: 196
Release: 1998-05-07
Genre: Mathematics
ISBN: 0521598389
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These notes give a self-contained treatment of the theory of o-minimal structures from a geometric and topological viewpoint, assuming only rudimentary algebra and analysis. This book should be of interest to model theorists, analytic geometers and topologists.

Fundamental Algebraic Geometry

Fundamental Algebraic Geometry
Author: Barbara Fantechi
Publisher: American Mathematical Soc.
Total Pages: 354
Release: 2005
Genre: Mathematics
ISBN: 0821842455
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Presents an outline of Alexander Grothendieck's theories. This book discusses four main themes - descent theory, Hilbert and Quot schemes, the formal existence theorem, and the Picard scheme. It is suitable for those working in algebraic geometry.

Foundations of Grothendieck Duality for Diagrams of Schemes

Foundations of Grothendieck Duality for Diagrams of Schemes
Author: Joseph Lipman
Publisher: Springer Science & Business Media
Total Pages: 471
Release: 2009-02-05
Genre: Mathematics
ISBN: 3540854193
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The first part written by Joseph Lipman, accessible to mid-level graduate students, is a full exposition of the abstract foundations of Grothendieck duality theory for schemes (twisted inverse image, tor-independent base change,...), in part without noetherian hypotheses, and with some refinements for maps of finite tor-dimension. The ground is prepared by a lengthy treatment of the rich formalism of relations among the derived functors, for unbounded complexes over ringed spaces, of the sheaf functors tensor, hom, direct and inverse image. Included are enhancements, for quasi-compact quasi-separated schemes, of classical results such as the projection and Künneth isomorphisms. In the second part, written independently by Mitsuyasu Hashimoto, the theory is extended to the context of diagrams of schemes. This includes, as a special case, an equivariant theory for schemes with group actions. In particular, after various basic operations on sheaves such as (derived) direct images and inverse images are set up, Grothendieck duality and flat base change for diagrams of schemes are proved. Also, dualizing complexes are studied in this context. As an application to group actions, we generalize Watanabe's theorem on the Gorenstein property of invariant subrings.