On the Geometry of Some Special Projective Varieties: 18 (Lecture Notes of the Unione Matematica Italiana)

On the Geometry of Some Special Projective Varieties: 18 (Lecture Notes of the Unione Matematica Italiana)

by Francesco Russo (Author)

Synopsis

Providing an introduction to both classical and modern techniques in projective algebraic geometry, this monograph treats the geometrical properties of varieties embedded in projective spaces, their secant and tangent lines, the behavior of tangent linear spaces, the algebro-geometric and topological obstructions to their embedding into smaller projective spaces, and the classification of extremal cases. It also provides a solution of Hartshorne's Conjecture on Complete Intersections for the class of quadratic manifolds and new short proofs of previously known results, using the modern tools of Mori Theory and of rationally connected manifolds.

The new approach to some of the problems considered can be resumed in the principle that, instead of studying a special embedded manifold uniruled by lines, one passes to analyze the original geometrical property on the manifold of lines passing through a general point and contained in the manifold. Once this embedded manifold, usually of lower codimension, is classified, one tries to reconstruct the original manifold, following a principle appearing also in other areas of geometry such as projective differential geometry or complex geometry.

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More Information

Format: Paperback
Pages: 260
Edition: 1st ed. 2016
Publisher: Springer
Published: 26 Feb 2016

ISBN 10: 3319267647
ISBN 13: 9783319267647

Media Reviews

The book under review (awarded the 2015 Book Prize of the Unione Matematica Italiana) gives a survey of some classical and recent results on the geometry of projective varieties and its applications. ... The book will be useful to anyone interested in classical algebraic geometry. (Fyodor L. Zak, Mathematical Reviews, May, 2017)

The book under review covers fundamental aspects of the theory of secant spaces to varieties, and contains a careful description of many of its recent applications to Algebraic Geometry. Under this respect, it provides a fundamental advanced introduction to recent results and developments of a topic which experienced a rapid evolution in the last years. (Luca Chiantini, zbMATH 1337.14001, 2016)