Add to ORKGAn $(n, r)$-arc is a set of $n$ points of a projective plane such that some $r$, but no $r+1$ of them, are collinear. The maximumsize of an $(n, r)$-arc in $\PG(2,q)$ is denoted by $m_r(2,q)$. In this article a $(477, 18)$-arc, a $(596,22)$-arc, a $(697,25)$-arc in PG(2,29) and a $(598, 21)$-arc, a $(664, 23)$-arc, a $(699, 24)$-arc, a $(769, 26)$-arc, a $(838,28)$-arc in PG(2,31) are presented. The constructed arcs improve the respective lower bounds on $m_r(2,29)$ and $m_r(2,31)$ in \cite{MB2019}. As a consequence there exist eight new three-dimensional linear codes over the respective finite fields.\
In the projective plane PG(2, q), upper bounds on the smallest size t(2)(2, q) of a complete arc are...
In the projective plane PG(2, q), upper bounds on the smallest size t(2)(2, q) of a complete arc are...
This paper examines subsets with at most n points on a line in the projective plane π q = PG(2, q). ...
An $(n, r)$-arc is a set of $n$ points of a projective plane such that some $r$, but no $r+1$ of the...
An $(n, r)$-arc is a set of $n$ points of a projective plane such that some $r$, but no $r+1$ of the...
AbstractA (k,r)-arc is a set of k points of a projective plane such that some r, but no r+1 of them,...
This article reviews some of the principal and recently-discovered lower and upper bounds on the max...
AbstractThis article reviews some of the principal and recently-discovered lower and upper bounds on...
Abstract. An (n, r)-arc is a set of n points of a projective plane such that some r, but no r + 1 of...
We prove that 15 is the maximal size of a 3-arc in the projective plane of order 8. 1 Introduction ...
AbstractThis article reviews some of the principal and recently-discovered lower and upper bounds on...
AbstractA (k,n)-arc in the projective Hjelmslev plane PHG(RR3) is defined as a set of k points in th...
AbstractIn this paper we determine the largest size of a complete (n,3)-arc in PG(2,11). By a comput...
AbstractNew upper bounds on the smallest size t2(2,q) of a complete arc in the projective plane PG(2...
The purpose of this work is to find maximum (k, n)-arcs from maximum (k, 2)-arcs where n=3,4...
In the projective plane PG(2, q), upper bounds on the smallest size t(2)(2, q) of a complete arc are...
In the projective plane PG(2, q), upper bounds on the smallest size t(2)(2, q) of a complete arc are...
This paper examines subsets with at most n points on a line in the projective plane π q = PG(2, q). ...
An $(n, r)$-arc is a set of $n$ points of a projective plane such that some $r$, but no $r+1$ of the...
An $(n, r)$-arc is a set of $n$ points of a projective plane such that some $r$, but no $r+1$ of the...
AbstractA (k,r)-arc is a set of k points of a projective plane such that some r, but no r+1 of them,...
This article reviews some of the principal and recently-discovered lower and upper bounds on the max...
AbstractThis article reviews some of the principal and recently-discovered lower and upper bounds on...
Abstract. An (n, r)-arc is a set of n points of a projective plane such that some r, but no r + 1 of...
We prove that 15 is the maximal size of a 3-arc in the projective plane of order 8. 1 Introduction ...
AbstractThis article reviews some of the principal and recently-discovered lower and upper bounds on...
AbstractA (k,n)-arc in the projective Hjelmslev plane PHG(RR3) is defined as a set of k points in th...
AbstractIn this paper we determine the largest size of a complete (n,3)-arc in PG(2,11). By a comput...
AbstractNew upper bounds on the smallest size t2(2,q) of a complete arc in the projective plane PG(2...
The purpose of this work is to find maximum (k, n)-arcs from maximum (k, 2)-arcs where n=3,4...
In the projective plane PG(2, q), upper bounds on the smallest size t(2)(2, q) of a complete arc are...
In the projective plane PG(2, q), upper bounds on the smallest size t(2)(2, q) of a complete arc are...
This paper examines subsets with at most n points on a line in the projective plane π q = PG(2, q). ...