We construct a class of projective rational varieties X of any dimension m >= 1 which are smooth except at a point O, with the projective space P^m as normalization, having smooth branches and reduced projectivized tangent cone in O. The Hilbert function of X is considered and is explicitly computed when the point O is seminormal. Indeed, we study seminormality, obtaining necessary and sucient conditions for O to be seminormal and show that in such case the tangent cone is reduced and seminormal
Let A be the local ring,at a singular point P, of an algebraic variety V ⊂ Ar+1 of multi-k tiplicity...
This version contains some inaccuracies about centrality issues. A new version will appear soon.We d...
In this short note we show that for any pair of positive integers (d, n) with n > 2 and d > 1 or n =...
We construct a class of projective rational varieties X of any dimension m >= 1 which are smooth exc...
Abstract. On a polarized uniruled projective manifold we pick an irreducible component à of the Chow...
We study a class of rational curves with an ordinary singular point, which was introduced in [Gerami...
We study rational points on a smooth variety X over a complete local field K with algebraically clos...
28 pagesThe seminormalization of an algebraic variety $X$ is the biggest variety linked to $X$ by a ...
We develop a new general method for computing the decomposition type of the normal bundle to a proje...
In this paper we study 0-dimensional schemes Z made of \u201cfat points\u201d in P^n, n 65 2, whose...
For any smooth surface S, the Hilbert scheme S^[n] parameterizing 0-dimensional length-n subschemes ...
Abstract. The purpose of this paper is to present a new combinatorial criterion for rational smooth-...
AbstractIn this paper we study 0-dimensional schemes Z made of “fat points” in Pn, n≥2, whose suppor...
Survey paper on the theme of rationality and uniratioality in Algebraic Geometry. The contents foll...
Let Hd,g denote the Hilbert scheme of locally Cohen–Macaulay curves of degree d and genus g in proj...
Let A be the local ring,at a singular point P, of an algebraic variety V ⊂ Ar+1 of multi-k tiplicity...
This version contains some inaccuracies about centrality issues. A new version will appear soon.We d...
In this short note we show that for any pair of positive integers (d, n) with n > 2 and d > 1 or n =...
We construct a class of projective rational varieties X of any dimension m >= 1 which are smooth exc...
Abstract. On a polarized uniruled projective manifold we pick an irreducible component à of the Chow...
We study a class of rational curves with an ordinary singular point, which was introduced in [Gerami...
We study rational points on a smooth variety X over a complete local field K with algebraically clos...
28 pagesThe seminormalization of an algebraic variety $X$ is the biggest variety linked to $X$ by a ...
We develop a new general method for computing the decomposition type of the normal bundle to a proje...
In this paper we study 0-dimensional schemes Z made of \u201cfat points\u201d in P^n, n 65 2, whose...
For any smooth surface S, the Hilbert scheme S^[n] parameterizing 0-dimensional length-n subschemes ...
Abstract. The purpose of this paper is to present a new combinatorial criterion for rational smooth-...
AbstractIn this paper we study 0-dimensional schemes Z made of “fat points” in Pn, n≥2, whose suppor...
Survey paper on the theme of rationality and uniratioality in Algebraic Geometry. The contents foll...
Let Hd,g denote the Hilbert scheme of locally Cohen–Macaulay curves of degree d and genus g in proj...
Let A be the local ring,at a singular point P, of an algebraic variety V ⊂ Ar+1 of multi-k tiplicity...
This version contains some inaccuracies about centrality issues. A new version will appear soon.We d...
In this short note we show that for any pair of positive integers (d, n) with n > 2 and d > 1 or n =...