The LB-cohomology on compact torsion-free G2 manifolds and an application to 'almost' formality

Abstract

We study a cohomology theory H, called the LB-cohomology, on compact torsion-free G2-manifolds. We show that Hk HkdR for k ≠ 3, 4, but that Hk is infinite-dimensional for k = 3,4. Nevertheless there is a canonical injection HkdR Hk. The LB-cohomology also satisfies a Poincar\'e duality induced by the Hodge star. The establishment of these results requires a delicate analysis of the interplay between the exterior derivative d and the derivation LB, and uses both Hodge theory and the special properties of G2-structures in an essential way. As an application of our results, we prove that compact torsion-free G2-manifolds are 'almost formal' in the sense that most of the Massey triple products necessarily must vanish.