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  • Broschiertes Buch

A polarised variety is a modern generalization of the notion of a variety in classical algebraic geometry. It consists of a pair: the algebraic variety itself, together with an ample line bundle on it. Using techniques from abstract algebraic geometry that have been developed over recent decades, Professor Fujita develops classification theories of such pairs using invariants that are polarised higher-dimensional versions of the genus of algebraic curves. The heart of the book is the theory of D-genus and sectional genus developed by the author, but numerous related topics are discussed or…mehr

Produktbeschreibung
A polarised variety is a modern generalization of the notion of a variety in classical algebraic geometry. It consists of a pair: the algebraic variety itself, together with an ample line bundle on it. Using techniques from abstract algebraic geometry that have been developed over recent decades, Professor Fujita develops classification theories of such pairs using invariants that are polarised higher-dimensional versions of the genus of algebraic curves. The heart of the book is the theory of D-genus and sectional genus developed by the author, but numerous related topics are discussed or surveyed. Proofs are given in full in the central part of the development, but background and technical results are sometimes just sketched when the details are not essential for understanding the key ideas. Readers are assumed to have some background in algebraic geometry, including sheaf cohomology, and for them this work will provide an illustration of the power of modern abstract techniques applied to concrete geometric problems. Thus the book helps the reader not only to understand about classical objects but also modern methods, and so it will be useful not only for experts but also non-specialists and graduate students.

Table of contents:
Introduction; 1. Delta-genus and the hyperplane section method; 2. Sectional genus and adjoint bundles; 3. Related topics; 4. Varieties of small degrees; 5. Varieties of small codimension; 6. Varieties of small secant varieties; 7. Varieties with many lines; 8. Hyperelliptic polarised varieties; 9. Castelnuovo bounds and Castelnuovo varieties; 10. Ample vector bundles with small invariants; Appendix 1: Background information; Appendix 2: Computer constructed classification of polarised varieties.

A polarised variety is a modern generalisation of the notion of a variety in classical algebraic geometry. It comprises a pair: the algebraic variety itself, together with an ample line bundle on it. The author develops classification theories of such pairs using invariants which are polarised higher-dimensional versions of the genus of algebraic curves. The heart of the book is the author's development of the theory of G-genus and sectional genus.
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