AbstractIn this paper we construct a large family of complete arcs. Letpbe a prime. For any integerksatisfyingthere exists a complete arc of sizekin PG(2,p)
Abstract We propose the concepts of almost complete subset of an elliptic quadric in ...
AbstractIn this paper it has been verified, by an exhaustive computer search, that in PG(2,25) the s...
In PG(2; q), the projective plane over the field Fq of q elements, a (k; n)-arc is a set K of k poin...
AbstractWe construct arcs in inversive planes of prime order p, and show that these arcs are complet...
AbstractIn this paper we prove that the set A = {k/q ∣there exists a complete k-arc in PG(2,q)} is d...
This thesis uses algebraic and combinatorial methods to study subsets of the Desarguesian plane IIq ...
AbstractAn approach to the computations of upper bounds on the size of large complete arcs is presen...
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 (Formula presented.) -arcs in projective planes over finite fields are the geometric counte...
We use arcs found by Storme and van Maldeghem in their classification of primitive arcs in ${\rm P...
AbstractIn this paper we construct a large family of complete arcs. Letpbe a prime. For any integerk...
AbstractIn [11], a new bound for the number of points on an algebraic curve over a finite field of o...
Complete (k, 4)-arcs in projective Galois planes are the geometric counterpart of linear non-ex...
AbstractNew upper bounds on the smallest size t2(2,q) of a complete arc in the projective plane PG(2...
AbstractLinear systems and their order sequences for an algebraic curve over a finite field are used...
Abstract We propose the concepts of almost complete subset of an elliptic quadric in ...
AbstractIn this paper it has been verified, by an exhaustive computer search, that in PG(2,25) the s...
In PG(2; q), the projective plane over the field Fq of q elements, a (k; n)-arc is a set K of k poin...
AbstractWe construct arcs in inversive planes of prime order p, and show that these arcs are complet...
AbstractIn this paper we prove that the set A = {k/q ∣there exists a complete k-arc in PG(2,q)} is d...
This thesis uses algebraic and combinatorial methods to study subsets of the Desarguesian plane IIq ...
AbstractAn approach to the computations of upper bounds on the size of large complete arcs is presen...
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 (Formula presented.) -arcs in projective planes over finite fields are the geometric counte...
We use arcs found by Storme and van Maldeghem in their classification of primitive arcs in ${\rm P...
AbstractIn this paper we construct a large family of complete arcs. Letpbe a prime. For any integerk...
AbstractIn [11], a new bound for the number of points on an algebraic curve over a finite field of o...
Complete (k, 4)-arcs in projective Galois planes are the geometric counterpart of linear non-ex...
AbstractNew upper bounds on the smallest size t2(2,q) of a complete arc in the projective plane PG(2...
AbstractLinear systems and their order sequences for an algebraic curve over a finite field are used...
Abstract We propose the concepts of almost complete subset of an elliptic quadric in ...
AbstractIn this paper it has been verified, by an exhaustive computer search, that in PG(2,25) the s...
In PG(2; q), the projective plane over the field Fq of q elements, a (k; n)-arc is a set K of k poin...
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