Add to ORKGABSTRACT. Many of the known ovoids and spreads of finite polar spaces admit a transitive group of collineations, and in 1988, P. Kleidman classified the ovoids admitting a 2-transitive group. A. Gunawardena has recently extended this classification by determining the ovoids of the seven-dimensional hyperbolic quadric which admit a primitive group. In this paper we classify the ovoids and spreads of finite polar spaces which are stabilised by an insoluble transitive group of collineations, as a corollary of a more general classification of m-systems admitting such groups. 1
We survey the main results on ovoids and spreads, large maximal partial ovoids and large maximal par...
AbstractLet P be a finite classical polar space of rank r, with r ⩾ 2. A partial m-system M of P, wi...
We survey the main results on ovoids and spreads, large maximal partial ovoids and large maximal par...
Many of the known ovoids and spreads of finite polar spaces admit a transitive group of collineation...
Many of the known ovoids and spreads of finite polar spaces admit a transitive group of collineation...
We survey results and particular facts about (partial) ovoids, (partial) spreads, m- systems, m-ovoi...
We survey results and particular facts about (partial) ovoids, (partial) spreads, m- systems, m-ovoi...
An ovoid of a finite classical polar space is a set of points having exactly one point in common wit...
An ovoid of a finite classical polar space is a set of points having exactly one point in common wit...
An ovoid of a finite classical polar space is a set of points having exactly one point in common wit...
An ovoid of a finite classical polar space is a set of points having exactly one point in common wit...
Abstract. We use a theorem of Guralnick, Penttila, Praeger, and Saxl to classify the subgroups of th...
We survey the main results on ovoids and spreads, large maximal partial ovoids and large maximal par...
AbstractKleidman (1988) has classified the 2-transitive ovoids in finite polar spaces. We show that ...
AbstractAs it is well known, the transitive ovoids of PG(3,q) are the non-degenerate quadrics and th...
We survey the main results on ovoids and spreads, large maximal partial ovoids and large maximal par...
AbstractLet P be a finite classical polar space of rank r, with r ⩾ 2. A partial m-system M of P, wi...
We survey the main results on ovoids and spreads, large maximal partial ovoids and large maximal par...
Many of the known ovoids and spreads of finite polar spaces admit a transitive group of collineation...
Many of the known ovoids and spreads of finite polar spaces admit a transitive group of collineation...
We survey results and particular facts about (partial) ovoids, (partial) spreads, m- systems, m-ovoi...
We survey results and particular facts about (partial) ovoids, (partial) spreads, m- systems, m-ovoi...
An ovoid of a finite classical polar space is a set of points having exactly one point in common wit...
An ovoid of a finite classical polar space is a set of points having exactly one point in common wit...
An ovoid of a finite classical polar space is a set of points having exactly one point in common wit...
An ovoid of a finite classical polar space is a set of points having exactly one point in common wit...
Abstract. We use a theorem of Guralnick, Penttila, Praeger, and Saxl to classify the subgroups of th...
We survey the main results on ovoids and spreads, large maximal partial ovoids and large maximal par...
AbstractKleidman (1988) has classified the 2-transitive ovoids in finite polar spaces. We show that ...
AbstractAs it is well known, the transitive ovoids of PG(3,q) are the non-degenerate quadrics and th...
We survey the main results on ovoids and spreads, large maximal partial ovoids and large maximal par...
AbstractLet P be a finite classical polar space of rank r, with r ⩾ 2. A partial m-system M of P, wi...
We survey the main results on ovoids and spreads, large maximal partial ovoids and large maximal par...