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The volume contains a selection of papers presented at the 7th Symposium on differential geometry and differential equations (DD7) held at the Nankai Institute of Mathematics, Tianjin, China, in 1986. Most of the contributions are original research papers on topics including elliptic equations, hyperbolic equations, evolution equations, non-linear equations from differential geometry and mechanics, micro-local analysis.
Integral geometry, known as geometric probability in the past, originated from Buffon's needle experiment. Remarkable advances have been made in several areas that involve the theory of convex bodies. This volume brings together contributions by leading international researchers in integral geometry, convex geometry, complex geometry, probability, statistics, and other convexity related branches. The articles cover both recent results and exciting directions for future research.
Containing four parts such as Analytic Geometry, Algebraic Geometry, Variations of Hodge Structures, and Differential Systems that are organized according to the subject matter, this title provides the reader with a panoramic view of important and exciting mathematics during the second half of the 20th century.
This volume is a compilation of papers presented at the conference on differential geometry, in particular, minimal surfaces, real hypersurfaces of a non-flat complex space form, submanifolds of symmetric spaces and curve theory. It also contains new results or brief surveys in these areas. This volume provides fundamental knowledge to readers (such as differential geometers) who are interested in the theory of real hypersurfaces in a non-flat complex space form.
Contents:Morse Theory of Minimal Two-Spheres and Curvature of Riemannian Manifolds (J D Moore)Isoparametric Systems (A West)The Gauss Map of Flat Tori in S3 (J L Weiner)On Totally Real Surfaces in Sasakian Space Forms (B Opozda)The Riemannian Geometry of Minimal Immersions of S2 into CPn (J Bolton & L M Woodward)Totally Real Submanifolds (F Urbano)Notes on Totally Umbilical Submanifolds (R Deszcz)Totally Complex Submanifolds of Quaternionic Projective Space (A Martínez)Symmetries of Compact Symmetric Spaces (B Y Chen)Nonnegatively Curved Hypersurfaces in Hyperbolic Space (S B Alexander & R J Currier)Semi-Parallel Immersions (J Deprez)Parallel Hypersurfaces (S A Robertson)Surfaces in Spheres and Submanifolds of the Nearly Kaehler 6–Sphere (F Dillen & L Vrancken)Semi-Symmetric Hypersurfaces (I van de Woestijne)Canonical Affine Connection on Complex Hypersurfaces of the Complex Affine Space (F Dillen & L Vrancken)and other papers Readership: Mathematicians.
This volume contains contributions by the main participants of the 4th International Colloquium on Differential Geometry and its Related Fields (ICDG2014). These articles cover recent developments and are devoted mainly to the study of some geometric structures on manifolds and graphs. Readers will find a broad overview of differential geometry and its relationship to other fields in mathematics and physics.
This volume of selected academic papers demonstrates the significance of the contribution to mathematics made by Manfredo P. do Carmo. Twice a Guggenheim Fellow and the winner of many prestigious national and international awards, the professor at the institute of Pure and Applied Mathematics in Rio de Janeiro is well known as the author of influential textbooks such as Differential Geometry of Curves and Surfaces. The area of differential geometry is the main focus of this selection, though it also contains do Carmo's own commentaries on his life as a scientist as well as assessment of the impact of his researches and a complete list of his publications. Aspects covered in the featured papers include relations between curvature and topology, convexity and rigidity, minimal surfaces, and conformal immersions, among others. Offering more than just a retrospective focus, the volume deals with subjects of current interest to researchers, including a paper co-authored with Frank Warner on the convexity of hypersurfaces in space forms. It also presents the basic stability results for minimal surfaces in the Euclidean space obtained by the author and his collaborators. Edited by do Carmo's first student, now a celebrated academic in her own right, this collection pays tribute to one of the most distinguished mathematicians.