Geometry and Topology of Submanifolds, II

The Table of Contents for the book is as follows:

• Preface

• Hypersurfaces of Constant Mean Curvature on Rⁿ⁺¹ Bounded by an Euclidean Sphere

• Real Hypersurfaces with Constant Principal Curvatures in Complex Space Forms

• The Simon Conjecture and Minimal Immersions with S¹-Symmetry

• La Géométrie des Tracés de Voies de Chemin de Fer à Grande Vitesse

• Isospectral Problems in Conformal Geometry

• Reflections and Involutions

• Curves of Finite Type

• Immersions of Finite Type

• Examples of Four- Dimensional Riemannian Manifolds Satisfying Some Pseudo-Symmetry Curvature Conditions

• Affine Differential Geometry of Hypersurfaces

• Fairly Symmetric Hyperbolic Manifolds

• Variétés Stratifiées C^∞: Intégration de Čech-de Rham, et Théorie de Chern-Weil

• Recent Work on the Geometry of Properly Embedded Minimal and Constant Mean Curvature Surfaces in R³

• On a New Curvature Tensor in Affine Differential Geometry

• Curvature Conditions on Hypersurfaces of Revolution

• Continuous SO(n)—Invariant Tensor Fields on ℝⁿ- {O}

• Minimal Surfaces of the 3-Dimensional Minkowski Space

• Residues of Chern and Maslov Classes

• The Local Structure of a 2-Codimensional Conformally Flat Submanifold in an Euclidean Space ℝⁿ⁺²