Add to ORKGWe construct three infinite families of cyclic difference sets, using monomial hyperovals in a desarguesian projective plane of even order. These difference sets give rise to cyclic Hadamard designs, which have the same parameters as the designs of points and hyperplanes of a projective geometry over the field with two elements. Moreover, they are substructures of the Hadamard design that one can associate with a hyperoval in a projective plane of even order
This article aims to explore the algebraic structure of Hadamard propelinear codes, which are not ab...
A new definition for the dimension of a combinatorial t-(v,k,λ) design over a finite field is propos...
AbstractIt is known that the designs PGn-1(n,q) in some cases have spreads of maximal α-arcs. Here a...
Hadamard designs which can be associated with a hyperoval of a projective plane of even order are in...
This paper formalizes the method of generating projective planes using difference sets. It establis...
AbstractAdditive Hadamard cocycles are a natural generalization of presemifields. In this paper, we ...
Supplementary difference sets and optimal designs D-optimal designs of order n = 2v ≡ 2 (mod 4), whe...
AbstractThis paper locates cocyclic Hadamard matrices within the mainstream of combinatorial design ...
AbstractIn this article we show that projective planes with a small collineation group of perspectiv...
AbstractD-optimal designs of order n = 2 v ≡ 2 (mod 4), where q is a prime power and v = q2 + q + 1 ...
The existence of certain monomial hyperovals D(xk) in the finite Desarguesian projective plane PG(2,...
AbstractRecent progress in the study of hyperovals in Desarguesian planes of even order has been rap...
In each of the three projective planes coordinatized by the Knuth's binary semifield K_n of order 2n...
AbstractUsing a spread ofPG(3, p) and certain projective two-weight codes, we give a general constru...
A bound on the 2-rank of an affine designs obtained from a Hadamard design with a line spread via Ra...
This article aims to explore the algebraic structure of Hadamard propelinear codes, which are not ab...
A new definition for the dimension of a combinatorial t-(v,k,λ) design over a finite field is propos...
AbstractIt is known that the designs PGn-1(n,q) in some cases have spreads of maximal α-arcs. Here a...
Hadamard designs which can be associated with a hyperoval of a projective plane of even order are in...
This paper formalizes the method of generating projective planes using difference sets. It establis...
AbstractAdditive Hadamard cocycles are a natural generalization of presemifields. In this paper, we ...
Supplementary difference sets and optimal designs D-optimal designs of order n = 2v ≡ 2 (mod 4), whe...
AbstractThis paper locates cocyclic Hadamard matrices within the mainstream of combinatorial design ...
AbstractIn this article we show that projective planes with a small collineation group of perspectiv...
AbstractD-optimal designs of order n = 2 v ≡ 2 (mod 4), where q is a prime power and v = q2 + q + 1 ...
The existence of certain monomial hyperovals D(xk) in the finite Desarguesian projective plane PG(2,...
AbstractRecent progress in the study of hyperovals in Desarguesian planes of even order has been rap...
In each of the three projective planes coordinatized by the Knuth's binary semifield K_n of order 2n...
AbstractUsing a spread ofPG(3, p) and certain projective two-weight codes, we give a general constru...
A bound on the 2-rank of an affine designs obtained from a Hadamard design with a line spread via Ra...
This article aims to explore the algebraic structure of Hadamard propelinear codes, which are not ab...
A new definition for the dimension of a combinatorial t-(v,k,λ) design over a finite field is propos...
AbstractIt is known that the designs PGn-1(n,q) in some cases have spreads of maximal α-arcs. Here a...