The Walker Abel-Jacobi map descends
Algebraic Geometry
2021-09-06 v2
Abstract
For a complex projective manifold, Walker has defined a regular homomorphism lifting Griffiths' Abel-Jacobi map on algebraically trivial cycle classes to a complex abelian variety, which admits a finite homomorphism to the Griffiths intermediate Jacobian. Recently Suzuki gave an alternate, Hodge-theoretic, construction of this Walker Abel-Jacobi map. We provide a third construction based on a general lifting property for surjective regular homomorphisms, and prove that the Walker Abel-Jacobi map descends canonically to any field of definition of the complex projective manifold. In addition, we determine the image of the l-adic Bloch map restricted to algebraically trivial cycle classes in terms of the coniveau filtration.
Cite
@article{arxiv.2101.07506,
title = {The Walker Abel-Jacobi map descends},
author = {Jeff Achter and Sebastian Casalaina-Martin and Charles Vial},
journal= {arXiv preprint arXiv:2101.07506},
year = {2021}
}
Comments
17 pages