On cohomological invariants of complex and almost complex manifolds

Given a compact complex manifold, we develop Hodge theory for the elliptic complex of differential forms defined by Bigolin in 1969 and recently referred as the Schweitzer complex. We exhibits several L² orthogonal decompositions of spaces of forms and prove a Hodge decomposition for harmonic forms on compact K\"ahler manifolds. Then we compute the cohomology of this complex on the small deformations of the complex structure of the Iwasawa manifold, showing that this cohomology is as powerful as Aeppli and Bott-Chern cohomology, in order to distinguish classes of complex structures. Finally, we partially extend the definition of this complex on almost complex manifolds, providing a new cohomological invariant on 1-forms which is finite dimensional when the manifold is compact.