Minimal surfaces in Euclidean spaces

Differential Geometry by Rui Loja Fernandes

This note covers the following topics: Manifolds as subsets of Euclidean space, Abstract Manifolds, Tangent Space and the Differential, Embeddings and Whitney’s Theorem, The de Rham Theorem, Lie Theory, Differential Forms, Fiber Bundles.

Author(s): Rui Loja Fernandes

NA Pages

Differential Geometry in Toposes

This note explains the following topics: From Kock–Lawvere axiom to microlinear spaces, Vector bundles,Connections, Affine space, Differential forms, Axiomatic structure of the real line, Coordinates and formal manifolds, Riemannian structure, Well-adapted topos models.

Author(s): Ryszard Pawe Kostecki

93 Pages

Discrete Differential Geometry

This note covers the following topics: Discrete Curves, Curves and curvature, Flows on curves, Elastica, Darboux transforms, Discrete Surfaces, Abstract discrete surfaces, Polyhedral surfaces and piecewise flat surfaces, Discrete cotan Laplace operator, Delaunay tessellations, Line congruences over simplicial surfaces, Polyhedral surfaces with parallel Gauss map, Willmore energy.

Author(s): Alexander I. Bobenko

144 Pages

Elementary Differential Geometry Curves and Surfaces

The purpose of this course note is the study of curves and surfaces , and those are in general, curved. The book mainly focus on geometric aspects of methods borrowed from linear algebra; proofs will only be included for those properties that are important for the future development.

Author(s): Asst. Prof. Martin Raussen

160 Pages

Differential Geometry Of Three Dimensions

This book describes the fundamentals of metric differential geometry of curves and surfaces.

Author(s): C. E Weatherburn

280 Pages

Lectures on Differential Geometry (PDF 221P)

This note contains on the following subtopics of Differential Geometry, Manifolds, Connections and curvature, Calculus on manifolds and Special topics.

Author(s): Wulf Rossmann

221 Pages

Notes on Differential Geometry and Lie Groups

This note covers the following topics: Matrix Exponential; Some Matrix Lie Groups, Manifolds and Lie Groups, The Lorentz Groups, Vector Fields, Integral Curves, Flows, Partitions of Unity, Orientability, Covering Maps, The Log-Euclidean Framework, Spherical Harmonics, Statistics on Riemannian Manifolds, Distributions and the Frobenius Theorem, The Laplace-Beltrami Operator and Harmonic Forms, Bundles, Metrics on Bundles, Homogeneous Spaces, Cli ord Algebras, Cli ord Groups, Pin and Spin and Tensor Algebras.

Author(s): Jean Gallier

744 Pages

Notes on Differential Geometry

These notes are an attempt to summarize some of the key mathematical aspects of differential geometry,as they apply in particular to the geometry of surfaces in R3. Covered topics are: Some fundamentals of the theory of surfaces, Some important parameterizations of surfaces, Variation of a surface, Vesicles, Geodesics, parallel transport and covariant differentiation.

Author(s): Markus Deserno

64 Pages

Notes on Differential Geometry, Lars Andersson 1

This note covers the following topics: Linear Algebra, Differentiability, integration, Cotangent Space, Tangent and Cotangent bundles, Vector fields and 1 forms, Multilinear Algebra, Tensor fields, Flows and vectorfields, Metrics.

Author(s): Lars Andersson

25 Pages

Natural Operations in Differential Geometry

This book is a monographical work on natural bundles and natural operators in differential geometry and this book tries to be a rather comprehensive textbook on all basic structures from the theory of jets which appear in different branches of differential geometry.

Author(s): Ivan Kolar, Jan Slovak and Peter W. Michor

NA Pages

Plane Geometry

This book explains about following theorems in Plane Geometry: Brianchon's Theorem, Carnot's Theorem, Centroid Exists Theorem, Ceva's Theorem, Clifford's Theorem, Desargues's Theorem, Euler Line Exists Theorem, Feuerbach's Theorem, The Finsler-Hadwiger Theorem, Fregier's Theorem, Fuhrmann's Theorem, Griffiths's Theorem, Incenter Exists Theorem, Lemoine's Theorem, Ptolemy's Theorem.

Author(s): Shalosh B. Ekhad

NA Pages

Differential Geometry Lecture Notes

This book covers the following topics: Smooth Manifolds, Plain curves, Submanifolds, Differentiable maps, immersions, submersions and embeddings, Basic results from Differential Topology, Tangent spaces and tensor calculus, Riemannian geometry.

Author(s): Dmitri Zaitsev

49 Pages

Differential Geometry A First Course in Curves and Surfaces

This note covers the following topics: Curves, Surfaces: Local Theory, Holonomy and the Gauss-Bonnet Theorem, Hyperbolic Geometry, Surface Theory with Differential Forms, Calculus of Variations and Surfaces of Constant Mean Curvature.

Author(s): Theodore Shifrin

128 Pages

Complex Analytic and Differential Geometry

Currently this section contains no detailed description for the page, will update this page soon.

Author(s): NA

NA Pages

Topics in Differential Geometry

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Author(s): NA

NA Pages

Functional Differential Geometry

Currently this section contains no detailed description for the page, will update this page soon.

Author(s): NA

NA Pages