ScienceOpen:
research and publishing network
For Publishers
Discovery
Metadata
Peer review
Hosting
Publishing
For Researchers
Join
Publish
Review
Collect
My ScienceOpen
Sign in
Register
Dashboard
Blog
About
Search
Advanced search
My ScienceOpen
Sign in
Register
Dashboard
Search
Search
Advanced search
For Publishers
Discovery
Metadata
Peer review
Hosting
Publishing
For Researchers
Join
Publish
Review
Collect
Blog
About
0
views
0
references
Top references
cited by
20
Cite as...
0 reviews
Review
0
comments
Comment
0
recommends
+1
Recommend
0
collections
Add to
0
shares
Share
Twitter
Sina Weibo
Facebook
Email
2,593
similar
All similar
Record
: found
Abstract
: not found
Book
: not found
Tensors: Geometry and Applications
monograph
Author(s):
J. Landsberg
Publication date
(Print):
December 14 2011
Publisher:
American Mathematical Society
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
Electrospinning for biomedical applications
Author and book information
Book
ISBN (Print):
9780821869079
ISBN (Electronic):
9780821884836
Publication date (Print):
December 14 2011
DOI:
10.1090/gsm/128
SO-VID:
69639a12-9f3d-41f3-b2b0-8c57d2dd01b0
History
Data availability:
Comments
Comment on this book
Sign in to comment
Book chapters
pp. 3
Introduction
pp. 27
Multilinear algebra
pp. 67
Elementary results on rank and border rank
pp. 97
Algebraic geometry for spaces of tensors
pp. 117
Secant varieties
pp. 137
Exploiting symmetry: Representation theory for spaces of tensors
pp. 173
Tests for border rank: Equations for secant varieties
pp. 207
Additional varieties useful for spaces of tensors
pp. 229
Rank
pp. 243
Normal forms for small tensors
pp. 275
The complexity of matrix multiplication
pp. 289
Tensor decomposition
pp. 311
𝐏 v. 𝐍𝐏
pp. 357
Varieties of tensors in phylogenetics and quantum mechanics
pp. 373
Overview of the proof of the Alexander-Hirschowitz theorem
pp. 381
Representation theory
pp. 395
Weyman’s method
pp. 409
Hints and answers to selected exercises
Similar content
2,593
Effective slip-length tensor for a flow over weakly slipping stripes
Authors:
E. Asmolov
,
J Zhou
,
F. SCHMID
…
Solving Fredholm integrals of the first kind with tensor product structure in 2 and 2.5 dimensions
Authors:
M.D. Hurlimann
,
L Venkataramanan
,
Yi-Qiao Song
Diffusion Tensor Imaging Evaluates Effects of Acupoint Injection at Zusanli (ST36) for Type 2 Diabetic Peripheral Neuropathy
Authors:
Yangkui Zhai
,
Wenjuan Yu
,
Wen Shen
…
See all similar
Cited by
20
On maximum, typical and generic ranks
Authors:
Zach Teitler
,
Grigoriy Blekherman
A Partial Derandomization of PhaseLift Using Spherical Designs
Authors:
D. Gross
,
F. Krahmer
,
R. Kueng
Likelihood Geometry
Authors:
June Huh
,
Bernd Sturmfels
See all cited by