On the Structure of Double Complexes
Abstract
We study consequences and applications of the folklore statement that every double complex over a field decomposes into so-called squares and zigzags. This result makes questions about the associated cohomology groups and spectral sequences easy to understand. We describe a notion of `universal' quasi-isomorphism, investigate the behaviour of the decomposition under tensor product and compute the Grothendieck ring of the category of bounded double complexes over a field with finite cohomologies up to such quasi-isomorphism (and some variants). Applying the theory to the double complexes of smooth complex valued forms on compact complex manifolds, we obtain a Poincar\'e duality for higher pages of the Fr\"olicher spectral sequence, construct a functorial three-space decomposition of the middle cohomology, give an example of a map between compact complex manifolds which does not respect the Hodge filtration strictly, compute the Bott-Chern and Aeppli cohomology for Calabi-Eckmann manifolds, introduce new numerical bimeromorphic invariants, show that the non-K\"ahlerness degrees are not bimeromorphic invariants in dimensions higher than three and that the -lemma and some related properties are bimeromorphic invariants if, and only if, they are stable under restriction to complex submanifolds.
Keywords
Cite
@article{arxiv.1812.00865,
title = {On the Structure of Double Complexes},
author = {Jonas Stelzig},
journal= {arXiv preprint arXiv:1812.00865},
year = {2021}
}
Comments
final version; to appear in J. London Math. Soc