Add to ORKGThis thesis gives a proof for the maximal rank of the zeroth cohomology of the cotangent bundle on the projective space of dimension four evaluated at s general points. Which implies that one end of the minimal free resolution of the homogeneous ideal of these s general points in P^4 is attained.Dans cette these on a donne une prouve de rang maximal pour la cohomologie de la cotangent espace pour s points general dans espace projectif de dimension quatre. Cette a dire que l'ideal de cette points a la resolution minimal d' Anna Lorenzini
We study the minimal bigraded free resolution of an ideal with three generators of the same bidegree...
For an arithmetically Cohen-Macaulay subscheme of projective space, there is a well-known bound for ...
For an arithmetically Cohen-Macaulay subscheme of projective space, there is a well-known bound for ...
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...
Let A = k[X_0,..., X_n]/I be the homogeneous coordinate ring of s points in generic position in P^n....
The goal of this work is to study the minimal resolution of ideals of union of points in general pos...
Abstract. Let k an algebraically closed field and R the homogeneous coordinate ring of Pn and ΩPn th...
The Minimal Resolution Conjecture (MRC) for points on a projective varietyX ⊂ Pr predicts that the m...
Le théorème de Borel-Weil-Bott décrit la cohomologie des fibrés en droites sur les variétés de drape...
AbstractBy extending the ideal generation conjecture, we formulate the minimal resolution conjecture...
Given a finite set, X, of points in projective space for which the Hilbert function is known, a stan...
AbstractBy extending the ideal generation conjecture, we formulate the minimal resolution conjecture...
Given a finite set, X, of points in projective space for which the Hilbert function is known, a stan...
Mustaţǎ (1997) stated a generalized version of the minimal resolution conjecture for a set Z of gene...
We study the minimal bigraded free resolution of an ideal with three generators of the same bidegree...
For an arithmetically Cohen-Macaulay subscheme of projective space, there is a well-known bound for ...
For an arithmetically Cohen-Macaulay subscheme of projective space, there is a well-known bound for ...
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...
Let A = k[X_0,..., X_n]/I be the homogeneous coordinate ring of s points in generic position in P^n....
The goal of this work is to study the minimal resolution of ideals of union of points in general pos...
Abstract. Let k an algebraically closed field and R the homogeneous coordinate ring of Pn and ΩPn th...
The Minimal Resolution Conjecture (MRC) for points on a projective varietyX ⊂ Pr predicts that the m...
Le théorème de Borel-Weil-Bott décrit la cohomologie des fibrés en droites sur les variétés de drape...
AbstractBy extending the ideal generation conjecture, we formulate the minimal resolution conjecture...
Given a finite set, X, of points in projective space for which the Hilbert function is known, a stan...
AbstractBy extending the ideal generation conjecture, we formulate the minimal resolution conjecture...
Given a finite set, X, of points in projective space for which the Hilbert function is known, a stan...
Mustaţǎ (1997) stated a generalized version of the minimal resolution conjecture for a set Z of gene...
We study the minimal bigraded free resolution of an ideal with three generators of the same bidegree...
For an arithmetically Cohen-Macaulay subscheme of projective space, there is a well-known bound for ...
For an arithmetically Cohen-Macaulay subscheme of projective space, there is a well-known bound for ...