Add to ORKGIt is known that every ovoid of the parabolic quadric Q(4,q), q = ph, p prime, in-tersects every three-dimensional elliptic quadric in 1 mod p points. We present a new approach which gives us a second proof of this result and, in the case when p = 2, allows us to prove that every ovoid of Q(4,q) either intersects all the three-dimensional ellip-tic quadrics in 1 mod 4 points or intersects all the three-dimensional elliptic quadrics in 3 mod 4 points. We also prove that every ovoid of Q(4,q), q prime, is an elliptic quadric. This theorem has several applications, one of which is the non-existence of ovoids of Q(6,q), q prime, q> 3. We conclude with a 1 mod p result for ovoids of Q(6,q).
An ovoid of $\PG(3,q)$ can be defined as a set of $q^2+1$ points with the property that every three ...
AbstractThis article presents a spectrum result on maximal partial ovoids of the generalized quadran...
AbstractLetO; be an ovoid of PG(3,q),qeven, such that each secant plane section is an oval contained...
In this article, an ovoidal fibration is used to show that any two ovoids of PG(3, q), q even, shari...
In this paper we give a short proof that an ovoid of PG(3,q) is stabilized by a non-trivial central ...
An ovoid of PG(3,q) can be defined as a set of q2 + 1 points with the property that every three poin...
AbstractWe consider ovoids of the non-singular quadric Q(2n, q) in PG(2n, q). It is known that Q(6, ...
AbstractIn this paper we give a short proof that an ovoid of PG(3,q) is stabilized by a non-trivial ...
An ovoid of PG(3, q) can be defined as a set of q2 + 1 points with the property that every three poi...
An ovoid of PG(3, q) can be defined as a set of q2 + 1 points with the property that every three poi...
We present a description of maximal partial ovoids of size q^2-1 of the parabolic quadric Q(4, q) as...
AbstractWe characterize the smallest minimal blocking sets of Q(2n,q), q an odd prime, in terms of o...
The generalized quadrangle $Q(4,q)$ arising from the parabolic quadric in $PG(4,q)$ always has an ov...
AbstractAn ovoid of PG(3,q) can be defined as a set of q2+1 points with the property that every thre...
An ovoid of PG(3,q) can be defined as a set of q2+1 points with the property that every three points...
An ovoid of $\PG(3,q)$ can be defined as a set of $q^2+1$ points with the property that every three ...
AbstractThis article presents a spectrum result on maximal partial ovoids of the generalized quadran...
AbstractLetO; be an ovoid of PG(3,q),qeven, such that each secant plane section is an oval contained...
In this article, an ovoidal fibration is used to show that any two ovoids of PG(3, q), q even, shari...
In this paper we give a short proof that an ovoid of PG(3,q) is stabilized by a non-trivial central ...
An ovoid of PG(3,q) can be defined as a set of q2 + 1 points with the property that every three poin...
AbstractWe consider ovoids of the non-singular quadric Q(2n, q) in PG(2n, q). It is known that Q(6, ...
AbstractIn this paper we give a short proof that an ovoid of PG(3,q) is stabilized by a non-trivial ...
An ovoid of PG(3, q) can be defined as a set of q2 + 1 points with the property that every three poi...
An ovoid of PG(3, q) can be defined as a set of q2 + 1 points with the property that every three poi...
We present a description of maximal partial ovoids of size q^2-1 of the parabolic quadric Q(4, q) as...
AbstractWe characterize the smallest minimal blocking sets of Q(2n,q), q an odd prime, in terms of o...
The generalized quadrangle $Q(4,q)$ arising from the parabolic quadric in $PG(4,q)$ always has an ov...
AbstractAn ovoid of PG(3,q) can be defined as a set of q2+1 points with the property that every thre...
An ovoid of PG(3,q) can be defined as a set of q2+1 points with the property that every three points...
An ovoid of $\PG(3,q)$ can be defined as a set of $q^2+1$ points with the property that every three ...
AbstractThis article presents a spectrum result on maximal partial ovoids of the generalized quadran...
AbstractLetO; be an ovoid of PG(3,q),qeven, such that each secant plane section is an oval contained...