Small point sets that meet all generators of \(Q(2n,p)\), \(p>3\) prime
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Publication:1826949
DOI10.1016/j.jcta.2004.02.001zbMath1052.51005OpenAlexW2056135521MaRDI QIDQ1826949
Publication date: 6 August 2004
Published in: Journal of Combinatorial Theory. Series A (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jcta.2004.02.001
Combinatorial aspects of finite geometries (05B25) Blocking sets, ovals, (k)-arcs (51E21) Combinatorial structures in finite projective spaces (51E20)
Related Items (7)
Characterization results on small blocking sets of the polar spaces \(Q^+(2n+1,2)\) and \(Q^+(2n+1,3)\) ⋮ Bose-Burton type theorems for finite Grassmannians ⋮ Bose-Burton type theorems for finite Grassmannians ⋮ On ovoids of parabolic quadrics ⋮ Blocking all generators of \(Q^{+}(2n+1,3)\), \(n \geq 4\) ⋮ The smallest point sets that meet all generators of \(H(2n,q^2)\) ⋮ On the smallest minimal blocking sets of \(Q(2n,q)\), for \(q\) an odd prime
Cites Work
- The smallest point sets that meet all generators of \(H(2n,q^2)\)
- On the smallest minimal blocking sets of \(Q(2n,q)\), for \(q\) an odd prime
- The non-existence of ovoids in \(O_ \nu (q)\)
- Ovoids and spreads of finite classical polar spaces
- The sets closest to ovoids in \(Q^-(2n+1,q)\)
- Ovoids of the quadric Q\((2n,q)\)
- Small point sets that meet all generators of \(W(2n+1,q)\)
- On blocking sets of quadrics
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