Category:Linear Algebra Theorems
From Maths
Revision as of 15:09, 26 February 2016 by
Alec
(
Talk
|
contribs
)
(
diff
)
← Older revision
| Latest revision (diff) | Newer revision → (diff)
Jump to:
navigation
,
search
Pages in category "Linear Algebra Theorems"
The following 19 pages are in this category, out of 19 total.
A
A linear map is injective if and only if its kernel is trivial
A linear map is injective if and only if the image of every non-zero vector is a non-zero vector
A linear map is injective if and only if the kernel contains only the zero vector
A proper vector subspace of a topological vector space has no interior
B
Basis for the tensor product
C
Characteristic property of the tensor product
Characteristic property of the tensor product/Statement
E
Equivalent conditions for a linear map between two normed spaces to be continuous everywhere
Equivalent conditions for a linear map between two normed spaces to be continuous everywhere/1 implies 2
Equivalent conditions for a linear map between two normed spaces to be continuous everywhere/2 implies 3
Equivalent conditions for a linear map between two normed spaces to be continuous everywhere/3 implies 4
Equivalent conditions for a linear map between two normed spaces to be continuous everywhere/4 implies 1
Euclidean norm
F
For a vector subspace of a topological vector space if there exists a non-empty open set contained in the subspace then the spaces are equal
P
Pullback norm
R
R^n is a topological vector space
T
The closure of a linear subspace of a normed space is a linear subspace
The dual space to the dual space of a vector space is canonically isomorphic to the vector space
The vector space of all linear maps between two spaces
Categories
:
Theorems
Linear Algebra
Linear Algebra Theorems, lemmas and corollaries
Navigation menu
Views
Category
Discussion
View source
History
Personal tools
Log in
Navigation
Main page
Recent changes
Random page
Help
Search
Tools
What links here
Related changes
Special pages
Permanent link
Page information