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Autore principale: Barlet, Daniel
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2510.20879
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author Barlet, Daniel
author_facet Barlet, Daniel
contents In this paper we introduce and study the ''convergent'' algebra (containing ''a'' and ''b'' and acting on holomorphic germs in ''a'') which naturally acts on the ''generalized Brieskorn modules'' associated to the Gauss-Manin connections of the germs at each point of the singular set of a holomorphic function on a complex manifold. We generalize to this convergent setting the results previously obtained (see 8], [9], [15] and [16]) in the formal case, and we show that, in suitable global situations (for instance when f is projective) we obtain also generalized (geometric) Brieskorn modules. So the question of the relationship between the left module structure on this algebra (which defines several interesting filtrations) and the mixte Hodge structure is raised
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publishDate 2025
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spellingShingle Generalized Brieskorn Modules III. The algebra $\tilde{\mathcal{A}}\_{conv.}$
Barlet, Daniel
Complex Variables
Algebraic Geometry
In this paper we introduce and study the ''convergent'' algebra (containing ''a'' and ''b'' and acting on holomorphic germs in ''a'') which naturally acts on the ''generalized Brieskorn modules'' associated to the Gauss-Manin connections of the germs at each point of the singular set of a holomorphic function on a complex manifold. We generalize to this convergent setting the results previously obtained (see 8], [9], [15] and [16]) in the formal case, and we show that, in suitable global situations (for instance when f is projective) we obtain also generalized (geometric) Brieskorn modules. So the question of the relationship between the left module structure on this algebra (which defines several interesting filtrations) and the mixte Hodge structure is raised
title Generalized Brieskorn Modules III. The algebra $\tilde{\mathcal{A}}\_{conv.}$
topic Complex Variables
Algebraic Geometry
url https://arxiv.org/abs/2510.20879