On sets of type \((m,n)_{r - 1}\) in PG\((r,q)\)
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Publication:1024479
DOI10.1016/j.disc.2008.02.046zbMath1168.51002OpenAlexW2166542692MaRDI QIDQ1024479
Luigia Berardi, Tiziana Masini
Publication date: 17 June 2009
Published in: Discrete Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.disc.2008.02.046
Finite affine and projective planes (geometric aspects) (51E15) Combinatorial aspects of finite geometries (05B25) Combinatorial structures in finite projective spaces (51E20)
Related Items (3)
On quasi-Hermitian varieties in \(\operatorname{PG}(3, q^2)\) ⋮ On sets of type \((q + 1, n)_{2}\) in finite three-dimensional projective spaces ⋮ A characterization of the Hermitian variety in finite 3-dimensional projective spaces
Cites Work
- On the characterization of subgeometries \(PG(r,\sqrt{q})\) in \(PG(r,q)\)
- Semi-quadratic sets in projective spaces
- Parameters for sets of type \((m,n)\) in projective planes of prime power order
- Some sets of type \((m,n)\) in cubic order planes
- Quasi-symmetric designs, codes, quadrics, and hyperplane sections
- A combinatorial characterization of quadrics
- Some new results on sets of type (m,n) in projective planes
- On Baer subspaces of finite projective spaces
- Sets of type \((m,n)\) in the affine and projective planes of order nine
- Forme e geometrie hermitiane, con particolare riguardo al caso finito
- Ensembles quadratiques des espaces projectifs
- Some Results on Quadrics in Finite Projective Geometry Based on Galois Fields
- On the Characterization of certain Sets of Points in Finite Projective Geometry of Dimension Three
- A combinatorial problem
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