31 Divisors
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Section 31.1: Introduction
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Section 31.2: Associated points
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Section 31.3: Morphisms and associated points
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Section 31.4: Embedded points
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Section 31.5: Weakly associated points
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Section 31.6: Morphisms and weakly associated points
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Section 31.7: Relative assassin
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Section 31.8: Relative weak assassin
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Section 31.9: Fitting ideals
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Section 31.10: The singular locus of a morphism
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Section 31.11: Torsion free modules
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Section 31.12: Reflexive modules
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Section 31.13: Effective Cartier divisors
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Section 31.14: Effective Cartier divisors and invertible sheaves
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Section 31.15: Effective Cartier divisors on Noetherian schemes
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Section 31.16: Complements of affine opens
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Section 31.17: Norms
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Section 31.18: Relative effective Cartier divisors
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Section 31.19: The normal cone of an immersion
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Section 31.20: Regular ideal sheaves
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Section 31.21: Regular immersions
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Section 31.22: Relative regular immersions
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Section 31.23: Meromorphic functions and sections
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Section 31.24: Meromorphic functions and sections; Noetherian case
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Section 31.25: Meromorphic functions and sections; reduced case
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Section 31.26: Weil divisors
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Section 31.27: The Weil divisor class associated to an invertible module
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Section 31.28: More on invertible modules
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Section 31.29: Weil divisors on normal schemes
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Section 31.30: Relative Proj
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Section 31.31: Closed subschemes of relative proj
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Section 31.32: Blowing up
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Section 31.33: Strict transform
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Section 31.34: Admissible blowups
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Section 31.35: Blowing up and flatness
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Section 31.36: Modifications