Aeppli cohomology and Gauduchon metrics
Abstract
Let (M,J,g,ω) be a complete Hermitian manifold of complex dimension n2. Let 1 p n-1 and assume that ωn-p is (∂+∂)-bounded. We prove that, if is an L2 and d-closed (p,0)-form on M, then =0. In particular, if M is compact, we derive that if the Aeppli class of ωn-p vanishes, then Hp,0BC(M)=0. As a special case, if M admits a Gauduchon metric ω such that the Aeppli class of ωn-1 vanishes, then H1,0BC(M)=0.
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