Browse
Publications
Preprints
About
About UCL Open: Env.
Aims and Scope
Editorial Board
Indexing
APCs
How to cite
Publishing policies
Editorial policy
Peer review policy
Equality, Diversity & Inclusion
About UCL Press
Contact us
For authors
Information for authors
How it works
Benefits of publishing with us
Submit
How to submit
Preparing your manuscript
Article types
Open Data
ORCID
APCs
Contributor agreement
For reviewers
Information for reviewers
Review process
How to peer review
Peer review policy
My ScienceOpen
Sign in
Register
Dashboard
Search
Browse
Publications
Preprints
About
About UCL Open: Env.
Aims and Scope
Editorial Board
Indexing
APCs
How to cite
Publishing policies
Editorial policy
Peer review policy
Equality, Diversity & Inclusion
About UCL Press
Contact us
For authors
Information for authors
How it works
Benefits of publishing with us
Submit
How to submit
Preparing your manuscript
Article types
Open Data
ORCID
APCs
Contributor agreement
For reviewers
Information for reviewers
Review process
How to peer review
Peer review policy
My ScienceOpen
Sign in
Register
Dashboard
Search
4
views
0
references
Top references
cited by
0
Cite as...
0 reviews
Review
0
comments
Comment
0
recommends
+1
Recommend
0
collections
Add to
0
shares
Share
Twitter
Sina Weibo
Facebook
Email
392
similar
All similar
Record
: found
Abstract
: not found
Book Chapter
: not found
Geometric Methods and Applications
The Cartan–Dieudonné Theorem
other
Author(s):
Jean Gallier
Publication date
(Online):
May 24 2011
Publisher:
Springer New York
Read this book at
Publisher
Buy book
Review
Review book
Invite someone to review
Bookmark
Cite as...
There is no author summary for this book yet. Authors can add summaries to their books on ScienceOpen to make them more accessible to a non-specialist audience.
Related collections
ScienceOpen Research
Author and book information
Book Chapter
Publication date (Print):
2011
Publication date (Online):
May 24 2011
Pages
: 231-280
DOI:
10.1007/978-1-4419-9961-0_8
SO-VID:
87d9363b-e336-4627-a63f-8765bf50b95a
History
Data availability:
Comments
Comment on this book
Sign in to comment
Book chapters
pp. 1
Introduction
pp. 7
Basics of Affine Geometry
pp. 65
Basic Properties of Convex Sets
pp. 85
Embedding an Affine Space in a Vector Space
pp. 103
Basics of Projective Geometry
pp. 177
Basics of Euclidean Geometry
pp. 213
Separating and Supporting Hyperplanes
pp. 231
The Cartan–Dieudonné Theorem
pp. 281
The Quaternions and the Spaces S 3, SU(2), SO(3), and ℝ ℙ3
pp. 301
Dirichlet–Voronoi Diagrams and Delaunay Triangulations
pp. 321
Basics of Hermitian Geometry
pp. 343
Spectral Theorems in Euclidean and Hermitian Spaces
pp. 367
Singular Value Decomposition (SVD) and Polar Form
pp. 387
Applications of SVD and Pseudo-inverses
pp. 411
Quadratic Optimization Problems
pp. 431
Schur Complements and Applications
pp. 439
Quadratic Optimization and Contour Grouping
pp. 459
Basics of Manifolds and Classical Lie Groups: The Exponential Map, Lie Groups, and Lie Algebras
pp. 529
Basics of the Differential Geometry of Curves
pp. 585
Basics of the Differential Geometry of Surfaces
pp. 655
Appendix
Similar content
392
Cristaux de dieudonné
Authors:
Pierre Berthelot
,
Lawrence Breen
,
William Messing
French comic Dieudonné drops show after ban. 13 January 2014
Authors:
Crystalline Dieudonné module theory via formal and rigid geometry
Authors:
A. Jong
See all similar