AbstractWe investigate the intersection R of two permutable Hermitian surfaces of PG(3,q2), q odd. We show that R is a determinantal variety. From the combinatorial point of view R comprises a complete (q2+1)-span of the two corresponding Hermitian surfaces
AbstractLetMbe a set of integers. We consider a set of varieties in PG(n,q) such that each variety c...
A combinatorial characterization of a non{singular Hermitian variety of the fnite 3-dimensional pro...
Using a variation of Seydewitz’s method of projective generation of quadrics we define two algebraic...
AbstractWe investigate the intersection R of two permutable Hermitian surfaces of PG(3,q2), q odd. W...
AbstractUsing some geometry of quadrics permutable with a Hermitian surface H(3,q2) of PG(3,q2), q o...
In PG(3,q^2), with q odd, we determine the possible intersection sizes of a Hermitian surface H and ...
In PG(3,q^2), with q odd, we determine the possible intersection sizes of a Hermitian surface H and ...
We determine the possible intersection sizes of a Hermitian surface with an irreducible quadric of...
We determine the possible intersection sizes of a Hermitian surface H with an irreducible quadric o...
We provide a description of the configuration arising from intersection of two Hermitian surfaces in...
AbstractA characterization of certain elliptic quadrics Q−(3,q) embedded in the Hermitian surface of...
AbstractSome geometry and combinatorics of orthogonal and symplectic polarities commuting with a uni...
AbstractKestenband [Unital intersections in finite projective planes, Geom. Dedicata 11(1) (1981) 10...
Kestenband [Unital intersections in finite projective planes, Geom. Dedicata 11(1) (1981) 107–117; D...
AbstractWe construct minimal blocking sets with respect to generators on the Hermitian surfaces H(n,...
AbstractLetMbe a set of integers. We consider a set of varieties in PG(n,q) such that each variety c...
A combinatorial characterization of a non{singular Hermitian variety of the fnite 3-dimensional pro...
Using a variation of Seydewitz’s method of projective generation of quadrics we define two algebraic...
AbstractWe investigate the intersection R of two permutable Hermitian surfaces of PG(3,q2), q odd. W...
AbstractUsing some geometry of quadrics permutable with a Hermitian surface H(3,q2) of PG(3,q2), q o...
In PG(3,q^2), with q odd, we determine the possible intersection sizes of a Hermitian surface H and ...
In PG(3,q^2), with q odd, we determine the possible intersection sizes of a Hermitian surface H and ...
We determine the possible intersection sizes of a Hermitian surface with an irreducible quadric of...
We determine the possible intersection sizes of a Hermitian surface H with an irreducible quadric o...
We provide a description of the configuration arising from intersection of two Hermitian surfaces in...
AbstractA characterization of certain elliptic quadrics Q−(3,q) embedded in the Hermitian surface of...
AbstractSome geometry and combinatorics of orthogonal and symplectic polarities commuting with a uni...
AbstractKestenband [Unital intersections in finite projective planes, Geom. Dedicata 11(1) (1981) 10...
Kestenband [Unital intersections in finite projective planes, Geom. Dedicata 11(1) (1981) 107–117; D...
AbstractWe construct minimal blocking sets with respect to generators on the Hermitian surfaces H(n,...
AbstractLetMbe a set of integers. We consider a set of varieties in PG(n,q) such that each variety c...
A combinatorial characterization of a non{singular Hermitian variety of the fnite 3-dimensional pro...
Using a variation of Seydewitz’s method of projective generation of quadrics we define two algebraic...
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