The Adjunction Theory of Complex Projective Varieties.

An overview of developments in the past 15 years of adjunction theory, the study of the interplay between the intrinsic geometry of a projective variety and the geometry connected with some embedding of the variety into a projective space. Topics include consequences of positivity, the Hilbert schem...

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Detalles Bibliográficos
Clasificación:Libro Electrónico
Autor principal: Sommese, Andrew J.
Otros Autores: Beltrametti, Mauro C.
Formato: Electrónico eBook
Idioma:Inglés
Publicado: Berlin : De Gruyter, 1995.
Colección:De Gruyter expositions in mathematics.
Temas:
Adjunction theory.
Embeddings (Mathematics)
Algebraic varieties.
Projective spaces.
Théorie de l'adjonction.
Plongements (Mathématiques)
Variétés algébriques.
Espaces projectifs.
Adjunction theory
Algebraic varieties
Projective spaces
Acceso en línea:Texto completo
Tabla de Contenidos:
  • Preface; List of tables; Chapter 1. General background results; 1.1 Some basic definitions; 1.2 Surface singularities; 1.3 On the singularities that arise in adjunction theory; 1.4 Curves; 1.5 Nefvalue results; 1.6 Universal sections and discriminant varieties; 1.7 Bertini theorems; 1.8 Some examples; Chapter 2. Consequences of positivity; 2.1 k-ampleness and k-bigness; 2.2 Vanishing theorems; 2.3 The Lefschetz hyperplane section theorem; 2.4 The Albanese mapping in the presence of rational singularities; 2.5 The Hodge index theorem and the Kodaira lemma; 2.6 Rossi's extension theorems
  • 2.7 Theorems of Andreotti-Grauert and GriffithsChapter 3. The basic varieties of adjunction theory; 3.1 Recognizing projective spaces and quadrics; 3.2 Pd-bundles; 3.3 Special varieties arising in adjunction theory; Chapter 4. The Hilbert scheme and extremal rays; 4.1 Flatness, the Hilbert scheme, and limited families; 4.2 Extremal rays and the cone theorem; 4.3 Varieties with nonnef canonical bundle; Chapter 5. Restrictions imposed by ample divisors; 5.1 On the behavior of k-big and ample divisors under maps; 5.2 Extending morphisms of ample divisors
  • 5.3 Ample divisors with trivial pluricanonical systems5.4 Varieties that can be ample divisors only on cones; 5.5 Pd-bundles as ample divisors; Chapter 6. Families of unbreakable rational curves; 6.1 Examples; 6.2 Families of unbreakable rational curves; 6.3 The nonbreaking lemma; 6.4 Morphisms of varieties covered by unbreakable rational curves; 6.5 The classification of projective manifolds covered by lines; 6.6 Some spannedness results; Chapter 7. General adjunction theory; 7.1 Spectral values; 7.2 Polarized pairs (M, L) with nefvalue> dim M
  • l and M singular
  • 7.3 The first reduction of a singular variety7.4 The polarization of the first reduction; 7.5 The second reduction in the smooth case; 7.6 Properties of the first and the second reduction; 7.7 The second reduction (X, D) with KX + (n
  • 3) D nef; 7.8 The three dimensional case; 7.9 Applications; Chapter 8. Background for classical adjunction theory; 8.1 Numerical implications of nonnegative Kodaira dimension; 8.2 The double point formula for surfaces; 8.3 Smooth double covers of irreducible quadric surfaces; 8.4 Surfaces with one dimensional projection from a line; 8.5 k-very ampleness

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