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
For an arithmetically Cohen-Macaulay subscheme of projective space, there is a well-known bound for ...
AbstractA long-standing problem in Algebraic Geometry and Commutative Algebra is to determine the mi...
We study the minimal bigraded free resolution of an ideal with three generators of the same bidegree...
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...
For an arithmetically Cohen-Macaulay subscheme of projective space, there is a well-known bound for ...
AbstractA long-standing problem in Algebraic Geometry and Commutative Algebra is to determine the mi...
We study the minimal bigraded free resolution of an ideal with three generators of the same bidegree...
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...
For an arithmetically Cohen-Macaulay subscheme of projective space, there is a well-known bound for ...
AbstractA long-standing problem in Algebraic Geometry and Commutative Algebra is to determine the mi...
We study the minimal bigraded free resolution of an ideal with three generators of the same bidegree...