Book contents
- Frontmatter
- Contents
- Dedication
- Preface
- Notation and conventions
- 1 The local cohomology functors
- 2 Torsion modules and ideal transforms
- 3 The Mayer-Vietoris Sequence
- 4 Change of rings
- 5 Other approaches
- 6 Fundamental vanishing theorems
- 7 Artinian local cohomology modules
- 8 The Lichtenbaum-Hartshorne Theorem
- 9 The Annihilator and Finiteness Theorems
- 10 Matlis duality
- 11 Local duality
- 12 Foundations in the graded case
- 13 Graded versions of basic theorems
- 14 Links with projective varieties
- 15 Castelnuovo regularity
- 16 Bounds of diagonal type
- 17 Hilbert polynomials
- 18 Applications to reductions of ideals
- 19 Connectivity in algebraic varieties
- 20 Links with sheaf cohomology
- Bibliography
- Index
20 - Links with sheaf cohomology
Published online by Cambridge University Press: 04 May 2010
Book contents
- Frontmatter
- Contents
- Dedication
- Preface
- Notation and conventions
- 1 The local cohomology functors
- 2 Torsion modules and ideal transforms
- 3 The Mayer-Vietoris Sequence
- 4 Change of rings
- 5 Other approaches
- 6 Fundamental vanishing theorems
- 7 Artinian local cohomology modules
- 8 The Lichtenbaum-Hartshorne Theorem
- 9 The Annihilator and Finiteness Theorems
- 10 Matlis duality
- 11 Local duality
- 12 Foundations in the graded case
- 13 Graded versions of basic theorems
- 14 Links with projective varieties
- 15 Castelnuovo regularity
- 16 Bounds of diagonal type
- 17 Hilbert polynomials
- 18 Applications to reductions of ideals
- 19 Connectivity in algebraic varieties
- 20 Links with sheaf cohomology
- Bibliography
- Index
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- Local CohomologyAn Algebraic Introduction with Geometric Applications, pp. 374 - 406Publisher: Cambridge University PressPrint publication year: 1998