On harmonic symmetries for locally conformally K\"ahler manifolds

Abstract

In this article, we study harmonic symmetries on the compact locally conformally K\"ahler manifold M of dimC=n. The space of harmonic symmetries is a subspace of harmonic differential forms which defined by the kernel of a certain Laplacian-type operator . We observe that the spaces ()l=\0\ for any |l-n|≥2 and ∂ Pk,n-1-k(iθ)(k,n-1-k), ∂ Pk,n-k(k,n-k). Furthermore, suppose that M is a Vaisman manifold, we prove that (i) α is (n-1)-form in () if only if α is a transversally harmonic and transversally effective V-foliate form; (ii) α is a (p,n-p)-form in (p,n-p) if only if there are two forms β1∈Sp-1,n-p and β2∈Sp,n-p-1 such that α=θ1,0β1+θ0,1β2.