Add to ORKGA combinatorial characterization of a non{singular Hermitian variety of the fnite 3-dimensional projective space via its intersection numbers with respect to lines and planes is given
AbstractThere have been many characterizations of the classical curves in PG(2, q) given by the zero...
We determine the possible intersection sizes of a Hermitian surface with an irreducible quadric of...
AbstractThe section of a non-degenerate Hermitian variety VN−1 by a polar hyperplane in PG(N, q2) an...
A combinatorial characterization of a non{singular Hermitian variety of the fnite 3-dimensional pro...
A combinatorial characterization of a non{singular Hermitian variety of the fnite 3-dimensional pro...
A combinatorial characterization of a non–singular Hermitian variety of the finite 3-dimensional pro...
AbstractTo characterize Hermitian varieties in projective space PG(d, q) of d dimensions over the Ga...
It is known that the Hermitian varieties are codewords in the code defined by the points and hyperpl...
It is known that the Hermitian varieties are codewords in the code defined by the points and hyperpl...
AbstractTo characterize Hermitian varieties in projective space PG(d, q) of d dimensions over the Ga...
To characterize Hermitian varieties in projective space PG(d, q) of d dimensions over the Galois fie...
Two combinatorial characterizations of the Hermitian surface of the finite 3-dimensional projective ...
Two combinatorial characterizations of the Hermitian surface of the finite 3-dimensional projective ...
AbstractUsing a Hermitian form on a vector space over GF (l), we produce a geometry on the associate...
AbstractKestenband [Unital intersections in finite projective planes, Geom. Dedicata 11(1) (1981) 10...
AbstractThere have been many characterizations of the classical curves in PG(2, q) given by the zero...
We determine the possible intersection sizes of a Hermitian surface with an irreducible quadric of...
AbstractThe section of a non-degenerate Hermitian variety VN−1 by a polar hyperplane in PG(N, q2) an...
A combinatorial characterization of a non{singular Hermitian variety of the fnite 3-dimensional pro...
A combinatorial characterization of a non{singular Hermitian variety of the fnite 3-dimensional pro...
A combinatorial characterization of a non–singular Hermitian variety of the finite 3-dimensional pro...
AbstractTo characterize Hermitian varieties in projective space PG(d, q) of d dimensions over the Ga...
It is known that the Hermitian varieties are codewords in the code defined by the points and hyperpl...
It is known that the Hermitian varieties are codewords in the code defined by the points and hyperpl...
AbstractTo characterize Hermitian varieties in projective space PG(d, q) of d dimensions over the Ga...
To characterize Hermitian varieties in projective space PG(d, q) of d dimensions over the Galois fie...
Two combinatorial characterizations of the Hermitian surface of the finite 3-dimensional projective ...
Two combinatorial characterizations of the Hermitian surface of the finite 3-dimensional projective ...
AbstractUsing a Hermitian form on a vector space over GF (l), we produce a geometry on the associate...
AbstractKestenband [Unital intersections in finite projective planes, Geom. Dedicata 11(1) (1981) 10...
AbstractThere have been many characterizations of the classical curves in PG(2, q) given by the zero...
We determine the possible intersection sizes of a Hermitian surface with an irreducible quadric of...
AbstractThe section of a non-degenerate Hermitian variety VN−1 by a polar hyperplane in PG(N, q2) an...