AbstractExamples of Zariski k-plets of rational curve arrangements are given for any k. We use dihedral covers to distinguish the embeddings of the curves in the plane
AbstractZariski chambers provide a natural decomposition of the big cone of an algebraic surface int...
Much success in finding rational points on curves has been obtained by using Chabauty's Theorem, whi...
We classify and study trigonal curves in Hirzebruch surfaces admitting dihedral Galois coverings. As...
AbstractExamples of Zariski k-plets of rational curve arrangements are given for any k. We use dihed...
In this paper, we introduce splitting numbers of subvarieties in a smooth complex variety for a Galo...
“garcia de galdeano” garcía de galdeano seminario matemáticon. 33 PRE-PUBLICACIONES del seminario ma...
We construct exponentially large collections of pairwise distinct equisingular deformation families ...
The splitting number of a plane irreducible curve for a Galois cover is effective in distinguishing ...
In this paper, we continue the study of the embedded topology of plane algebraic curves. We study th...
The splitting number is effective to distinguish the embedded topology of plane curves, and it is no...
The purpose of this paper is to exhibit infinite families of conjugate projective curves in a number...
AbstractArrangements of curves in the plane are fundamental to many problems in computational and co...
We shall discuss the idea of finding all rational points on a curve C by first finding an associated...
To any graph and smooth algebraic curve C, one may associate a “hypercurve” arrangement, and one can...
AbstractArrangements of curves in the plane are fundamental to many problems in computational and co...
AbstractZariski chambers provide a natural decomposition of the big cone of an algebraic surface int...
Much success in finding rational points on curves has been obtained by using Chabauty's Theorem, whi...
We classify and study trigonal curves in Hirzebruch surfaces admitting dihedral Galois coverings. As...
AbstractExamples of Zariski k-plets of rational curve arrangements are given for any k. We use dihed...
In this paper, we introduce splitting numbers of subvarieties in a smooth complex variety for a Galo...
“garcia de galdeano” garcía de galdeano seminario matemáticon. 33 PRE-PUBLICACIONES del seminario ma...
We construct exponentially large collections of pairwise distinct equisingular deformation families ...
The splitting number of a plane irreducible curve for a Galois cover is effective in distinguishing ...
In this paper, we continue the study of the embedded topology of plane algebraic curves. We study th...
The splitting number is effective to distinguish the embedded topology of plane curves, and it is no...
The purpose of this paper is to exhibit infinite families of conjugate projective curves in a number...
AbstractArrangements of curves in the plane are fundamental to many problems in computational and co...
We shall discuss the idea of finding all rational points on a curve C by first finding an associated...
To any graph and smooth algebraic curve C, one may associate a “hypercurve” arrangement, and one can...
AbstractArrangements of curves in the plane are fundamental to many problems in computational and co...
AbstractZariski chambers provide a natural decomposition of the big cone of an algebraic surface int...
Much success in finding rational points on curves has been obtained by using Chabauty's Theorem, whi...
We classify and study trigonal curves in Hirzebruch surfaces admitting dihedral Galois coverings. As...
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