On 1-blocking sets in \(PG(n,q), n\geq 3\)
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Publication:5926327
DOI10.1023/A:1008308200010zbMath0974.51009OpenAlexW200258371MaRDI QIDQ5926327
Publication date: 24 July 2001
Published in: Designs, Codes and Cryptography (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1023/a:1008308200010
Related Items (16)
Small minimal blocking sets in \(\text{PG}(2,q^3)\) ⋮ Small point sets of \(\text{PG}(n, q ^{3})\) intersecting each \(k\)-subspace in 1 mod \(q\) points ⋮ Blocking sets in \(\mathrm{PG}(r,q^n)\) ⋮ The Use of Blocking Sets in Galois Geometries and in Related Research Areas ⋮ On the smallest maximal partial ovoids and spreads of the generalized quadrangles \(W(q)\) and \(Q(4,q)\) ⋮ A proof of the linearity conjecture for \(k\)-blocking sets in PG\((n,p^{3}), \, p\) prime ⋮ A small minimal blocking set in \(\mathrm{PG}(n,p^t)\), spanning a \((t-1)\)-space, is linear ⋮ Weighted \(\{\delta (q+1),\delta ;k-1,q\}\)-minihypers ⋮ On small blocking sets and their linearity ⋮ A classification result on weighted \(\{\delta v_{\mu +1},\delta v_{\mu};N,p^{3}\}\)-minihypers ⋮ Small blocking sets in higher dimensions ⋮ Linear sets in finite projective spaces ⋮ Blocking sets in \(\text{PG}(2,q^n)\) from cones of \(\text{PG}(2n,q)\) ⋮ Minimal Blocking Sets inPG(n, 2) and Covering Groups by Subgroups ⋮ Small weight codewords in the dual code of points and hyperplanes in PG\((n, q), q\) even ⋮ On a particular class of minihypers and its applications. II: Improvements for \(q\) square
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