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Home > Vol 24, No 1 (2006)

Bart De Bruyn

Postdoctoral Fellow of the Research Foundation - Flanders B. D. Bruyn ( ) Department of Pure Mathematics and Computer Algebra, Ghent University, Galglaan 2, B-9000 Gent, Belgium

Brouwer and Wilbrink [3] showed the nonexistence of regular near octagons whose parameters s, t ₂, t ₃ and t satisfy s \geq  2, t ₂ \geq  2 and t ₃ \neq  t ₂( t ₂+1). Later an arithmetical error was discovered in the proof. Because of this error, the existence problem was still open for the near octagons corresponding with certain values of s, t ₂ and t ₃. In the present paper, we will also show the nonexistence of these remaining regular near octagons.

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