Add to ORKGLondon Mathematical Society Lecture Note Series n. 307 Let be a finite projective plane of order n, and let G be a large abelian (or, more generally, quasiregular) collineation group of ; to be specific, we assume |G| > (n2 + n + 1)/2. Such planes have been classified into eight cases by Dembowski and Piper in 1967. We survey the present state of knowledge about the existence and structure of such planes. We also discuss some geometric applications, in particular to the construction of arcs and ovals. Technically, a recurrent theme will be the amazing strength of the approach using various types of difference sets and the machinery of integral group rings
AbstractA projective Hjelmslev plane is called regular iff it admits an Abelian collineation group t...
Projective planes of even order admitting a collineation group fixing an oval and having one or two...
EnThe paper provides a survey on the known results on the collineation groups acting on a line of a ...
Abstract. The projective planes of order 16 admitting a large (≥ 137) quasiregular group of collinea...
The projective planes Of order 16 admitting a large (>= 137) quasiregular group of collineati...
AbstractThe projective planes of order n with a collineation group acting 2-transitively on an arc o...
The projective planes of order n with a collineation group acting 2-transitively on an arc of length...
Let Π be a finite projective plane admitting a large abelian collineation group. It is well known t...
We establish the connections between finite projective planes admitting a collineation group of Lenz...
Ph.D. thesis, University of Sussex at Brighton, U.K. Chapter 1 introduces some background material c...
It is our purpose to specify some of the theory of collineation groups of finite projective planes a...
Apart from hyperovals and their duals there are only three classes of maximal arcs known in Desargue...
AbstractWe investigate collineation groups of a finite projective plane of odd order n fixing an ova...
AbstractApart from hyperovals and their duals there are only three classes of maximal arcs known in ...
We investigate collineation groups of a finite projective plane of odd order n fixing an oval and ha...
AbstractA projective Hjelmslev plane is called regular iff it admits an Abelian collineation group t...
Projective planes of even order admitting a collineation group fixing an oval and having one or two...
EnThe paper provides a survey on the known results on the collineation groups acting on a line of a ...
Abstract. The projective planes of order 16 admitting a large (≥ 137) quasiregular group of collinea...
The projective planes Of order 16 admitting a large (>= 137) quasiregular group of collineati...
AbstractThe projective planes of order n with a collineation group acting 2-transitively on an arc o...
The projective planes of order n with a collineation group acting 2-transitively on an arc of length...
Let Π be a finite projective plane admitting a large abelian collineation group. It is well known t...
We establish the connections between finite projective planes admitting a collineation group of Lenz...
Ph.D. thesis, University of Sussex at Brighton, U.K. Chapter 1 introduces some background material c...
It is our purpose to specify some of the theory of collineation groups of finite projective planes a...
Apart from hyperovals and their duals there are only three classes of maximal arcs known in Desargue...
AbstractWe investigate collineation groups of a finite projective plane of odd order n fixing an ova...
AbstractApart from hyperovals and their duals there are only three classes of maximal arcs known in ...
We investigate collineation groups of a finite projective plane of odd order n fixing an oval and ha...
AbstractA projective Hjelmslev plane is called regular iff it admits an Abelian collineation group t...
Projective planes of even order admitting a collineation group fixing an oval and having one or two...
EnThe paper provides a survey on the known results on the collineation groups acting on a line of a ...