Add to ORKGThe main purpose of this paper is to find double blocking sets in PG(2,q) of size less than 3q, in particular when q is prime. To this end, we study double blocking sets in PG(2,q) of size 3q-1 admitting at least two (q-1)-secants. We derive some structural properties of these and show that they cannot have three (q-1)-secants. This yields that one cannot remove six points from a triangle, a double blocking set of size 3q, and add five new points so that the resulting set is also a double blocking set. Furthermore, we give constructions of minimal double blocking sets of size 3q-1 in PG(2,q) for q=13, 16, 19, 25, 27, 31, 37 and 43. If q>13 is a prime, these are the first examples of double blocking sets of size less than 3q. These results ...
For a given nonempty subset $\mathcal{L}$ of the line set of $\PG(3,q)$, a set $X$ of points of $\PG...
AbstractIn this paper we characterize the GF(q)-linear blocking sets in PG(2,qt) of maximal size and...
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 ...
The main purpose of this paper is to find double blocking sets in PG(2, q) of size less than3q, in p...
AbstractA proper double blocking set in PG(2,p) is a set B of points such that 2⩽|B∩l|⩽(p+1)-2 for e...
AbstractWe obtain lower bounds for the size of a double blocking set in the Desarguesian projective ...
AbstractLower bounds are obtained for the size of a triple blocking set in the Desarguesian projecti...
This article continues the study of multiple blocking sets in PG(2, q). In [A. Blokhuis, L. Storme, ...
We obtain lower bounds for the size of a double blocking set in the Desarguesian projective planePG(...
AbstractWe extend the results of Polverino (1999, Discrete Math., 208/209, 469–476; 2000, Des. Codes...
In this paper, by using properties of Baer subplanes, we describe the construction of a minimal bloc...
We classify the smallest two fold blocking sets with respect to the (n-k)-spaces in PG(n, 2). We sho...
The size of large minimal blocking sets is bounded by the Bruen–Thas upper bound. The bound is sha...
Let Q(+)(3, q) be a hyperbolic quadric in PG(3, q) and T-1 be the set of all lines of PG(3, q) meeti...
AbstractWe prove that in the desarguesian plane PG(2, qt) (t>4) there are at least three inequivalen...
For a given nonempty subset $\mathcal{L}$ of the line set of $\PG(3,q)$, a set $X$ of points of $\PG...
AbstractIn this paper we characterize the GF(q)-linear blocking sets in PG(2,qt) of maximal size and...
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 ...
The main purpose of this paper is to find double blocking sets in PG(2, q) of size less than3q, in p...
AbstractA proper double blocking set in PG(2,p) is a set B of points such that 2⩽|B∩l|⩽(p+1)-2 for e...
AbstractWe obtain lower bounds for the size of a double blocking set in the Desarguesian projective ...
AbstractLower bounds are obtained for the size of a triple blocking set in the Desarguesian projecti...
This article continues the study of multiple blocking sets in PG(2, q). In [A. Blokhuis, L. Storme, ...
We obtain lower bounds for the size of a double blocking set in the Desarguesian projective planePG(...
AbstractWe extend the results of Polverino (1999, Discrete Math., 208/209, 469–476; 2000, Des. Codes...
In this paper, by using properties of Baer subplanes, we describe the construction of a minimal bloc...
We classify the smallest two fold blocking sets with respect to the (n-k)-spaces in PG(n, 2). We sho...
The size of large minimal blocking sets is bounded by the Bruen–Thas upper bound. The bound is sha...
Let Q(+)(3, q) be a hyperbolic quadric in PG(3, q) and T-1 be the set of all lines of PG(3, q) meeti...
AbstractWe prove that in the desarguesian plane PG(2, qt) (t>4) there are at least three inequivalen...
For a given nonempty subset $\mathcal{L}$ of the line set of $\PG(3,q)$, a set $X$ of points of $\PG...
AbstractIn this paper we characterize the GF(q)-linear blocking sets in PG(2,qt) of maximal size and...
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 ...