Journal of Formalized Mathematics
Volume 2, 1990
University of Bialystok
Copyright (c) 1990
Association of Mizar Users
Projective Spaces
-
Wojciech Leonczuk
-
Warsaw University, Bialystok
-
Supported by RPBP.III-24.C6.
-
Krzysztof Prazmowski
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Warsaw University, Bialystok
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Supported by RPBP.III-24.C2.
Summary.
-
In the class of all collinearity structures a subclass
of (dimension free) projective spaces, defined by means of a suitable
axiom system, is singled out. Whenever a real vector space V is at least
3-dimensional, the structure ProjectiveSpace(V) is a projective space
in the above meaning. Some narrower classes of projective spaces are
defined: Fano projective spaces, projective planes, and Fano projective
planes. For any of the above classes an explicit axiom system is given,
as well as an analytical example.
There is also a construction a of 3-dimensional and
a 4-dimensional real vector space; these are needed to show appropriate
examples of projective spaces.
The terminology and notation used in this paper have been
introduced in the following articles
[8]
[12]
[10]
[2]
[3]
[1]
[7]
[11]
[9]
[5]
[6]
[4]
Contents (PDF format)
Bibliography
- [1]
Czeslaw Bylinski.
Binary operations.
Journal of Formalized Mathematics,
1, 1989.
- [2]
Czeslaw Bylinski.
Functions and their basic properties.
Journal of Formalized Mathematics,
1, 1989.
- [3]
Czeslaw Bylinski.
Functions from a set to a set.
Journal of Formalized Mathematics,
1, 1989.
- [4]
Wojciech Leonczuk and Krzysztof Prazmowski.
A construction of analytical projective space.
Journal of Formalized Mathematics,
2, 1990.
- [5]
Henryk Oryszczyszyn and Krzysztof Prazmowski.
Real functions spaces.
Journal of Formalized Mathematics,
2, 1990.
- [6]
Wojciech Skaba.
The collinearity structure.
Journal of Formalized Mathematics,
2, 1990.
- [7]
Andrzej Trybulec.
Domains and their Cartesian products.
Journal of Formalized Mathematics,
1, 1989.
- [8]
Andrzej Trybulec.
Tarski Grothendieck set theory.
Journal of Formalized Mathematics,
Axiomatics, 1989.
- [9]
Andrzej Trybulec.
Function domains and Fr\aenkel operator.
Journal of Formalized Mathematics,
2, 1990.
- [10]
Andrzej Trybulec.
Subsets of real numbers.
Journal of Formalized Mathematics,
Addenda, 2003.
- [11]
Wojciech A. Trybulec.
Vectors in real linear space.
Journal of Formalized Mathematics,
1, 1989.
- [12]
Zinaida Trybulec.
Properties of subsets.
Journal of Formalized Mathematics,
1, 1989.
Received June 15, 1990
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