Ruled varieties : an introduction to algebraic differential geometry
著者
書誌事項
Ruled varieties : an introduction to algebraic differential geometry
(Advanced lectures in mathematics)
Friedr. Vieweg & Sohn, 2001
大学図書館所蔵 全24件
  青森
  岩手
  宮城
  秋田
  山形
  福島
  茨城
  栃木
  群馬
  埼玉
  千葉
  東京
  神奈川
  新潟
  富山
  石川
  福井
  山梨
  長野
  岐阜
  静岡
  愛知
  三重
  滋賀
  京都
  大阪
  兵庫
  奈良
  和歌山
  鳥取
  島根
  岡山
  広島
  山口
  徳島
  香川
  愛媛
  高知
  福岡
  佐賀
  長崎
  熊本
  大分
  宮崎
  鹿児島
  沖縄
  韓国
  中国
  タイ
  イギリス
  ドイツ
  スイス
  フランス
  ベルギー
  オランダ
  スウェーデン
  ノルウェー
  アメリカ
注記
Includes bibilography and index
内容説明・目次
内容説明
Ruled varieties are unions of a family of linear spaces. They are objects of algebraic geometry as well as differential geometry, especially if the ruling is developable. This book is an introduction to both aspects, the algebraic and differential one. Starting from very elementary facts, the necessary techniques are developed, especially concerning Grassmannians and fundamental forms in a version suitable for complex projective algebraic geometry. Finally, this leads to recent results on the classification of developable ruled varieties and facts about tangent and secant varieties. Compared to many other topics of algebraic geometry, this is an area easily accessible to a graduate course.
目次
0 Review from Classical Differential and Projective Geometry.- 0.1 Developable Rulings.- 0.2 Vanishing Gauss Curvature.- 0.3 Hessian Matrices.- 0.4 Classification of Developable Surfaces in ?3.- 0.5 Developable Surfaces in ?3(?).- 1 Grassmannians.- 1.1 Preliminaries.- 1.1.1 Algebraic Varieties.- 1.1.2 Rational Maps.- 1.1.3 Holomorphic Linear Combinations.- 1.1.4 Limit Direction of a Holomorphic Path.- 1.1.5 Radial Paths.- 1.2 Plucker Coordinates.- 1.2.1 Local Coordinates.- 1.2.2 The Plucker Embedding.- 1.2.3 Lines in ?3.- 1.2.4 The Plucker Image.- 1.2.5 Plucker Relations.- 1.2.6 Systems of Vector Valued Functions.- 1.3 Incidences and Duality.- 1.3.1 Equations and Generators in Terms of Plucker Coordinates.- 1.3.2 Flag Varieties.- 1.3.3 Duality of Grassmannians.- 1.3.4 Dual Projective Spaces.- 1.4 Tangents to Grassmannians.- 1.4.1 Tangents to Projective Space.- 1.4.2 The Tangent Space of the Grassmannian.- 1.5 Curves in Grassmannians.- 1.5.1 The Drill.- 1.5.2 Derived Curves.- 1.5.3 Sums and Intersections.- 1.5.4 Associated Curves and Curves with Prescribed Drill.- 1.5.5 Normal Form.- 2 Ruled Varieties.- 2.1 Incidence Varieties and Duality.- 2.1.1 Unions of Linear Varieties.- 2.1.2 Fano Varieties.- 2.1.3 Joins.- 2.1.4 Conormal Bundle and Dual Variety.- 2.1.5 Duality Theorem.- 2.1.6 The Contact Locus.- 2.1.7 The Dual Curve.- 2.1.8 Rational Curves.- 2.2 Developable Varieties.- 2.2.1 Rulings.- 2.2.2 Adapted Parameterizations.- 2.2.3 Germs of Rulings.- 2.2.4 Developable Rulings and Focal Points.- 2.2.5 Developability of Joins.- 2.2.6 Dual Varieties of Cones and Degenerate Varieties.- 2.2.7 Tangent and Osculating Scrolls.- 2.2.8 Classification of Developable One Parameter Rulings.- 2.2.9 Example of a "Twisted Plane".- 2.2.10 Characterization of Drill One Curves.- 2.3 The Gauss Map.- 2.3.1 Definition of the Gauss Map.- 2.3.2 Linearity of the Fibers.- 2.3.3 Gauss Map and Developability.- 2.3.4 Gauss Image and Dual Variety.- 2.3.5 Existence of Varieties with Given Gauss Rank.- 2.4 The Second Fundamental Form.- 2.4.1 Definition of the Second Fundamental Form.- 2.4.2 The Degeneracy Space.- 2.4.3 The Degeneracy Map.- 2.4.4 The Singular and Base Locus.- 2.4.5 The Codimension of a Uniruled Variety.- 2.4.6 Fibers of the Gauss Map.- 2.4.7 Characterization of Gauss Images.- 2.4.8 Singularities of the Gauss Map.- 2.5 Gauss Defect and Dual Defect.- 2.5.1 Dual Defect of Segre Varieties.- 2.5.2 Gauss Defect and Singular Locus.- 2.5.3 Dual Defect and Singular Locus.- 2.5.4 Computation of the Dual Defect.- 2.5.5 The Surface Case.- 2.5.6 Classification of Developable Hypersurfaces.- 2.5.7 Dual Defect of Uniruled Varieties.- 2.5.8 Varieties with Very Small Dual Varieties.- 3 Tangent and Secant Varieties.- 3.1 Zak's Theorems.- 3.1.1 Tangent Spaces, Tangent Cones, and Tangent Stars.- 3.1.2 Zak's Theorem on Tangent and Secant Varieties.- 3.1.3 Theorem on Tangencies.- 3.2 Third and Higher Fundamental Forms.- 3.2.1 Definition.- 3.2.2 Vanishing of Fundamental Forms.- 3.3 Tangent Varieties.- 3.3.1 The Dimension of the Tangent Variety.- 3.3.2 Developability of the Tangent Variety.- 3.3.3 Singularities of the Tangent Variety.- 3.4 The Dimension of the Secant Variety.- List of Symbols.
「Nielsen BookData」 より