Add to ORKGAbstract. The projective planes of order 16 admitting a large (≥ 137) quasiregular group of collineations are classified. The classification is done using the theorem of Dembowski and Piper [DP67] and a complete search by computer. No new planes are found. 1
Erworben im Rahmen der Schweizer Nationallizenzen (http://www.nationallizenzen.ch)Smooth projective ...
AbstractLet π be a translation plane of even order q2 that admits SL(2, q) as a collineation group. ...
AbstractThere are four known finite projective planes of order 9. This paper reports the result of a...
The projective planes of order 16 admitting a large (≥ 137) quasiregular group of collineations are ...
London Mathematical Society Lecture Note Series n. 307 Let be a finite projective plane of order ...
This thesis discusses methods for the classification of finite projective planes via exhaustive sear...
We establish the connections between finite projective planes admitting a collineation group of Lenz...
AbstractA projective plane of order 16 is constructed. It is a translation plane and appears to be n...
Projective planes of order n admitting PSL(2, q), q > 3, as a collineation group are investigated fo...
summary:A quasiregular comfiguration is a finite partial plane, which not contains proper closed con...
AbstractIn this article, we prove that there is no projective plane of order 12 admitting a collinea...
Let S be a smooth stable plane of dimension n (see Definition 1.2) and let Δ be a closed subgroup of...
AbstractLet P be a projective plane of order 9 other than one of the four known ones. Then the order...
AbstractLet S be a smooth stable plane of dimension n (see Definition 1.2) and let Δ be a closed sub...
AbstractLet II be a projective plane of order 15 which contains the projective extension of a Kirkma...
Erworben im Rahmen der Schweizer Nationallizenzen (http://www.nationallizenzen.ch)Smooth projective ...
AbstractLet π be a translation plane of even order q2 that admits SL(2, q) as a collineation group. ...
AbstractThere are four known finite projective planes of order 9. This paper reports the result of a...
The projective planes of order 16 admitting a large (≥ 137) quasiregular group of collineations are ...
London Mathematical Society Lecture Note Series n. 307 Let be a finite projective plane of order ...
This thesis discusses methods for the classification of finite projective planes via exhaustive sear...
We establish the connections between finite projective planes admitting a collineation group of Lenz...
AbstractA projective plane of order 16 is constructed. It is a translation plane and appears to be n...
Projective planes of order n admitting PSL(2, q), q > 3, as a collineation group are investigated fo...
summary:A quasiregular comfiguration is a finite partial plane, which not contains proper closed con...
AbstractIn this article, we prove that there is no projective plane of order 12 admitting a collinea...
Let S be a smooth stable plane of dimension n (see Definition 1.2) and let Δ be a closed subgroup of...
AbstractLet P be a projective plane of order 9 other than one of the four known ones. Then the order...
AbstractLet S be a smooth stable plane of dimension n (see Definition 1.2) and let Δ be a closed sub...
AbstractLet II be a projective plane of order 15 which contains the projective extension of a Kirkma...
Erworben im Rahmen der Schweizer Nationallizenzen (http://www.nationallizenzen.ch)Smooth projective ...
AbstractLet π be a translation plane of even order q2 that admits SL(2, q) as a collineation group. ...
AbstractThere are four known finite projective planes of order 9. This paper reports the result of a...