AbstractWe give a short proof of Rédei's result on the number of directions determined by a function f on a finite field and improve this result considerably, confirming one of his conjectures
Let L be a set of lines of an affine space over a field and let S be a set of points with the proper...
AbstractA three-dimensional analogue of the classical direction problem is proposed and an asymptoti...
We show that if the number of directions not determined by a pointset of , of size q2 is at least pe...
AbstractGiven a setUof sizeqin an affine plane of orderq, we determine the possibilities for the num...
We give a short proof of Rédei's result on the number of directions determined by a function f on a ...
R\'edei and Megyesi proved that the number of directions determined by a $p$ element subset of $\mat...
AbstractWe give a short proof of Rédei's result on the number of directions determined by a function...
In this article we prove a theorem about the number of direc- tions determined by less then q aff...
AbstractA proof is presented that shows that the number of directions determined by a function over ...
AbstractIn this paper the number of directions determined by a set ofq−npoints ofAG(2, q) is studied...
AbstractIt has been known for a long time that a p-element point set in AG(2,p), which is not a line...
Abstract. Some improved bounds on the number of directions not determined by a point set in the affi...
AbstractWe study minimal blocking sets inPG(2, q) havingq+mpoints outside some fixed line. If0<m<(q)...
The problem for which Rédei introduced the polynomial R(T , S) was that of determining those functio...
In this paper, we first determine the minimum possible size of an Fq-linear set of rank k in PG(1,qn...
Let L be a set of lines of an affine space over a field and let S be a set of points with the proper...
AbstractA three-dimensional analogue of the classical direction problem is proposed and an asymptoti...
We show that if the number of directions not determined by a pointset of , of size q2 is at least pe...
AbstractGiven a setUof sizeqin an affine plane of orderq, we determine the possibilities for the num...
We give a short proof of Rédei's result on the number of directions determined by a function f on a ...
R\'edei and Megyesi proved that the number of directions determined by a $p$ element subset of $\mat...
AbstractWe give a short proof of Rédei's result on the number of directions determined by a function...
In this article we prove a theorem about the number of direc- tions determined by less then q aff...
AbstractA proof is presented that shows that the number of directions determined by a function over ...
AbstractIn this paper the number of directions determined by a set ofq−npoints ofAG(2, q) is studied...
AbstractIt has been known for a long time that a p-element point set in AG(2,p), which is not a line...
Abstract. Some improved bounds on the number of directions not determined by a point set in the affi...
AbstractWe study minimal blocking sets inPG(2, q) havingq+mpoints outside some fixed line. If0<m<(q)...
The problem for which Rédei introduced the polynomial R(T , S) was that of determining those functio...
In this paper, we first determine the minimum possible size of an Fq-linear set of rank k in PG(1,qn...
Let L be a set of lines of an affine space over a field and let S be a set of points with the proper...
AbstractA three-dimensional analogue of the classical direction problem is proposed and an asymptoti...
We show that if the number of directions not determined by a pointset of , of size q2 is at least pe...
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