论文信息 - On finite projective planes in Lenz-Barlotti class at least I.3

On finite projective planes in Lenz-Barlotti class at least I.3

We establish the connections between finite projective planes admitting a collineation group of Lenz-Barlotti type 1.3 or 1.4, partially transitive planes of type (3) in the sense of Hughes, and planes admitting a quasiregular collineation group of type (g) in the Dembowski- Piper classification; our main tool is an equivalent description by a certain type of difference set relative to disjoint subgroups which we will call a neo-difference set. We then discuss geometric properties and restrictions for the existence of planes of Lenz-Barlotti class 1.4. As a side result, we also obtain a new synthetic description of projective triangles in desarguesian planes.

Dieter Jungnickel | Dina Ghinelli | D. Jungnickel | D. Ghinelli

[1] Dieter Jungnickel,et al. On the Geometry of Planar Difference Sets , 1984, Eur. J. Comb..

[2] Planar division neo-rings , 1955 .

[3] Yutaka Hiramine,et al. Difference Sets Relative to Disjoint Subgroups , 1999, J. Comb. Theory, Ser. A.

[4] Hans Zassenhaus,et al. Über endliche Fastkörper , 1935 .

[5] Dieter Jungnickel,et al. Finite projective planes with a large abelian group , 2003 .

[6] Aart Blokhuis,et al. Hermitian unitals are code words , 1991, Discret. Math..

[7] H. Lenz. Kleiner Desarguesscher Satz und Dualität in projektiven Ebenen. , 1955 .

[8] Siu Lun Ma. Partial difference sets , 1984, Discret. Math..

[9] J. Hirschfeld. Projective Geometries Over Finite Fields , 1980 .

[10] Fred Piper,et al. Quasiregular collineation groups of finite projective planes , 1967 .

[11] B. Segre. Ovals In a Finite Projective Plane , 1955, Canadian Journal of Mathematics.

[12] Adriano Barlotti. Le possibili configurazioni del sistema delle coppie punto-retta $(A,a)$ per cui un piano grafico risulta $(A,a)$-transitivo. , 1957 .

[13] Dieter Jungnickel,et al. Arcs and Ovals from Abelian Groups , 2002, Des. Codes Cryptogr..

[14] Projective planes of type I-4 , 1974 .

[15] Aart Blokhuis,et al. Finite Geometries , 2018, Des. Codes Cryptogr..