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Auteur principal: Chen, Victor
Format: Preprint
Publié: 2026
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Accès en ligne:https://arxiv.org/abs/2603.20543
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author Chen, Victor
author_facet Chen, Victor
contents In this note, we explore various cohomological invariants on double complexes with the aim of finding their decomposition into irreducible parts, which are of square and zigzag shape. By studying the growth rate of the number of invariants given by the multiplicities of zigzags in the double complex of an n-dimensional complex manifold, we show that the De Rham, Dolbeault, Bott-Chern, Aeppli, and Varouchas cohomologies do not suffice to distinguish non-isomorphic double complexes. We also describe the zigzags counted by the Bigolin cohomology, and show how their dimensions are related to the multiplicities of odd zigzags. A special class of complex manifolds is given by the nilmanifolds. For a nilmanifold, the double complex of left-invariant forms is quasi-isomorphic to the double complex of differential forms. In dimension 6, we compute the double complex of forms of two nilmanifolds having the same Betti, Hodge and Bott-Chern numbers, but whose double complexes are non-isomorphic. We also compute the double complexes of a subclass of almost abelian nilmanifolds, which exist in any dimension.
format Preprint
id arxiv_https___arxiv_org_abs_2603_20543
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Computation of the multiplicities of zigzags
Chen, Victor
Differential Geometry
In this note, we explore various cohomological invariants on double complexes with the aim of finding their decomposition into irreducible parts, which are of square and zigzag shape. By studying the growth rate of the number of invariants given by the multiplicities of zigzags in the double complex of an n-dimensional complex manifold, we show that the De Rham, Dolbeault, Bott-Chern, Aeppli, and Varouchas cohomologies do not suffice to distinguish non-isomorphic double complexes. We also describe the zigzags counted by the Bigolin cohomology, and show how their dimensions are related to the multiplicities of odd zigzags. A special class of complex manifolds is given by the nilmanifolds. For a nilmanifold, the double complex of left-invariant forms is quasi-isomorphic to the double complex of differential forms. In dimension 6, we compute the double complex of forms of two nilmanifolds having the same Betti, Hodge and Bott-Chern numbers, but whose double complexes are non-isomorphic. We also compute the double complexes of a subclass of almost abelian nilmanifolds, which exist in any dimension.
title Computation of the multiplicities of zigzags
topic Differential Geometry
url https://arxiv.org/abs/2603.20543