Filtered Perverse Complexes

P. Bressler; M. Saito; B. Youssin

Filtered Perverse Complexes

alg-geom 2008-02-03 v4 Algebraic Geometry

Authors: P. Bressler , M. Saito , B. Youssin

Abstract

We introduce the notion of filtered perversity of a filtered differential complex on a complex analytic manifold $X$ , without any assumptions of coherence, with the purpose of studying the connection between the pure Hodge modules and the \lt-complexes. We show that if a filtered differential complex $(\cM^\bullet,F_\bullet)$ is filtered perverse then $\aDR(\cM^\bullet,F_\bullet)$ is isomorphic to a filtered $\cD$ -module; a coherence assumption on the cohomology of $(\cM^\bullet,F_\bullet)$ implies that, in addition, this $\cD$ -module is holonomic. We show the converse: the de Rham complex of a holonomic Cohen-Macaulay filtered $\cD$ -module is filtered perverse.

Keywords

hodge theory cohomology theory module theory

Cite

@article{arxiv.alg-geom/9607020,
  title  = {Filtered Perverse Complexes},
  author = {P. Bressler and M. Saito and B. Youssin},
  journal= {arXiv preprint arXiv:alg-geom/9607020},
  year   = {2008}
}

Comments

AMSLaTeX v 1.1. This version is a major revision. With the new co-author (M.Saito) it contains substantially new results, improvements and corrections

Filtered Perverse Complexes

Abstract

Keywords

Cite

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