Add to ORKGThe goal of this work is to study the minimal resolution of ideals of union of points in general position in projective spaces. Carlos Simpson and André Hirschowitz reduce the problem to a maximal rank computation (that is surjectivity or injectivity) for the restriction morphisms $$ H^0(P^n,\wedge^k T_{P^n}(l))\to \wedge^k T_{P^n}(l)ı_{Z_1}\oplus\dots T_{P^n}(l)ı_{Z_s} $$ where $Z_1,\dots Z_z$ are points of $P^n$. They show that for a large number of points or equivalently for a degree $l$ large enough, one has the maximal rank property. They obtain this property, using la \m¶ethode d'Horace", from a certain number of maximal rank situations assumming maximal rank property for the situations in dimension 2 and 3. In this thesis the maximal...
We address the problem of computing the generators of the ideal of an irreducible parametric variet...
AbstractIn this paper we prove, using a refinement of Terracini's Lemma, a sharp lower bound for the...
Fix a linear subspace $V\subseteq \mathbb {P}^n$ and a linearly independent set $S\subset V$. Let $Z...
Given a finite set, X, of points in projective space for which the Hilbert function is known, a stan...
The Hilbert function of the union of n general e-fold points in the plane is maximal if n ≥ 4e² or n...
Given a finite set, X, of points in projective space for which the Hilbert function is known, a stan...
Given a finite set, X, of points in projective space for which the Hilbert function is known, a stan...
Given a finite set, X, of points in projective space for which the Hilbert function is known, a stan...
AbstractConsider a finite (t + r − 1)-dimensional projective space PG(t + r − 1, s) based on the Gal...
This thesis gives a proof for the maximal rank of the zeroth cohomology of the cotangent bundle on t...
This thesis gives a proof for the maximal rank of the zeroth cohomology of the cotangent bundle on t...
This thesis gives a proof for the maximal rank of the zeroth cohomology of the cotangent bundle on t...
AbstractLet K be a field of characteristic 0. Let Γ⊂PKn be a reduced finite set of points, not all c...
AbstractWe prove that general unions of singularity schemes of multiplicity two in the projective pl...
We address the problem of computing the generators of the ideal of an irreducible parametric variet...
We address the problem of computing the generators of the ideal of an irreducible parametric variet...
AbstractIn this paper we prove, using a refinement of Terracini's Lemma, a sharp lower bound for the...
Fix a linear subspace $V\subseteq \mathbb {P}^n$ and a linearly independent set $S\subset V$. Let $Z...
Given a finite set, X, of points in projective space for which the Hilbert function is known, a stan...
The Hilbert function of the union of n general e-fold points in the plane is maximal if n ≥ 4e² or n...
Given a finite set, X, of points in projective space for which the Hilbert function is known, a stan...
Given a finite set, X, of points in projective space for which the Hilbert function is known, a stan...
Given a finite set, X, of points in projective space for which the Hilbert function is known, a stan...
AbstractConsider a finite (t + r − 1)-dimensional projective space PG(t + r − 1, s) based on the Gal...
This thesis gives a proof for the maximal rank of the zeroth cohomology of the cotangent bundle on t...
This thesis gives a proof for the maximal rank of the zeroth cohomology of the cotangent bundle on t...
This thesis gives a proof for the maximal rank of the zeroth cohomology of the cotangent bundle on t...
AbstractLet K be a field of characteristic 0. Let Γ⊂PKn be a reduced finite set of points, not all c...
AbstractWe prove that general unions of singularity schemes of multiplicity two in the projective pl...
We address the problem of computing the generators of the ideal of an irreducible parametric variet...
We address the problem of computing the generators of the ideal of an irreducible parametric variet...
AbstractIn this paper we prove, using a refinement of Terracini's Lemma, a sharp lower bound for the...
Fix a linear subspace $V\subseteq \mathbb {P}^n$ and a linearly independent set $S\subset V$. Let $Z...