Pluripotential theory and special holonomy, I: Hodge decompositions and ∂∂ lemmata

Abstract

Let M be a compact torsion-free G2 7-manifold or Calabi-Yau 6-manifold. We prove Hodge decomposition theorems for the ddφ operators, introduced by Harvey and Lawson, which generalize the i∂∂ operator used in classical pluripotential theory. We then obtain analogues of the ∂∂ lemma in this context. We formalize this by defining cohomology spaces analogous to Bott-Chern cohomology and we relate them to harmonic forms on M. In the G2 case we provide a geometric interpretation of the corresponding cohomology classes in terms of coassociative submanifolds and gerbes: this is analogous to the classical interpretation of Bott-Chern cohomology classes in terms of divisors and holomorphic line bundles.