Basri Celik

Copyright © 2001 Basri Celik. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

Let Π=(P,L,I) be a finite projective plane of order n, and let Π′=(P′,L′,I′) be a subplane of Π with order m which is not a Baer subplane (i.e., n≥m2+m). Consider the substructure Π0=(P0,L0,I0) with P0=P\{X∈P|XIl,  l∈L′}, L0=L\L′ where I0 stands for the restriction of I to P0×L0. It is shown that every Π0 is a hyperbolic plane, in the sense of Graves, if n≥m2+m+1+m2+m+2. Also we give some combinatorial properties of the line classes in Π0 hyperbolic planes, and some relations between its points and lines.