Bott-Chern-Aeppli, Dolbeault and Frolicher on Compact Complex 3-folds

Abstract

We give the complete Bott-Chern-Aeppli cohomology for compact complex 3-folds in terms of Dolbeault, Frolicher, a bi-degree DeRham-like type of cohomology, Kp,q, defined as Kp,q=ker( ∂ ) ker( ∂) im( ∂ ) ker( ∂ )+im( ∂) ker( ∂ ) and H1(PH). (Here PH is the sheaf of phuri-harmonic functions.) We then work out the complete Bott-Chern-Aeppli cohomology in some examples. We give the Bott-Chern-Aeppli cohomology for a hypothetical complex structure on S6 in terms of Dolbeault and Frolicher. We also give the Bott-Chern-Aeppli cohomology on a Calabi-Eckman 3-fold concurring with the calculations of Angella and TomassiniAngellaAndTomassini. Finally, we show agreement of our results with the calculation by AngellaAngella of the Bott-Chern-Aeppli cohomology for small Kuranishi deformations of the Iwasawa manifold.