Add to ORKGIn this paper, the classification of the (k,3)-arcs in PG(2,8) with respect to type of their lines has been obtained as well as the group of projectivities of the projectively distinct (k,3)-arcs are found. Furthermore all the complete (k,3)-arcs in PG(2,8) are investigated, also it was shown that PG(2,8) has no maximum arc
AbstractWe show that a complete arc K in the projective plane PG(2, q) admitting a transitive primit...
AbstractIn this paper we construct a large family of complete arcs. Letpbe a prime. For any integerk...
AbstractNew upper bounds on the smallest size t2(2,q) of a complete arc in the projective plane PG(2...
AbstractIn this paper we determine the largest size of a complete (n,3)-arc in PG(2,11). By a comput...
In this work, we construct complete (k,n)-arcs and we find some of them are maximum for some n, 2 < ...
AbstractThis paper investigates the completeness of k-arcs in PG(n, q) q even. We determine all valu...
The purpose of this work is to find maximum (k, n)-arcs from maximum (k, 2)-arcs where n=3,4...
Complete (k, 3)-arcs in projective planes over finite fields are the geometric counterpart of linear...
AbstractA k-arc K of PG(2, q) is a set of k points no three of which are collinear. If q is even the...
Complete (k, 3)-arcs in projective planes over finite fields are the geometric counterpart of linear...
AbstractIn this paper we examine some properties of complete {;k; q};-arcs in projective planes of o...
AbstractIn this paper we improve the upper bound of the size of a small minimal blocking set in PG(2...
This paper examines subsets with at most n points on a line in the projective plane π q = PG(2, q). ...
AbstractA (k,r)-arc is a set of k points of a projective plane such that some r, but no r+1 of them,...
We prove that 15 is the maximal size of a 3-arc in the projective plane of order 8. 1 Introduction ...
AbstractWe show that a complete arc K in the projective plane PG(2, q) admitting a transitive primit...
AbstractIn this paper we construct a large family of complete arcs. Letpbe a prime. For any integerk...
AbstractNew upper bounds on the smallest size t2(2,q) of a complete arc in the projective plane PG(2...
AbstractIn this paper we determine the largest size of a complete (n,3)-arc in PG(2,11). By a comput...
In this work, we construct complete (k,n)-arcs and we find some of them are maximum for some n, 2 < ...
AbstractThis paper investigates the completeness of k-arcs in PG(n, q) q even. We determine all valu...
The purpose of this work is to find maximum (k, n)-arcs from maximum (k, 2)-arcs where n=3,4...
Complete (k, 3)-arcs in projective planes over finite fields are the geometric counterpart of linear...
AbstractA k-arc K of PG(2, q) is a set of k points no three of which are collinear. If q is even the...
Complete (k, 3)-arcs in projective planes over finite fields are the geometric counterpart of linear...
AbstractIn this paper we examine some properties of complete {;k; q};-arcs in projective planes of o...
AbstractIn this paper we improve the upper bound of the size of a small minimal blocking set in PG(2...
This paper examines subsets with at most n points on a line in the projective plane π q = PG(2, q). ...
AbstractA (k,r)-arc is a set of k points of a projective plane such that some r, but no r+1 of them,...
We prove that 15 is the maximal size of a 3-arc in the projective plane of order 8. 1 Introduction ...
AbstractWe show that a complete arc K in the projective plane PG(2, q) admitting a transitive primit...
AbstractIn this paper we construct a large family of complete arcs. Letpbe a prime. For any integerk...
AbstractNew upper bounds on the smallest size t2(2,q) of a complete arc in the projective plane PG(2...