A Kodaira type conjecture on almost complex 4 manifolds

Abstract

Not long ago, Cirici and Wilson defined a Dolbeault cohomology on almost complex manifolds to answer Hirzebruch's problem. In this paper, we define a refined Dolbeault cohomology on almost complex manifolds. We show that the condition h1,0= h0,1 implies a symplectic structure on a compact almost complex 4 manifold, where h1,0 and h0,1 are the dimensions of the refined Dolbeault cohomology groups with bi-degrees (1,0) and (0,1) respectively. Combining the partial answer to Donaldson's tameness conjecture, we offer a sufficient condition for a compact almost complex 4 manifold to become an almost K\"ahler one. Moreover, we prove that the condition h1,0= h0,1 is equivalent to the generalized ∂∂-lemma. This can be regarded as an analogue of the Kodaira's conjecture on almost complex 4 manifolds. As an application, we show that the Kodaira-Thurston manifold satisfies the ∂∂-lemma. Meanwhile, we show that the Fr\"olicher-type equality does not hold on a general almost complex 4 manifold, which is different to the case of compact complex surfaces.