Add to ORKGA method of using polynomials to describe objects in finite geometries is outlined and the problems where this method has led to a solution are surveyed. These problems concern nuclei, affine blocking sets, maximal arcs and unitals. In the case of nuclei these methods give lower bounds on the number of nuclei to a set of points in PG(n, q), usually dependent on some binomial coefficient not vanishing modulo the characteristic of the field. These lower bounds on nuclei lead directly to lower bounds on affine blocking sets with respect to lines. A short description of how linear polynomials can be used to construct maximal arcs in certain translation planes is included. A proof of the non-existence of maximal arcs in PG(2, q) when q is odd is...
AbstractGeneralizing the norm and trace mappings for Fqr/Fq, we introduce an interesting class of po...
A lower bound on the minimum degree of the plane algebraic curves containing every point in a large ...
AbstractThis article reviews some of the principal and recently-discovered lower and upper bounds on...
A method of using polynomials to describe objects in finite geometries is outlined and the problems...
Summary A method of using polynomials to describe objects in finite geometries is outlined and the p...
It is illustrated how elementary properties of polynomials can be used to attack extremal problems i...
This article reviews some of the principal and recently-discovered lower and upper bounds on the max...
This paper examines subsets with at most n points on a line in the projective plane π q = PG(2, q). ...
A most efficient way of investigating combinatorially defined point sets in spaces over finite field...
This book provides a brief and accessible introduction to the theory of finite fields and to some of...
In the projective plane PG(2, q), upper bounds on the smallest size t(2)(2, q) of a complete arc are...
AbstractLinear spaces are investigated using the general theory of “Rings of Geometries I.” By defin...
This book explains some recent applications of the theory of polynomials and algebraic geometry to c...
The sporadic complete $12$-arc in $\mathrm{PG}(2,13)$ contains eight points from a conic. In $\mathr...
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...
AbstractGeneralizing the norm and trace mappings for Fqr/Fq, we introduce an interesting class of po...
A lower bound on the minimum degree of the plane algebraic curves containing every point in a large ...
AbstractThis article reviews some of the principal and recently-discovered lower and upper bounds on...
A method of using polynomials to describe objects in finite geometries is outlined and the problems...
Summary A method of using polynomials to describe objects in finite geometries is outlined and the p...
It is illustrated how elementary properties of polynomials can be used to attack extremal problems i...
This article reviews some of the principal and recently-discovered lower and upper bounds on the max...
This paper examines subsets with at most n points on a line in the projective plane π q = PG(2, q). ...
A most efficient way of investigating combinatorially defined point sets in spaces over finite field...
This book provides a brief and accessible introduction to the theory of finite fields and to some of...
In the projective plane PG(2, q), upper bounds on the smallest size t(2)(2, q) of a complete arc are...
AbstractLinear spaces are investigated using the general theory of “Rings of Geometries I.” By defin...
This book explains some recent applications of the theory of polynomials and algebraic geometry to c...
The sporadic complete $12$-arc in $\mathrm{PG}(2,13)$ contains eight points from a conic. In $\mathr...
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...
AbstractGeneralizing the norm and trace mappings for Fqr/Fq, we introduce an interesting class of po...
A lower bound on the minimum degree of the plane algebraic curves containing every point in a large ...
AbstractThis article reviews some of the principal and recently-discovered lower and upper bounds on...