arXiv:0803.1597 Abstract | arXiv Analytics

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On the non--existence of certain hyperovals in dual André planes of order $2^{2h}$

Published 2008-03-11, updated 2008-07-25Version 2

No regular hyperoval of the Desarguesian affine plane $AG(2,2^{2h})$, with $h>1$, is inherited by a dual Andr\'e plane of order $2^{2h}$ with dimension 2 over its centre.

Comments: 6 pages; reviewed version with generalisation to some dual Andr\'e planes, as well as updated proofs

Journal: Electronic Journal of Combinatorics 15(1): N37 (2008)

Categories: math.CO

Subjects: 51A35, 51E21

Keywords: non-existence, desarguesian affine plane, dual andre plane, regular hyperoval

Tags: journal article

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arXiv:0803.1597 [math.CO]Abstract References Reviews Resources

On the non--existence of certain hyperovals in dual André planes of order $2^{2h}$

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On the non--existence of certain hyperovals in dual André planes of order $2^{2h}$

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arXiv:0803.1597 [math.CO]Abstract References Reviews Resources