AbstractFor an essential, central hyperplane arrangement A⊆V≃kn+1 we show that Ω1(A) (the module of logarithmic one forms with poles along A) gives rise to a locally free sheaf on Pn if and only if, for all X∈LA with rank X<dimV, the module Ω1(AX) is free. Motivated by a result of L. Solomon and H. Terao (1987, Adv. Math.64, 305–325), we give a formula for the Chern polynomial of a bundle E on Pn in terms of the Hilbert series of ⊕m∈ZH0(Pn,∧iE(m)). As a corollary, we prove that if the sheaf associated to Ω1(A) is locally free, then π(A,t) is essentially the Chern polynomial. If Ω1(A) has projective dimension one and is locally free, we give a minimal free resolution for Ωp and show that ΛpΩ1(A)≃Ωp(A), generalizing results of L. Rose and H. ...
AbstractWe describe an algorithm deciding if the annihilating ideal of the meromorphic function 1f, ...
Let V be a smooth variety. A hypersurface arrangement in V is a union of smooth hypersurfaces, whic...
AbstractLet A be a commutative ring and M be a projective module of rank k with n generators. Let h=...
AbstractFor an essential, central hyperplane arrangement A⊆V≃kn+1 we show that Ω1(A) (the module of ...
Abstract. The Chern class of the sheaf of logarithmic derivations along a simple normal crossing div...
We study a generalized version of Terao's famous addition theorem for free arrangements to the categ...
For any odd $n$, we describe a smooth minimal (i.e. obtained by adding an irreducible hypersurface) ...
We define logarithmic tangent sheaves associated with complete intersections in connection with Jaco...
The theory of logarithmic vector fields and logarithmic differential forms along a reduced singular ...
This preprint is the same as a preprint with the same title in Arxiv . org, version V3We introduce a...
Let OX (resp. DX) be the sheaf of holomorphic functions (resp. the sheaf of linear differential ope...
Hyperplane Arrangements of rank $3$ admitting an unbalanced Ziegler restriction are known to fulfill...
Abstract Let A be a commutative ring and M be a projective module of rank k with n generators. Let h...
We introduce the notion of mixed-$\omega$-sheaves and use it for the study of a relative version of ...
The relationship between D-modules and free divisors has been studied in a general setting by L. Nar...
AbstractWe describe an algorithm deciding if the annihilating ideal of the meromorphic function 1f, ...
Let V be a smooth variety. A hypersurface arrangement in V is a union of smooth hypersurfaces, whic...
AbstractLet A be a commutative ring and M be a projective module of rank k with n generators. Let h=...
AbstractFor an essential, central hyperplane arrangement A⊆V≃kn+1 we show that Ω1(A) (the module of ...
Abstract. The Chern class of the sheaf of logarithmic derivations along a simple normal crossing div...
We study a generalized version of Terao's famous addition theorem for free arrangements to the categ...
For any odd $n$, we describe a smooth minimal (i.e. obtained by adding an irreducible hypersurface) ...
We define logarithmic tangent sheaves associated with complete intersections in connection with Jaco...
The theory of logarithmic vector fields and logarithmic differential forms along a reduced singular ...
This preprint is the same as a preprint with the same title in Arxiv . org, version V3We introduce a...
Let OX (resp. DX) be the sheaf of holomorphic functions (resp. the sheaf of linear differential ope...
Hyperplane Arrangements of rank $3$ admitting an unbalanced Ziegler restriction are known to fulfill...
Abstract Let A be a commutative ring and M be a projective module of rank k with n generators. Let h...
We introduce the notion of mixed-$\omega$-sheaves and use it for the study of a relative version of ...
The relationship between D-modules and free divisors has been studied in a general setting by L. Nar...
AbstractWe describe an algorithm deciding if the annihilating ideal of the meromorphic function 1f, ...
Let V be a smooth variety. A hypersurface arrangement in V is a union of smooth hypersurfaces, whic...
AbstractLet A be a commutative ring and M be a projective module of rank k with n generators. Let h=...