A characterization of cones in PG(3, q) as sets of points of PG(3, q)of size q^2 + q + 1 projecting from a point V a set of q + 1 points of a plane of PG(3, q) and with three intersection numbers with respect to the planes is given
In this paper, a complete classification of subsets of points of PG(3, q) of type (3, q + 3) with r...
Thas (Geom Dedicata 1(2):236–240, 1973) proved that a set K of points of PG(d, q) intersected by an...
Using a variation of Seydewitz’s method of projective generation of quadratic cones, we define an al...
In this paper, sets of points of $\mathrm{PG}(3,q)$ of size $q^2+q+1$ and intersecting every plane i...
In this paper, sets of points of PG(3; q) of size q^2 + q + 1 and intersecting every plane in 1, m...
In this paper (q^2 + q + 1)–sets of points in PG(3, q) of type (m, n, r) with respect to planes are ...
The plane degree g_K(2) of a subset K of PG(3, q) is the greatest integer such that at least a plane...
In this paper, a description of sets of points of PG(3, q) of type (q + 1, n) with respect to the p...
In this paper, a description of sets of points of PG(3, q) of type (q + 1, n) with respect to the pl...
It is proved that a k–set of type (q +1, n)_2 in PG(3, q) either is a plane or it has size k ≥ (q +1...
Recently, in Innamorati and Zuanni (J. Geom 111:45, 2020. https://doi.org/10.1007/s00022-020-00557-...
In this short note we give a new and correct proof of a result of Ferri and Ferri on q^2–caps of AG(...
In this paper, a complete classification of subsets of points of PG(3, q) of type (3, q+3) with res...
In this paper a description for sets in PG(3,q) of type (q, n) with respect to planes is given
A set K of type (m,n)2 in the projective space PG(3,q) is a set of points such that every plane cont...
In this paper, a complete classification of subsets of points of PG(3, q) of type (3, q + 3) with r...
Thas (Geom Dedicata 1(2):236–240, 1973) proved that a set K of points of PG(d, q) intersected by an...
Using a variation of Seydewitz’s method of projective generation of quadratic cones, we define an al...
In this paper, sets of points of $\mathrm{PG}(3,q)$ of size $q^2+q+1$ and intersecting every plane i...
In this paper, sets of points of PG(3; q) of size q^2 + q + 1 and intersecting every plane in 1, m...
In this paper (q^2 + q + 1)–sets of points in PG(3, q) of type (m, n, r) with respect to planes are ...
The plane degree g_K(2) of a subset K of PG(3, q) is the greatest integer such that at least a plane...
In this paper, a description of sets of points of PG(3, q) of type (q + 1, n) with respect to the p...
In this paper, a description of sets of points of PG(3, q) of type (q + 1, n) with respect to the pl...
It is proved that a k–set of type (q +1, n)_2 in PG(3, q) either is a plane or it has size k ≥ (q +1...
Recently, in Innamorati and Zuanni (J. Geom 111:45, 2020. https://doi.org/10.1007/s00022-020-00557-...
In this short note we give a new and correct proof of a result of Ferri and Ferri on q^2–caps of AG(...
In this paper, a complete classification of subsets of points of PG(3, q) of type (3, q+3) with res...
In this paper a description for sets in PG(3,q) of type (q, n) with respect to planes is given
A set K of type (m,n)2 in the projective space PG(3,q) is a set of points such that every plane cont...
In this paper, a complete classification of subsets of points of PG(3, q) of type (3, q + 3) with r...
Thas (Geom Dedicata 1(2):236–240, 1973) proved that a set K of points of PG(d, q) intersected by an...
Using a variation of Seydewitz’s method of projective generation of quadratic cones, we define an al...
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