A condition for the existence of ovals in PG(2, q), q even |
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| Authors: | David G. Glynn |
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| Affiliation: | (1) Department of Mathematics, University of Canterbury, Private Bag, Christchurch 1, New Zealand |
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| Abstract: | A condition is found that determines whether a polynomial over GF(q) gives an oval in PG(2, q), q even. This shows that the set of all ovals of PG(2, q) corresponds to a certain variety of points of PG((q–4)/2, q). The condition improves upon that of Segre and Bartocci, who proved that all the terms of an oval polynomial have even degree. It is suitable for efficient computer searches. |
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