Bott-Chern and ∂ Harmonic forms on Almost Hermitian 4-manifolds
Abstract
We prove that on a compact almost Hermitian 4-manifold the space of ∂-harmonic (1,1)-forms always has dimension h∂1,1 = b- +1 or b-, whilst the space of Bott-Chern harmonic (1,1)-forms always has dimension hBC1,1 = b- +1. We also perform calculations of h2,1BC and h1,2BC on the Kodaira-Thurston manifold, thereby providing a full account of when hp,qBC is or is not invariant of the choice of almost Hermitian metric. Finally, we introduce a decomposition of the space of L2 functions on all torus bundles over S1, which has proven useful for solving linear PDEs, and we demonstrate its use in the calculation of hp,q∂.
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