In this paper we examine sets K of k points in a projective Galois space PG(r, q), of any dimension r, satisfying the following property: the union of all ϱ-subspaces, 0 ⩽ ϱ ⩽ r, of PG(r, q) generated by (ϱ + 1) independent points in K coincides with the whole space. Moreover, estimates for the smallest possible value of such a k are given
AbstractIn recent years, a considerable effort has been directed toward the determination of paramet...
In this paper, we characterise the smallest sets B consisting of points and hyperplanes in PG(n, q),...
We study families of linear spaces in projective space whose union is a proper subvariety X of the e...
In this paper we examine sets K of k points in a projective Galois space PG(r, q), of any dimension ...
In J.-P. Serre's Lettre et M. Tsfasman [3], an interesting bound for the maximal number of points on...
AbstractConsider a finite (t + r − 1)-dimensional projective space PG(t + r − 1, s) based on the Gal...
AbstractConsider a finite t + r − 1 dimensional projective space PG(t + r − 1, s) over a Galois fiel...
Consider a finite r-dimensional projective space PG(r, s) based on the Galois field GF(s) where s is...
In this paper we study sets X of points of both affine and projective spaces over the Galois field ...
AbstractMinimal saturating sets in projective spaces PG(n,q) are considered. Estimates and exact val...
AbstractFor a finite set of points spanning a projective space of dimension r sufficient conditions ...
AbstractIn this paper a projective combinatorial characterization of Veronese varieties in a Galois ...
Given a finite set, X, of points in projective space for which the Hilbert function is known, a stan...
Let S be a smooth hypersurface in projective three space and consider a projection of S from P ∈ S t...
The authors state several identities and inequalities for the intersection matrix IS of a matroid ...
AbstractIn recent years, a considerable effort has been directed toward the determination of paramet...
In this paper, we characterise the smallest sets B consisting of points and hyperplanes in PG(n, q),...
We study families of linear spaces in projective space whose union is a proper subvariety X of the e...
In this paper we examine sets K of k points in a projective Galois space PG(r, q), of any dimension ...
In J.-P. Serre's Lettre et M. Tsfasman [3], an interesting bound for the maximal number of points on...
AbstractConsider a finite (t + r − 1)-dimensional projective space PG(t + r − 1, s) based on the Gal...
AbstractConsider a finite t + r − 1 dimensional projective space PG(t + r − 1, s) over a Galois fiel...
Consider a finite r-dimensional projective space PG(r, s) based on the Galois field GF(s) where s is...
In this paper we study sets X of points of both affine and projective spaces over the Galois field ...
AbstractMinimal saturating sets in projective spaces PG(n,q) are considered. Estimates and exact val...
AbstractFor a finite set of points spanning a projective space of dimension r sufficient conditions ...
AbstractIn this paper a projective combinatorial characterization of Veronese varieties in a Galois ...
Given a finite set, X, of points in projective space for which the Hilbert function is known, a stan...
Let S be a smooth hypersurface in projective three space and consider a projection of S from P ∈ S t...
The authors state several identities and inequalities for the intersection matrix IS of a matroid ...
AbstractIn recent years, a considerable effort has been directed toward the determination of paramet...
In this paper, we characterise the smallest sets B consisting of points and hyperplanes in PG(n, q),...
We study families of linear spaces in projective space whose union is a proper subvariety X of the e...
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