Examples of 'vector spaces' in a sentence
Meaning of "vector spaces"
vector spaces - areas in mathematics that contain vectors and follow specific rules and properties
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- plural of vector space
How to use "vector spaces" in a sentence
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vector spaces
Vector spaces over a field are flat modules.
An isomorphism of super vector spaces is a bijective homomorphism.
Vector spaces representing colour are a specific example.
An isomorphism between vector spaces is a linear bijection.
Here is a digression on infinite dimensional vector spaces.
Determine whether two vector spaces are isomorphic.
Vector spaces are considered to be the prototypical example of modularity.
The sum and intersection of vector spaces.
Each of these vector spaces can be assigned an orientation.
Isomorphism of equal dimension vector spaces.
Vector spaces are completely characterized by their dimension up to an isomorphism.
Determine whether subsets of vector spaces are subspaces.
Normed vector spaces and inner product spaces.
Modules over fields are vector spaces.
Vector spaces with additional structure.
See also
This page lists some examples of vector spaces.
Define vector spaces and subspaces.
A linear transformation between vector spaces.
Dual pairing vector spaces will now be described.
Pontryagin duality in the theory of topological vector spaces.
Topological vector spaces are vector spaces with a compatible topology.
Unit balls in normed vector spaces.
General vector spaces do not possess a multiplication between vectors.
Dimension theorem for vector spaces.
Vector spaces can consist of other mathematical objects too.
All norms are equivalent in finite dimensional vector spaces.
Think about vector spaces.
Here the focus is in particular on operations of groups on vector spaces.
Some vector spaces can be decomposed into direct sums of subspaces.
The situation is analogous to the theory of vector spaces.
Vector spaces endowed with an additional multiplicative structure are called algebras.
This is the homomorphism of vector spaces.
Ordered vector spaces are ordered groups under their addition operation.
Groups fields and vector spaces.
Many of the vector spaces that arise in mathematics are subspaces of some function space.
Tensor product of vector spaces.
Normed vector spaces are central to the study of linear algebra and functional analysis.
Scalars in normed vector spaces.
The relation of two vector spaces can be expressed by linear map or linear transformation.
Tensor products of vector spaces.
Dual pairing vector spaces can be constructed from asymmetric bilinear pairing groups as well.
We found a solution to a problem involving infinitely dimensional vector spaces.
There are many textbooks on vector spaces and linear algebra.
At this time he was a leading expert in the theory of topological vector spaces.
More details are given about vector spaces over finite fields.
Linear algebra is concerned with properties common to all vector spaces.
In such topological vector spaces one can consider series of vectors.
Linear operators on vector spaces.
The dual pairing vector spaces can also be constructed using asymmetric bilinear pairing groups.
An introductory study of vector spaces.
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