Aeppli-Bott-Chern cohomology and Deligne cohomology from a viewpoint of Harvey-Lawson's spark complex

Abstract

By comparing Deligne complex and Aeppli-Bott-Chern complex, we construct a differential cohomology H*(X, *, *) that plays the role of Harvey-Lawson spark group H*(X, *), and a cohomology H*ABC(X; (*, *)) that plays the role of Deligne cohomology H*D(X; (*)) for every complex manifold X. They fit in the short exact sequence 0→ Hk+1ABC(X; (p, q)) → Hk(X, p, q) δ1→ Zk+1I(X, p, q) → 0 and H(X, , ) possess ring structure and refined Chern classes, acted by the complex conjugation, and if some primitive cohomology groups of X vanish, there is a Lefschetz isomorphism. Furthermore, the ring structure of HABC(X; (, )) inherited from H(X, , ) is compatible with the one of the analytic Deligne cohomology H(X; ()). We compute H*(X, *, *) for X the Iwasawa manifold and its small deformations and get a refinement of the classification given by Nakamura.