DOIAbstract
AbstractIn this paper we give a short proof that an ovoid of PG(3,q) is stabilized by a non-trivial central collineation of PG(3,q) if and only if it is an elliptic quadric
AbstractIn this paper we give a short proof that an ovoid of PG(3,q) is stabilized by a non-trivial central collineation of PG(3,q) if and only if it is an elliptic quadric
AbstractIn this paper we review the known examples of ovoids in PG(3, q). We survey classification a...
AbstractUsing some geometry of quadrics permutable with a Hermitian surface H(3,q2) of PG(3,q2), q o...
An ovoid of PG(3,q) can be defined as a set of q2+1 points with the property that every three points...
In this paper we give a short proof that an ovoid of PG(3,q) is stabilized by a non-trivial central ...
It is known that every ovoid of the parabolic quadric Q(4,q), q = ph, p prime, in-tersects every thr...
An ovoid of PG(3,q) can be defined as a set of q2 + 1 points with the property that every three poin...
AbstractAs it is well known, the transitive ovoids of PG(3,q) are the non-degenerate quadrics and th...
AbstractLetO; be an ovoid of PG(3,q),qeven, such that each secant plane section is an oval contained...
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...
In this article, an ovoidal fibration is used to show that any two ovoids of PG(3, q), q even, shari...
AbstractA flock of a quadratic cone of PG(3,q) is a partition of the non-vertex points into plane se...
A flock of a quadratic cone of PG(3,q) is a partition of the non-vertex points into plane sections. ...
In this paper we will discuss some of the connections between flocks of quadratic cones, ovoids of P...
AbstractAn ovoid of PG(3,q) can be defined as a set of q2+1 points with the property that every thre...
AbstractIn this paper we review the known examples of ovoids in PG(3, q). We survey classification a...
AbstractUsing some geometry of quadrics permutable with a Hermitian surface H(3,q2) of PG(3,q2), q o...
An ovoid of PG(3,q) can be defined as a set of q2+1 points with the property that every three points...
In this paper we give a short proof that an ovoid of PG(3,q) is stabilized by a non-trivial central ...
It is known that every ovoid of the parabolic quadric Q(4,q), q = ph, p prime, in-tersects every thr...
An ovoid of PG(3,q) can be defined as a set of q2 + 1 points with the property that every three poin...
AbstractAs it is well known, the transitive ovoids of PG(3,q) are the non-degenerate quadrics and th...
AbstractLetO; be an ovoid of PG(3,q),qeven, such that each secant plane section is an oval contained...
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...
In this article, an ovoidal fibration is used to show that any two ovoids of PG(3, q), q even, shari...
AbstractA flock of a quadratic cone of PG(3,q) is a partition of the non-vertex points into plane se...
A flock of a quadratic cone of PG(3,q) is a partition of the non-vertex points into plane sections. ...
In this paper we will discuss some of the connections between flocks of quadratic cones, ovoids of P...
AbstractAn ovoid of PG(3,q) can be defined as a set of q2+1 points with the property that every thre...
AbstractIn this paper we review the known examples of ovoids in PG(3, q). We survey classification a...
AbstractUsing some geometry of quadrics permutable with a Hermitian surface H(3,q2) of PG(3,q2), q o...
An ovoid of PG(3,q) can be defined as a set of q2+1 points with the property that every three points...
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