AbstractIn this note we complete the classification of inherited hyperconics in Hall planes of even order that was started by O’Keefe and Pascasio by proving that in the cases left open in [C.M. O’Keefe, A.A. Pascasio, Images of conics under derivation, Discrete Math. 151 (1996) 189–199] there are no inherited hyperconics
AbstractWe classify nondegenerate plane configurations by attaching, to each such configuration of n...
Let $\Omega$ be a hyperoval in a projective plane $\pi$ of even order $n$, and $G$ the collineation ...
AbstractIn [3], W. M. Cherowitzo constructed ovals in all finite Figueroa planes of odd order. Here ...
The existence of ovals and hyperovals is an old question in the theory of non-Desarguesian planes. T...
AbstractThe Hall plane of order q2 is constructed from the Desarguesian plane of order q2 by the pro...
AbstractThe conics of a finite Desarguesian plane of square even order satisfying the following prop...
AbstractIn this paper we construct two classes of translation hyperovals in any Hall plane of even o...
Let {dollar}\pi{dollar} = PG(2,F), where F is a field of characteristic 2 and of order greater than ...
Let C̄ be a conic in PG(2,q ) and suppose we derive with respect to a derivation set or multiple der...
AbstractLet C¯ be a conic in PG(2,q2) and suppose we derive with respect to a derivation set or mult...
AbstractRecent progress in the study of hyperovals in Desarguesian planes of even order has been rap...
Cutting a polytope is a very natural way to produce new classes of interesting polytopes. Moreover, ...
Cutting a polytope is a very natural way to produce new classes of interesting polytopes. Moreover, ...
Define a conic blocking set to be a set of lines in a Desarguesian projective plane such that all co...
AbstractIn [13] the author constructed a class of maximal arcs in the Hall planes of even order. In ...
AbstractWe classify nondegenerate plane configurations by attaching, to each such configuration of n...
Let $\Omega$ be a hyperoval in a projective plane $\pi$ of even order $n$, and $G$ the collineation ...
AbstractIn [3], W. M. Cherowitzo constructed ovals in all finite Figueroa planes of odd order. Here ...
The existence of ovals and hyperovals is an old question in the theory of non-Desarguesian planes. T...
AbstractThe Hall plane of order q2 is constructed from the Desarguesian plane of order q2 by the pro...
AbstractThe conics of a finite Desarguesian plane of square even order satisfying the following prop...
AbstractIn this paper we construct two classes of translation hyperovals in any Hall plane of even o...
Let {dollar}\pi{dollar} = PG(2,F), where F is a field of characteristic 2 and of order greater than ...
Let C̄ be a conic in PG(2,q ) and suppose we derive with respect to a derivation set or multiple der...
AbstractLet C¯ be a conic in PG(2,q2) and suppose we derive with respect to a derivation set or mult...
AbstractRecent progress in the study of hyperovals in Desarguesian planes of even order has been rap...
Cutting a polytope is a very natural way to produce new classes of interesting polytopes. Moreover, ...
Cutting a polytope is a very natural way to produce new classes of interesting polytopes. Moreover, ...
Define a conic blocking set to be a set of lines in a Desarguesian projective plane such that all co...
AbstractIn [13] the author constructed a class of maximal arcs in the Hall planes of even order. In ...
AbstractWe classify nondegenerate plane configurations by attaching, to each such configuration of n...
Let $\Omega$ be a hyperoval in a projective plane $\pi$ of even order $n$, and $G$ the collineation ...
AbstractIn [3], W. M. Cherowitzo constructed ovals in all finite Figueroa planes of odd order. Here ...
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