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A Study in Derived Algebraic Geometry: Volume I: Correspondences and Duality
 
Dennis Gaitsgory Harvard University, Cambridge, MA
Nick Rozenblyum University of Chicago, Chicago, IL
A Study in Derived Algebraic Geometry
Softcover ISBN:  978-1-4704-5284-1
Product Code:  SURV/221.1.S
List Price: $129.00
MAA Member Price: $116.10
AMS Member Price: $103.20
eBook ISBN:  978-1-4704-4085-5
Product Code:  SURV/221.1.E
List Price: $125.00
MAA Member Price: $112.50
AMS Member Price: $100.00
Softcover ISBN:  978-1-4704-5284-1
eBook: ISBN:  978-1-4704-4085-5
Product Code:  SURV/221.1.S.B
List Price: $254.00 $191.50
MAA Member Price: $228.60 $172.35
AMS Member Price: $203.20 $153.20
A Study in Derived Algebraic Geometry
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A Study in Derived Algebraic Geometry: Volume I: Correspondences and Duality
Dennis Gaitsgory Harvard University, Cambridge, MA
Nick Rozenblyum University of Chicago, Chicago, IL
Softcover ISBN:  978-1-4704-5284-1
Product Code:  SURV/221.1.S
List Price: $129.00
MAA Member Price: $116.10
AMS Member Price: $103.20
eBook ISBN:  978-1-4704-4085-5
Product Code:  SURV/221.1.E
List Price: $125.00
MAA Member Price: $112.50
AMS Member Price: $100.00
Softcover ISBN:  978-1-4704-5284-1
eBook ISBN:  978-1-4704-4085-5
Product Code:  SURV/221.1.S.B
List Price: $254.00 $191.50
MAA Member Price: $228.60 $172.35
AMS Member Price: $203.20 $153.20
  • Book Details
     
     
    Mathematical Surveys and Monographs
    Volume: 2212017; 533 pp
    MSC: Primary 14; 18

    Derived algebraic geometry is a far-reaching generalization of algebraic geometry. It has found numerous applications in various parts of mathematics, most prominently in representation theory. This volume develops the theory of ind-coherent sheaves in the context of derived algebraic geometry. Ind-coherent sheaves are a “renormalization” of quasi-coherent sheaves and provide a natural setting for Grothendieck-Serre duality as well as geometric incarnations of numerous categories of interest in representation theory.

    This volume consists of three parts and an appendix. The first part is a survey of homotopical algebra in the setting of \(\infty\)-categories and the basics of derived algebraic geometry. The second part builds the theory of ind-coherent sheaves as a functor out of the category of correspondences and studies the relationship between ind-coherent and quasi-coherent sheaves. The third part sets up the general machinery of the \(\mathrm{(}\infty, 2\mathrm{)}\)-category of correspondences needed for the second part. The category of correspondences, via the theory developed in the third part, provides a general framework for Grothendieck's six-functor formalism. The appendix provides the necessary background on \(\mathrm{(}\infty, 2\mathrm{)}\)-categories needed for the third part.

    Readership

    Graduate students and researchers interested in new trends in algebraic geometry and representation theory.

    This item is also available as part of a set:
  • Table of Contents
     
     
    • Preliminaries
    • Introduction
    • Some higher algebra
    • Basics of derived algebraic geometry
    • Quasi-coherent sheaves on prestacks
    • Ind-coherent sheaves
    • Introduction
    • Ind-coherent sheaves on schemes
    • Ind-coherent sheaves as a functor out of the category of correspondences
    • Interaction of Qcoh and IndCoh
    • Categories of correspondences
    • Introduction
    • The $(\infty ,2)$-category of correspondences
    • Extension theorems for the category of correspondences
    • The (symmetric) monoidal structure on the category of correspondences
    • $(\infty ,2)$-categories
    • Introduction
    • Basics of 2-categories
    • Straightening and Yoneda for $(\infty ,2)$-categories
    • Adjunctions in $(\infty ,2)$-categories
  • Additional Material
     
     
  • Requests
     
     
    Review Copy – for publishers of book reviews
    Permission – for use of book, eBook, or Journal content
    Accessibility – to request an alternate format of an AMS title
Volume: 2212017; 533 pp
MSC: Primary 14; 18

Derived algebraic geometry is a far-reaching generalization of algebraic geometry. It has found numerous applications in various parts of mathematics, most prominently in representation theory. This volume develops the theory of ind-coherent sheaves in the context of derived algebraic geometry. Ind-coherent sheaves are a “renormalization” of quasi-coherent sheaves and provide a natural setting for Grothendieck-Serre duality as well as geometric incarnations of numerous categories of interest in representation theory.

This volume consists of three parts and an appendix. The first part is a survey of homotopical algebra in the setting of \(\infty\)-categories and the basics of derived algebraic geometry. The second part builds the theory of ind-coherent sheaves as a functor out of the category of correspondences and studies the relationship between ind-coherent and quasi-coherent sheaves. The third part sets up the general machinery of the \(\mathrm{(}\infty, 2\mathrm{)}\)-category of correspondences needed for the second part. The category of correspondences, via the theory developed in the third part, provides a general framework for Grothendieck's six-functor formalism. The appendix provides the necessary background on \(\mathrm{(}\infty, 2\mathrm{)}\)-categories needed for the third part.

Readership

Graduate students and researchers interested in new trends in algebraic geometry and representation theory.

This item is also available as part of a set:
  • Preliminaries
  • Introduction
  • Some higher algebra
  • Basics of derived algebraic geometry
  • Quasi-coherent sheaves on prestacks
  • Ind-coherent sheaves
  • Introduction
  • Ind-coherent sheaves on schemes
  • Ind-coherent sheaves as a functor out of the category of correspondences
  • Interaction of Qcoh and IndCoh
  • Categories of correspondences
  • Introduction
  • The $(\infty ,2)$-category of correspondences
  • Extension theorems for the category of correspondences
  • The (symmetric) monoidal structure on the category of correspondences
  • $(\infty ,2)$-categories
  • Introduction
  • Basics of 2-categories
  • Straightening and Yoneda for $(\infty ,2)$-categories
  • Adjunctions in $(\infty ,2)$-categories
Review Copy – for publishers of book reviews
Permission – for use of book, eBook, or Journal content
Accessibility – to request an alternate format of an AMS title
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