Publication date
January 1993
DOIAbstract
We show that a maximal partial spread inPG(3,q) is either a spread or has at most q2 + 1 - Ö{2q}q2+1-2qlines. This implies that it is not possible to cover all points but the points of a Baer-subspace by lines
We show that a maximal partial spread inPG(3,q) is either a spread or has at most q2 + 1 - Ö{2q}q2+1-2qlines. This implies that it is not possible to cover all points but the points of a Baer-subspace by lines
AbstractA partial t-spread in a projective space P is a set of mutually skew t-dimensional subspaces...
For n >= 9 , we construct maximal partial line spreads for non-singular quadrics of for every size b...
AbstractMaximal partial spreads in PG(3,q)q=pk,p odd prime and q⩾7, are constructed for any integer ...
We show that a maximal partial spread inPG(3,q) is either a spread or has at most q2 + 1 - Ö{2q}q2+1...
We prove the non-existence of maximal partial spreads of size 76 in PG(3,9). Relying on the classifi...
We prove the non-existence of maximal partial spreads of size 76 in PG(3, 9). Relying on the classif...
AbstractIn this paper, we show that the largest maximal partial spreads of the hermitian variety H(5...
AbstractWe settle an open case for the spectrum of sizes of maximal partial spreads in PG(3,q) by co...
AbstractWe prove that for any integer n in the interval (5q2+4q−1)8⩽n⩽q2−q+2 there is a maximal part...
AbstractA lower bound for the size of a maximal partial spread of H(2n+1,q2) is given. For H(2n+1,q2...
Some constructions of maximal partial spreads of finite classical polar spaces are provided. In part...
We classify the minimal blocking sets of size 15 in PG(2, 9). We show that the only examples are the...
AbstractWe prove that the deficiency δ of a non-trivial maximal partial spread in PG(3, q) is greate...
We classify the minimal blocking sets of size 15 in PG(2,9). We show that the only examples are the ...
We prove that in every finite Hermitian polar space of odd dimension and even maximal dimension rho ...
AbstractA partial t-spread in a projective space P is a set of mutually skew t-dimensional subspaces...
For n >= 9 , we construct maximal partial line spreads for non-singular quadrics of for every size b...
AbstractMaximal partial spreads in PG(3,q)q=pk,p odd prime and q⩾7, are constructed for any integer ...
We show that a maximal partial spread inPG(3,q) is either a spread or has at most q2 + 1 - Ö{2q}q2+1...
We prove the non-existence of maximal partial spreads of size 76 in PG(3,9). Relying on the classifi...
We prove the non-existence of maximal partial spreads of size 76 in PG(3, 9). Relying on the classif...
AbstractIn this paper, we show that the largest maximal partial spreads of the hermitian variety H(5...
AbstractWe settle an open case for the spectrum of sizes of maximal partial spreads in PG(3,q) by co...
AbstractWe prove that for any integer n in the interval (5q2+4q−1)8⩽n⩽q2−q+2 there is a maximal part...
AbstractA lower bound for the size of a maximal partial spread of H(2n+1,q2) is given. For H(2n+1,q2...
Some constructions of maximal partial spreads of finite classical polar spaces are provided. In part...
We classify the minimal blocking sets of size 15 in PG(2, 9). We show that the only examples are the...
AbstractWe prove that the deficiency δ of a non-trivial maximal partial spread in PG(3, q) is greate...
We classify the minimal blocking sets of size 15 in PG(2,9). We show that the only examples are the ...
We prove that in every finite Hermitian polar space of odd dimension and even maximal dimension rho ...
AbstractA partial t-spread in a projective space P is a set of mutually skew t-dimensional subspaces...
For n >= 9 , we construct maximal partial line spreads for non-singular quadrics of for every size b...
AbstractMaximal partial spreads in PG(3,q)q=pk,p odd prime and q⩾7, are constructed for any integer ...
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