AbstractGiven any linear code C over a finite field GF(q) we show how C can be described in a transparent and geometrical way by using the associated Bruen–Silverman code.Then, specializing to the case of MDS codes we use our new approach to offer improvements to the main results currently available concerning MDS extensions of linear MDS codes. We also sharply limit the possibilities for constructing long non-linear MDS codes. Our proofs make use of the connection between the work of Rédei [L. Rédei, Lacunary Polynomials over Finite Fields, North-Holland, Amsterdam, 1973. Translated from the German by I. Földes. [18]] and the Rédei blocking sets that was first pointed out over thirty years ago in [A.A. Bruen, B. Levinger, A theorem on perm...
Abstract. In this paper we prove that a set of points (in a projective space over a finite field of ...
AbstractIn this paper we prove that a set of points (in a projective space over a finite field of q ...
Determining the best possible values of the parameters of a linear code is one of the most fundament...
Given any linear code $C$ over a finite field $GF(q)$ we show how $C$ can be described in a transpar...
AbstractThe relation between complete arcs in a finite projective space and maximum distance separab...
Let C be a code of length k over an alphabet A of size q greather or equal 2. Having chosen m with 2...
We investigate the question when a cyclic code is maximum distance separable (MDS). For codes of (co...
Apart from being an interesting and exciting area in combinatorics with beautiful results, finite pr...
The aim of this thesis is to highlight once again how Geometry, and in particular Combinatorics, is ...
A linear [n, k]-code C is a k-dimensional subspace of V (n, q), where V (n, q) denotes the n-dimensi...
Complete (n, r)-arcs in P G(k − 1, q) and projective (n, k, n − r)q-codes that admit no projective e...
We consider linear error correcting codes associated to higher-dimensional projective varieties defi...
In this short note we state how we construct new good linear codes C over the finite field with q el...
Abstract: We prove that if there are consecutive gaps at a rational point on a smooth curve defined ...
AbstractThe relation between the extendability of linear codes over GF(q) having the minimum distanc...
Abstract. In this paper we prove that a set of points (in a projective space over a finite field of ...
AbstractIn this paper we prove that a set of points (in a projective space over a finite field of q ...
Determining the best possible values of the parameters of a linear code is one of the most fundament...
Given any linear code $C$ over a finite field $GF(q)$ we show how $C$ can be described in a transpar...
AbstractThe relation between complete arcs in a finite projective space and maximum distance separab...
Let C be a code of length k over an alphabet A of size q greather or equal 2. Having chosen m with 2...
We investigate the question when a cyclic code is maximum distance separable (MDS). For codes of (co...
Apart from being an interesting and exciting area in combinatorics with beautiful results, finite pr...
The aim of this thesis is to highlight once again how Geometry, and in particular Combinatorics, is ...
A linear [n, k]-code C is a k-dimensional subspace of V (n, q), where V (n, q) denotes the n-dimensi...
Complete (n, r)-arcs in P G(k − 1, q) and projective (n, k, n − r)q-codes that admit no projective e...
We consider linear error correcting codes associated to higher-dimensional projective varieties defi...
In this short note we state how we construct new good linear codes C over the finite field with q el...
Abstract: We prove that if there are consecutive gaps at a rational point on a smooth curve defined ...
AbstractThe relation between the extendability of linear codes over GF(q) having the minimum distanc...
Abstract. In this paper we prove that a set of points (in a projective space over a finite field of ...
AbstractIn this paper we prove that a set of points (in a projective space over a finite field of q ...
Determining the best possible values of the parameters of a linear code is one of the most fundament...