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Constructions in Finite Geometry Using Computer Algebra Systems

✍ Scribed by G.L. Ebert

Publisher
Elsevier Science
Year
2001
Tongue
English
Weight
271 KB
Volume
31
Category
Article
ISSN
0747-7171

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✦ Synopsis

One way of using a computer algebra system to do research in finite geometry is to use the system to construct "small" order examples of various constructions, and then hope to recognize a pattern that can be generalized and eventually proven. Of course, initially one does not know if the "small" order examples exist. However, if one has sufficiently good insight concerning where to look and a reasonably good "starter", the computer algebra system will often find these examples quite expeditiously. Once found the system can then be used to analyze the constructs. Brute-force searching, on the other hand, is typically foolhardy with such general purpose systems. These ideas will be illustrated with two problems in finite geometry: (1) finding new translation planes by a technique called "nesting", and (2) finding large collections of pairwise disjoint projective bundles of conics.

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