AbstractIn this paper we present a general method to construct caps in higher-dimensional projective spaces. As an application, for q≥8 even we obtain caps in PG(5,q) larger than the caps known so far, and a new class of caps of size (q+1)(q2+3) for q≥7 odd
AbstractThis article presents cyclic and elementary abelian caps in projective spaces. Different cla...
In this work complete caps in PG(N, q) of size O(q(N-1/2) log(300) q) are obtained by probabilistic ...
AbstractA family of caps constructed by G. L. Ebert, K. Metsch and T. Szönyi results from projecting...
We introduce several recursive constructions for caps in projective spaces. These generalize the kno...
We introduce several recursive constructions for caps in projective spaces. These generalize the kno...
AbstractIn this paper we present a general method to construct caps in higher-dimensional projective...
We construct large caps in projective spaces of small dimension (up to 11) defined over fields of or...
In this paper, we consider new results on (k, n)-caps with n > 2. We provide a lower bound on the si...
In this paper, we consider new results on (k, n)-caps with n > 2. We provide a lower bound on the si...
In this paper, we consider new results on (k, n)-caps with n > 2. We provide a lower bound on the si...
We construct caps in projective 4-space PG(4, q) in odd characteristic, whose cardinality is O(5/2q2...
AbstractWe construct caps in projective 4-space PG(4, q) in odd characteristic, whose cardinality is...
A family of caps constructed by Ebert, Metsch and T. Szonyi [8] results from projecting a Veronesian...
AbstractA cap in a projective or affine geometry is a set of points with the property that no line m...
AbstractOne of the crucial problem about caps is to determine the spectrum of the values of k for wh...
AbstractThis article presents cyclic and elementary abelian caps in projective spaces. Different cla...
In this work complete caps in PG(N, q) of size O(q(N-1/2) log(300) q) are obtained by probabilistic ...
AbstractA family of caps constructed by G. L. Ebert, K. Metsch and T. Szönyi results from projecting...
We introduce several recursive constructions for caps in projective spaces. These generalize the kno...
We introduce several recursive constructions for caps in projective spaces. These generalize the kno...
AbstractIn this paper we present a general method to construct caps in higher-dimensional projective...
We construct large caps in projective spaces of small dimension (up to 11) defined over fields of or...
In this paper, we consider new results on (k, n)-caps with n > 2. We provide a lower bound on the si...
In this paper, we consider new results on (k, n)-caps with n > 2. We provide a lower bound on the si...
In this paper, we consider new results on (k, n)-caps with n > 2. We provide a lower bound on the si...
We construct caps in projective 4-space PG(4, q) in odd characteristic, whose cardinality is O(5/2q2...
AbstractWe construct caps in projective 4-space PG(4, q) in odd characteristic, whose cardinality is...
A family of caps constructed by Ebert, Metsch and T. Szonyi [8] results from projecting a Veronesian...
AbstractA cap in a projective or affine geometry is a set of points with the property that no line m...
AbstractOne of the crucial problem about caps is to determine the spectrum of the values of k for wh...
AbstractThis article presents cyclic and elementary abelian caps in projective spaces. Different cla...
In this work complete caps in PG(N, q) of size O(q(N-1/2) log(300) q) are obtained by probabilistic ...
AbstractA family of caps constructed by G. L. Ebert, K. Metsch and T. Szönyi results from projecting...
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