AbstractWe prove that a small minimal blocking set of PG(2,q) is “very close” to be a linear blocking set over some subfield GF(pe)<GF(q). This implies that (i) a similar result holds in PG(n,q) for small minimal blocking sets with respect to k-dimensional subspaces (0⩽k⩽n) and (ii) most of the intervals in the interval-theorems of Szőnyi and Szőnyi–Weiner are empty
The size of large minimal blocking sets is bounded by the Bruen–Thas upper bound. The bound is sha...
AbstractIn this paper the most natural questions concerning the blocking sets in the line Grassmanni...
In this paper the most natural questions concerning the blocking sets in the line Grassmannian of PG...
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...
In this paper, we show that a small minimal blocking set with exponent e in PG(n, p (t) ), p prime, ...
AbstractIn this paper, we show that a small minimal k-blocking set in PG(n,q3), q=ph, h⩾1, p prime, ...
We study minimal blocking sets inPG(2, q) havingq+mpoints outside some fixed line. Ifthen either the...
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...
AbstractWe show that small blocking sets in PG(n, q) with respect to hyperplanes intersect every hyp...
AbstractWe study minimal blocking sets inPG(2, q) havingq+mpoints outside some fixed line. If0<m<(q)...
In this paper, we show that a small minimal $k$-blocking set in $\PG(n,q^3)$, $q=p^h$, $h\geq 1$, $p...
In this paper we provide a generalisation the MPS construction of a blocking set of PG(r, qn) using ...
In this paper we collect results on the possible sizes of k-blocking sets. Since previous surveys fo...
The size of large minimal blocking sets is bounded by the Bruen–Thas upper bound. The bound is sha...
AbstractIn this paper the most natural questions concerning the blocking sets in the line Grassmanni...
In this paper the most natural questions concerning the blocking sets in the line Grassmannian of PG...
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...
In this paper, we show that a small minimal blocking set with exponent e in PG(n, p (t) ), p prime, ...
AbstractIn this paper, we show that a small minimal k-blocking set in PG(n,q3), q=ph, h⩾1, p prime, ...
We study minimal blocking sets inPG(2, q) havingq+mpoints outside some fixed line. Ifthen either the...
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...
AbstractWe show that small blocking sets in PG(n, q) with respect to hyperplanes intersect every hyp...
AbstractWe study minimal blocking sets inPG(2, q) havingq+mpoints outside some fixed line. If0<m<(q)...
In this paper, we show that a small minimal $k$-blocking set in $\PG(n,q^3)$, $q=p^h$, $h\geq 1$, $p...
In this paper we provide a generalisation the MPS construction of a blocking set of PG(r, qn) using ...
In this paper we collect results on the possible sizes of k-blocking sets. Since previous surveys fo...
The size of large minimal blocking sets is bounded by the Bruen–Thas upper bound. The bound is sha...
AbstractIn this paper the most natural questions concerning the blocking sets in the line Grassmanni...
In this paper the most natural questions concerning the blocking sets in the line Grassmannian of PG...
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