Examples of 'projective spaces' in a sentence
Meaning of "projective spaces"
projective spaces: This phrase is used in mathematics and geometry to describe a type of space where geometric properties are studied. Projective spaces are characterized by certain mathematical transformations and properties that differentiate them from other types of spaces
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- plural of projective space
How to use "projective spaces" in a sentence
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projective spaces
The product of two projective spaces is projective.
This definition generalizes to complex projective spaces.
Real projective spaces are smooth manifolds.
Fano was an early writer in the area of finite projective spaces.
Affine and projective spaces.
Projective spaces of higher dimensions.
Fano went on to describe finite projective spaces of arbitrary dimension and prime orders.
Projective spaces provide some more interesting examples of principal bundles.
Researchers explored families of saturating sets in projective spaces using probabilistic methods.
The projective spaces in turn generalize to the Grassmannian spaces.
Fano varieties are quite rare due to their projective spaces constituting closed algebraic sets.
Projective spaces over the reals, complexes, or quaternions are compact manifolds.
It is generally assumed that projective spaces are of at least dimension 2.
Similar presentations exist for higher-dimensional projective spaces.
In particular, projective spaces satisfy a condition called properness which is analogous to compactness.
See also
Classification of actions of z 2 ^ k fixing projective spaces relative tp different rings.
In mathematics, a projective bundle is a fiber bundle whose fibers are projective spaces.
Translation planes are related to spreads in finite projective spaces by the André/Bruck-Bose construction.
Higher-dimensional analogues of fake projective surfaces are called fake projective spaces.
Weighted projective spaces can be constructed using a polynomial ring whose variables have non-standard degrees.
Abstract, This thesis is devoted to the dynamical study of rational maps in projective spaces.
Finite sets are both affine spaces and projective spaces over F1.
Real ( or complex ) finite-dimensional linear, affine and projective spaces are also smooth manifolds.
In Chapter 6, we work on product of projective spaces.
There is thus an inclusion-reversing bijection between the projective spaces PG ( n, K ) and PGn, Ko.
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But let there be spaces in your togetherness
Examples of using Projective
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A smooth curve is projective if and only if it is complete
Projective curves are frequently studied for themselves
Euclid geometry from a projective point of view
