Examples of 'vector space' in a sentence
Meaning of "vector space"
a mathematical structure that consists of a set of vectors, which can be added together and multiplied by scalars
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- A set of elements called vectors, together with some field and operations called addition (mapping two vectors to a vector) and scalar multiplication (mapping a vector and an element in the field to a vector), satisfying a list of constraints.
How to use "vector space" in a sentence
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vector space
A symplectic vector space is itself a symplectic manifold.
This is a locally convex topological vector space.
A vector space is an external ring over a field.
Determine whether a vector space subset is a subspace.
W is called a linear code because it is a vector space.
Underlying vector space is the direct sum.
The annihilator of a subset is itself a vector space.
To n forms a vector space over the reals.
Let be a finite dimensional complex vector space.
Every vector space has a basis.
Let us define the bases of a vector space.
This is analogous to a vector space without a specified basis.
Let y be a basis for this vector space.
If the object is a vector space we have a linear representation.
Euclidean vectors are an example of a vector space.
See also
Such a vector space is called a symplectic vector space.
Any vector subspace in a vector space is a symmetric set.
Is a vector space over the field of real numbers.
The set of subspaces of a vector space ordered by inclusion.
A vector space always contains the zero vector.
Analogy with vector space dimensions.
This is the definition of a vector space.
It sure would make vector space calculations a breeze.
The norm is a continuous function on its vector space.
The dimension of this vector space is the number of pixels.
It is distinguished from the vector space.
Any topological vector space over a connected field is connected.
Displacement vectors belong to the vector space of translations.
A vector space with a distinguished norm is called a normed space.
This is a coordinate realization of an inner product on a vector space.
The idempotent endomorphisms of a vector space are its projections.
A vector space together with a norm is called a normed space.
This set is not a vector space.
All bases of a vector space have the same cardinality.
The affine maps in a vector space.
In a semi normed vector space the unit ball is absorbing.
Show directly this is a vector space.
The vector space is isomorphic to.
An interval in a partially ordered vector space is a convex set.
Vector space of finite dimensions.
Locally convex topological vector space.
A vector space with an inner product is an inner product space.
Consider the real vector space.
A vector space on which a norm is defined is called a normed vector space.
These matrices form a vector space.
The dimension of the vector space equals the number of elements in.
A vector is an element of some vector space.
Generalized vector space model.
An equation in which the variables belong to a vector space.
The topology of a seminormed vector space has many nice properties.
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