AbstractIn this paper we characterize the GF(q)-linear blocking sets in PG(2,qt) of maximal size and we construct two new families of small minimal blocking sets not of Rédei type
AbstractA (q+1)-fold blocking set of size (q+1)(q4+q2+1) in PG(2, q4) which is not the union of q+1 ...
AbstractWe determine the smallest nontrivial blocking sets with respect to t-spaces in PG(n,2), n⩾3....
AbstractIn this paper, we study the p-ary linear code Ck(n,q), q=ph, p prime, h⩾1, generated by the ...
AbstractWe prove that a small minimal blocking set of PG(2,q) is “very close” to be a linear blockin...
AbstractIn this paper we characterize the GF(q)-linear blocking sets in PG(2,qt) of maximal size and...
AbstractWe prove that in the desarguesian plane PG(2, qt) (t>4) there are at least three inequivalen...
In this paper, we show that a small minimal blocking set with exponent e in PG(n, p t ), p prime, sp...
A small minimal k-blocking set B in PG(n,q), q = p(t), p prime, is a set of less than 3(q(k)+1)/2 po...
In [10], it was shown that small t-fold (n - k)-blocking sets in PG(n, q), q = p(h), p prime, h >= 1...
AbstractWe study minimal blocking sets inPG(2, q) havingq+mpoints outside some fixed line. If0<m<(q)...
We present a construction for minimal blocking sets with respect to (k-1)-spaces in PG (n-1,qt), the...
AbstractIn this paper the most natural questions concerning the blocking sets in the line Grassmanni...
AbstractIn this paper, we show that a small minimal k-blocking set in PG(n,q3), q=ph, h⩾1, p prime, ...
AbstractWe extend the results of Polverino (1999, Discrete Math., 208/209, 469–476; 2000, Des. Codes...
AbstractWe show that small blocking sets in PG(n, q) with respect to hyperplanes intersect every hyp...
AbstractA (q+1)-fold blocking set of size (q+1)(q4+q2+1) in PG(2, q4) which is not the union of q+1 ...
AbstractWe determine the smallest nontrivial blocking sets with respect to t-spaces in PG(n,2), n⩾3....
AbstractIn this paper, we study the p-ary linear code Ck(n,q), q=ph, p prime, h⩾1, generated by the ...
AbstractWe prove that a small minimal blocking set of PG(2,q) is “very close” to be a linear blockin...
AbstractIn this paper we characterize the GF(q)-linear blocking sets in PG(2,qt) of maximal size and...
AbstractWe prove that in the desarguesian plane PG(2, qt) (t>4) there are at least three inequivalen...
In this paper, we show that a small minimal blocking set with exponent e in PG(n, p t ), p prime, sp...
A small minimal k-blocking set B in PG(n,q), q = p(t), p prime, is a set of less than 3(q(k)+1)/2 po...
In [10], it was shown that small t-fold (n - k)-blocking sets in PG(n, q), q = p(h), p prime, h >= 1...
AbstractWe study minimal blocking sets inPG(2, q) havingq+mpoints outside some fixed line. If0<m<(q)...
We present a construction for minimal blocking sets with respect to (k-1)-spaces in PG (n-1,qt), the...
AbstractIn this paper the most natural questions concerning the blocking sets in the line Grassmanni...
AbstractIn this paper, we show that a small minimal k-blocking set in PG(n,q3), q=ph, h⩾1, p prime, ...
AbstractWe extend the results of Polverino (1999, Discrete Math., 208/209, 469–476; 2000, Des. Codes...
AbstractWe show that small blocking sets in PG(n, q) with respect to hyperplanes intersect every hyp...
AbstractA (q+1)-fold blocking set of size (q+1)(q4+q2+1) in PG(2, q4) which is not the union of q+1 ...
AbstractWe determine the smallest nontrivial blocking sets with respect to t-spaces in PG(n,2), n⩾3....
AbstractIn this paper, we study the p-ary linear code Ck(n,q), q=ph, p prime, h⩾1, generated by the ...
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