Quasi-Hermitian varieties V in PG (r,q2) are combinatorial generalizations of the (nondegenerate) Hermitian variety H(r,q2) so that V and H(r,q2) have the same size and the same intersection numbers with hyperplanes. In this paper, we construct a new family of quasi-Hermitian varieties. The isomorphism problem for the associated strongly regular graphs is discussed for r=2
It is known that the Hermitian varieties are codewords in the code defined by the points and hyperpl...
We study pseudo-geometric strongly regular graphs whose second subconstituent with respect to a vert...
Kestenband proved in \cite{K1} that there are only seven pairwise non-isomorphic Hermitian intersec...
Quasi-Hermitian varieties V in PG (r,q2) are combinatorial generalizations of the (nondegenerate) He...
Quasi-Hermitian varieties V in PG (r,q2) are combinatorial generalizations of the (nondegenerate) He...
In this paper a new example of quasi--Hermitian variety $\cV$ in $PG(r,q^2)$, $q$ an odd power ...
For the Hermitian variety $\mathcal{H}_r=H(r,q^2)$ of ${\rm{PG}}(r,q^2)$ we show that the associate...
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 ...
AbstractLetMbe a set of integers. We consider a set of varieties in PG(n,q) such that each variety c...
AbstractThe section of a non-degenerate Hermitian variety VN−1 by a polar hyperplane in PG(N, q2) an...
In this paper, we give characterizations of the classical generalized quadrangles H(3, q (2)) and H(...
In this paper, we give characterizations of the classical generalized quadrangles H(3, q (2)) and H(...
In this paper, we give characterizations of the classical generalized quadrangles H(3, q (2)) and H(...
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...
We study pseudo-geometric strongly regular graphs whose second subconstituent with respect to a vert...
Kestenband proved in \cite{K1} that there are only seven pairwise non-isomorphic Hermitian intersec...
Quasi-Hermitian varieties V in PG (r,q2) are combinatorial generalizations of the (nondegenerate) He...
Quasi-Hermitian varieties V in PG (r,q2) are combinatorial generalizations of the (nondegenerate) He...
In this paper a new example of quasi--Hermitian variety $\cV$ in $PG(r,q^2)$, $q$ an odd power ...
For the Hermitian variety $\mathcal{H}_r=H(r,q^2)$ of ${\rm{PG}}(r,q^2)$ we show that the associate...
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 ...
AbstractLetMbe a set of integers. We consider a set of varieties in PG(n,q) such that each variety c...
AbstractThe section of a non-degenerate Hermitian variety VN−1 by a polar hyperplane in PG(N, q2) an...
In this paper, we give characterizations of the classical generalized quadrangles H(3, q (2)) and H(...
In this paper, we give characterizations of the classical generalized quadrangles H(3, q (2)) and H(...
In this paper, we give characterizations of the classical generalized quadrangles H(3, q (2)) and H(...
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...
We study pseudo-geometric strongly regular graphs whose second subconstituent with respect to a vert...
Kestenband proved in \cite{K1} that there are only seven pairwise non-isomorphic Hermitian intersec...
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