Mixed Hodge Structures on Alexander Modules
Abstract
Motivated by the limit mixed Hodge structure on the Milnor fiber of a hypersurface singularity germ, we construct a natural mixed Hodge structure on the torsion part of the Alexander modules of a smooth connected complex algebraic variety. More precisely, let be a smooth connected complex algebraic variety and let be an algebraic map inducing an epimorphism in fundamental groups. The pullback of the universal cover of by gives rise to an infinite cyclic cover of . The action of the deck group on induces a -module structure on . We show that the torsion parts of the Alexander modules carry canonical -mixed Hodge structures. We also prove that the covering map induces a mixed Hodge structure morphism on the torsion parts of the Alexander modules. As applications, we investigate the semisimplicity of , as well as possible weights of the constructed mixed Hodge structures. Finally, in the case when is proper, we prove the semisimplicity and purity of , and we compare our mixed Hodge structure on with the limit mixed Hodge structure on the generic fiber of .
Keywords
Cite
@article{arxiv.2002.01589,
title = {Mixed Hodge Structures on Alexander Modules},
author = {Eva Elduque and Christian Geske and Moisés Herradón Cueto and Laurentiu Maxim and Botong Wang},
journal= {arXiv preprint arXiv:2002.01589},
year = {2022}
}
Comments
To appear in Memoirs of the American Mathematical Society. v4: Updated theorem numbering to match the version to be published. v3: completely rewritten and extended to include new results regarding relationships with other mixed Hodge structures, information about weights, semisimplicity, etc. 114 pages. Comments are very welcome