International audienceWe construct algebraic geometric codes from del Pezzo surfaces and focus on the ones having Picard rank one and the codes associated to the anticanonical class. We give explicit constructions of del Pezzo surfaces of degree 4, 5 and 6, compute the parameters of the associated anticanonical codes and study their isomorphisms arising from the automorphisms of the surface. We obtain codes with excellent parameters and some of them turn out to beat the best known codes listed on the database codetable
This thesis is devoted to the study of the geometry of complex projective manifolds with positive an...
In memory of Gilles Lachaud. This article has been submitted with an appendix by Alexander Schmidt p...
AbstractA del Pezzo surface of degree d over a field K is a smooth projective surface X over K such ...
International audienceWe construct algebraic geometric codes from del Pezzo surfaces and focus on th...
International audienceIn the present article, we consider Algebraic Geometry codes on some rational ...
AbstractAlgebraic geometric codes (or AG codes) provide a way to correct errors that occur during th...
AbstractIn the present article, we consider Algebraic Geometry codes on some rational surfaces. The ...
AbstractIn this paper we construct some algebraic geometric error-correcting codes on surfaces whose...
Algebraic geometric codes (or AG codes) provide a way to correct errors that occur during the trans...
In this thesis we study the arithmetic of certain del Pezzo surfaces and K3 surfaces.We prove that a...
For a given algebraic variety $V$ defined over a finite field and a very ample divisor $D$ on $V$, w...
Algebraic geometric codes (or AG codes) provide a way to correct errors that occur during the transm...
A part of this thesis, at the interface between Computer Science and Mathematics, is dedicated to th...
This thesis is devoted to the study of the geometry of complex projective manifolds with positive an...
In memory of Gilles Lachaud. This article has been submitted with an appendix by Alexander Schmidt p...
AbstractA del Pezzo surface of degree d over a field K is a smooth projective surface X over K such ...
International audienceWe construct algebraic geometric codes from del Pezzo surfaces and focus on th...
International audienceIn the present article, we consider Algebraic Geometry codes on some rational ...
AbstractAlgebraic geometric codes (or AG codes) provide a way to correct errors that occur during th...
AbstractIn the present article, we consider Algebraic Geometry codes on some rational surfaces. The ...
AbstractIn this paper we construct some algebraic geometric error-correcting codes on surfaces whose...
Algebraic geometric codes (or AG codes) provide a way to correct errors that occur during the trans...
In this thesis we study the arithmetic of certain del Pezzo surfaces and K3 surfaces.We prove that a...
For a given algebraic variety $V$ defined over a finite field and a very ample divisor $D$ on $V$, w...
Algebraic geometric codes (or AG codes) provide a way to correct errors that occur during the transm...
A part of this thesis, at the interface between Computer Science and Mathematics, is dedicated to th...
This thesis is devoted to the study of the geometry of complex projective manifolds with positive an...
In memory of Gilles Lachaud. This article has been submitted with an appendix by Alexander Schmidt p...
AbstractA del Pezzo surface of degree d over a field K is a smooth projective surface X over K such ...