Generic vanishing, 1-forms, and topology of Albanese maps

Given a bounded constructible complex of sheaves F on a complex Abelian variety, we prove an equality relating the cohomology jump loci of F and its singular support. As an application, we identify two subsets of the set of holomorphic 1-forms with zeros on a complex smooth projective irregular vari...

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Bibliographic Details
Published in:Mathematische Zeitschrift 2024-03, Vol.306 (3), Article 56
Main Authors: Dutta, Yajnaseni, Hao, Feng, Liu, Yongqiang
Format: Article
Language:English
Subjects:
Equivalence
Homology
Mathematical analysis
Mathematics
Mathematics and Statistics
Sheaves
Subspaces
Topology
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Summary:Given a bounded constructible complex of sheaves F on a complex Abelian variety, we prove an equality relating the cohomology jump loci of F and its singular support. As an application, we identify two subsets of the set of holomorphic 1-forms with zeros on a complex smooth projective irregular variety X ; one from Green-Lazarsfeld’s cohomology jump loci and one from the Kashiwara’s estimates for singular supports. This result is related to Kotschick’s conjecture about the equivalence between the existence of nowhere vanishing global holomorphic 1-forms and the existence of a fibre bundle structure over the circle. Our results give a conjecturally equivalent formulation using singular support, which is equivalent to a criterion involving cohomology jump loci proposed by Schreieder. As another application, we reprove a recent result proved by Schreieder and Yang; namely if X has simple Albanese variety and admits a fibre bundle structure over the circle, then the Albanese morphism cohomologically behaves like a smooth morphism with respect to integer coefficients. In a related direction, we address the question whether the set of 1-forms that vanish somewhere is a finite union of linear subspaces of H 0 ( X , Ω X 1 ) . We show that this is indeed the case for forms admitting zero locus of codimension 1.
ISSN:0025-5874
1432-1823
DOI:10.1007/s00209-024-03438-3