Primitive decomposition of Bott-Chern and Dolbeault harmonic (k,k)-forms on compact almost K\"ahler manifolds

Abstract

We consider the primitive decomposition of ∂, ∂, Bott-Chern and Aeppli-harmonic (k,k)-forms on compact almost K\"ahler manifolds (M,J,ω). For any D ∈ \∂, ∂, BC, A\, we prove that the Lk P0 component of ∈ HDk,k, is a constant multiple of ωk. Focusing on dimension 8, we give a full description of the spaces HBC2,2 and HA2,2, from which follows H2,2BC⊂eqH2,2∂ and H2,2A⊂eqH2,2∂. We also provide an almost K\"ahler 8-dimensional example where the previous inclusions are strict and the primitive components of an harmonic form ∈ HDk,k are not D-harmonic, showing that the primitive decomposition of (k,k)-forms in general does not descend to harmonic forms.