Considering polynomials over the Galois finite fields for two elements, our intention stand over the divisibility of the trinomials x^am+x^bs+1, for m>s ≥ 1, by an irreducible polynomial of degree r, for this, we contribute to the result :If there exist positive integers m, s such that the trinomial x^am+x^bs+1 is divisible by an irreducible polynomial of degree r over F2, then a and b are not divisible by (2^r- 1). For this type of trinomials we conjectured that the ratios πM(a,b)/ πM(1,1) tend to a finite limit (dependently of a and b) when M tend to infinity. Our research stand at sequel on the cyclic codes of rate 1/2 over the two finite fields F3 and F5 and we check our research over whose are isodual. The so-called fundamental pro...
JURY : Roland GILLARD (Université de Grenoble I) Président, Franck LEPRÉVOST (Université du Luxembou...
We generalize the notion of cyclic code and we construct codes as ideals in finite quotients of non-...
Nous abordons trois axes de la combinatoire algébrique et énumérative. Le premier concerne principal...
Considering polynomials over the Galois finite fields for two elements, our intention stand over ...
En considérant les polynômes sur le corps fini de Galois à deux éléments, notre intention porte sur ...
The focus of this paper is testing the irreducibility of polynomials over finite fields. In particul...
Divisibility of trinomials by given polynomials over finite fields has been studied and used to cons...
Cyclic codes are a subclass of linear codes and have applications in consumer electronics, data stor...
AbstractWe present some results about irreducible polynomials over finite fields and use them to pro...
AbstractLet Fq be the finite field with q elements of characteristic p, Fqm be the extension of degr...
AbstractAn equivalence relation called isometry is introduced to classify constacyclic codes over a ...
This paper surveys parts of the study of divisibility properties of codes. The survey begins with th...
Abstract. This paper surveys parts of the study of divisibility proper-ties of codes. The survey beg...
AbstractWe generalize a recent idea for constructing codes over a finite field Fq by evaluating a ce...
Let $\mathbb{F}_q$ be a finite field with $q$ elements and $n$ be a positive integer. In this paper,...
JURY : Roland GILLARD (Université de Grenoble I) Président, Franck LEPRÉVOST (Université du Luxembou...
We generalize the notion of cyclic code and we construct codes as ideals in finite quotients of non-...
Nous abordons trois axes de la combinatoire algébrique et énumérative. Le premier concerne principal...
Considering polynomials over the Galois finite fields for two elements, our intention stand over ...
En considérant les polynômes sur le corps fini de Galois à deux éléments, notre intention porte sur ...
The focus of this paper is testing the irreducibility of polynomials over finite fields. In particul...
Divisibility of trinomials by given polynomials over finite fields has been studied and used to cons...
Cyclic codes are a subclass of linear codes and have applications in consumer electronics, data stor...
AbstractWe present some results about irreducible polynomials over finite fields and use them to pro...
AbstractLet Fq be the finite field with q elements of characteristic p, Fqm be the extension of degr...
AbstractAn equivalence relation called isometry is introduced to classify constacyclic codes over a ...
This paper surveys parts of the study of divisibility properties of codes. The survey begins with th...
Abstract. This paper surveys parts of the study of divisibility proper-ties of codes. The survey beg...
AbstractWe generalize a recent idea for constructing codes over a finite field Fq by evaluating a ce...
Let $\mathbb{F}_q$ be a finite field with $q$ elements and $n$ be a positive integer. In this paper,...
JURY : Roland GILLARD (Université de Grenoble I) Président, Franck LEPRÉVOST (Université du Luxembou...
We generalize the notion of cyclic code and we construct codes as ideals in finite quotients of non-...
Nous abordons trois axes de la combinatoire algébrique et énumérative. Le premier concerne principal...