English

On the logarithmic comparison theorem for integrable logarithmic connections

Algebraic Geometry 2014-02-26 v3

Abstract

Let XX be a complex analytic manifold, DXD\subset X a free divisor with jacobian ideal of linear type (e.g. a locally quasi-homogeneous free divisor), j:U=XDXj: U=X-D \to X the corresponding open inclusion, EE an integrable logarithmic connection with respect to DD and LL the local system of the horizontal sections of EE on UU. In this paper we prove that the canonical morphisms between the logarithmic de Rham complex of E(kD)E(kD) and RjLR j_* L (resp. the logarithmic de Rham complex of E(kD)E(-kD) and j!Lj_!L) are isomorphisms in the derived category of sheaves of complex vector spaces for k0k\gg 0 (locally on XX)

Cite

@article{arxiv.math/0603003,
  title  = {On the logarithmic comparison theorem for integrable logarithmic connections},
  author = {F. J. Calderon-Moreno and L. Narvaez-Macarro},
  journal= {arXiv preprint arXiv:math/0603003},
  year   = {2014}
}

Comments

Terminology has changed: "linear jacobian type" instead of "commutative differential type"); no Koszul hypothesis is needed in theorem (2.1.1); minor changes. To appear in Proc. London Math. Soc