Collineation groups which are sharply transitive on an oval
نویسندگان
چکیده
منابع مشابه
Collineation Groups Which Are Primitive on an Oval of a Projective Plane of Odd Order
It is shown that a projective plane of odd order, with a collineation group acting primitively on the points of an invariant oval, must be desarguesian. Moreover, the group is actually doubly transitive, with only one exception. The main tool in the proof is that a collineation group leaving invariant an oval in a projective plane of odd order has 2-rank at most three.
متن کاملSharply 2-transitive groups
We give an explicit construction of sharply 2-transitive groups with fixed point free involutions and without nontrivial abelian normal subgroup.
متن کاملSharply 3-transitive groups
We construct the first sharply 3-transitive groups not arising from a near field, i.e. point stabilizers have no nontrivial abelian normal subgroup.
متن کاملAntiflag-transitive collineation groups revisited
An antiflag in a projective space is a non-incident point-hyperplane pair. A subgroup G of ΓL(n,q) is antiflag-transitive if it acts transitively on the set of antiflag of PG(n−1,q). In 1979, Cameron and Kantor [2] published a paper determining all antiflagtransitive subgroups of ΓL(n,q). A large part of the motivation was the fact that a group which acts 2-transitively on points is necessarily...
متن کاملIrreducible collineation groups with two orbits forming an oval
Let G be a collineation group of a finite projective plane π of odd order fixing an oval Ω . We investigate the case in which G has even order, has two orbits Ω0 and Ω1 on Ω , and the action of G on Ω0 is primitive. We show that if G is irreducible, then π has a G-invariant desarguesian subplane π0 and Ω0 is a conic of π0. © 2007 Elsevier Inc. All rights reserved.
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ژورنال
عنوان ژورنال: Bulletin of the Australian Mathematical Society
سال: 1974
ISSN: 0004-9727,1755-1633
DOI: 10.1017/s0004972700043793