AbstractAll bounds of Bruen, Thas, and Blokhuis in [Invent. Math. 92 (1988), 441–459] are considerably improved: we show that 3q> may be replaced by √q2 + 34
AbstractIn PG(2, q) with q odd it is possible to construct two classes of complete (k, n)-arcs for w...
AbstractIn [11], a new bound for the number of points on an algebraic curve over a finite field of o...
Complete (Formula presented.) -arcs in projective planes over finite fields are the geometric counte...
AbstractThe relation between complete arcs in a finite projective space and maximum distance separab...
AbstractTwo results are proved: (1) In PG(3, q), q = 2h, h ⩾ 3, every q3-arc can be uniquely complet...
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...
A normal rational curve of the (k - 1)- dimensional projective space over F-q is an arc of size q+1,...
A normal rational curve of the (k - 1)- dimensional projective space over F-q is an arc of size q+1,...
A normal rational curve of the (k - 1)- dimensional projective space over F-q is an arc of size q+1,...
AbstractWe study the relation between k-arcs and dual k-arcs. In particular, we look at the (q+2)-ar...
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...
AbstractThis article reviews some of the principal and recently-discovered lower and upper bounds on...
Complete (k, 4)-arcs in projective Galois planes are the geometric counterpart of linear non-ex...
AbstractAll bounds of Bruen, Thas, and Blokhuis in [Invent. Math. 92 (1988), 441–459] are considerab...
AbstractIn this paper, we present several new complete (N,d)-arcs obtained from Fq-rational points o...
AbstractIn PG(2, q) with q odd it is possible to construct two classes of complete (k, n)-arcs for w...
AbstractIn [11], a new bound for the number of points on an algebraic curve over a finite field of o...
Complete (Formula presented.) -arcs in projective planes over finite fields are the geometric counte...
AbstractThe relation between complete arcs in a finite projective space and maximum distance separab...
AbstractTwo results are proved: (1) In PG(3, q), q = 2h, h ⩾ 3, every q3-arc can be uniquely complet...
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...
A normal rational curve of the (k - 1)- dimensional projective space over F-q is an arc of size q+1,...
A normal rational curve of the (k - 1)- dimensional projective space over F-q is an arc of size q+1,...
A normal rational curve of the (k - 1)- dimensional projective space over F-q is an arc of size q+1,...
AbstractWe study the relation between k-arcs and dual k-arcs. In particular, we look at the (q+2)-ar...
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...
AbstractThis article reviews some of the principal and recently-discovered lower and upper bounds on...
Complete (k, 4)-arcs in projective Galois planes are the geometric counterpart of linear non-ex...
AbstractAll bounds of Bruen, Thas, and Blokhuis in [Invent. Math. 92 (1988), 441–459] are considerab...
AbstractIn this paper, we present several new complete (N,d)-arcs obtained from Fq-rational points o...
AbstractIn PG(2, q) with q odd it is possible to construct two classes of complete (k, n)-arcs for w...
AbstractIn [11], a new bound for the number of points on an algebraic curve over a finite field of o...
Complete (Formula presented.) -arcs in projective planes over finite fields are the geometric counte...
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