Add to ORKGBy using the theory of D-modules we express the characteristic cycle of a local cohomology module supported on a monomial ideal in terms of conormal bundles relative to a subvariety. As a consequence we can decide when a given local cohomology module vanishes and compute the cohomological dimension in terms of the minimal primary decomposition. We can also give a Cohen-Macualayness criterion for the quotient of a polynomial ring by a monomial ideal and compute its Lyubeznik numbers
AbstractIn this paper we consider the local cohomology of monomial ideals with respect to monomial p...
AbstractLet a denote an ideal of a local ring (R,m). Let M be a finitely generated R-module. There i...
AbstractWe consider a finitely generated graded module M over a standard graded commutative Noetheri...
By using the theory of D-modules we express the characteristic cycle of a local cohomology module su...
AbstractWe study, by using the theory of algebraic D-modules, the local cohomology modules supported...
We study, by using the theory of algebraic $\cD$-modules, the local cohomology modules supported on ...
AbstractLet R=k[x1,…,xn] be the polynomial ring in n independent variables, where k is a field of ch...
Sigui R l'anell de polinomis amb coeficients en un cos k de característica zero. El nostre objectiu ...
Abstract. For a polynomial ring R = k[x1;:::; xn], we present a method to compute the characteristic...
AbstractWe give an explicit description of a certain high order local cohomology module with support...
These notes are an extended version of a set of lectures given at ”MONICA: MONomial Ideals, Computat...
AbstractFor a polynomial ring R=k[x1,…,xn], we present a method to compute the characteristic cycle ...
Abstract. These notes are an extended version of a set of lectures given at ”MON-ICA: MONomial Ideal...
AbstractIf R is a commutative Noetherian regular ring containing a field and I is an ideal of R, it ...
Let R be a Noetherian ring, I an ideal of R, and M a finitely generated R-module. The i-th local coh...
AbstractIn this paper we consider the local cohomology of monomial ideals with respect to monomial p...
AbstractLet a denote an ideal of a local ring (R,m). Let M be a finitely generated R-module. There i...
AbstractWe consider a finitely generated graded module M over a standard graded commutative Noetheri...
By using the theory of D-modules we express the characteristic cycle of a local cohomology module su...
AbstractWe study, by using the theory of algebraic D-modules, the local cohomology modules supported...
We study, by using the theory of algebraic $\cD$-modules, the local cohomology modules supported on ...
AbstractLet R=k[x1,…,xn] be the polynomial ring in n independent variables, where k is a field of ch...
Sigui R l'anell de polinomis amb coeficients en un cos k de característica zero. El nostre objectiu ...
Abstract. For a polynomial ring R = k[x1;:::; xn], we present a method to compute the characteristic...
AbstractWe give an explicit description of a certain high order local cohomology module with support...
These notes are an extended version of a set of lectures given at ”MONICA: MONomial Ideals, Computat...
AbstractFor a polynomial ring R=k[x1,…,xn], we present a method to compute the characteristic cycle ...
Abstract. These notes are an extended version of a set of lectures given at ”MON-ICA: MONomial Ideal...
AbstractIf R is a commutative Noetherian regular ring containing a field and I is an ideal of R, it ...
Let R be a Noetherian ring, I an ideal of R, and M a finitely generated R-module. The i-th local coh...
AbstractIn this paper we consider the local cohomology of monomial ideals with respect to monomial p...
AbstractLet a denote an ideal of a local ring (R,m). Let M be a finitely generated R-module. There i...
AbstractWe consider a finitely generated graded module M over a standard graded commutative Noetheri...