The $\mathcal L_B$-cohomology on compact torsion-free $\mathrm{G}_2$ manifolds and an application to 'almost' formality

TL;DR

This paper introduces the $\

Contribution

It defines the $\\mathcal L_B$-cohomology on $\\mathrm{G}_2$-manifolds, analyzes its properties, and applies it to show these manifolds are 'almost formal' with vanishing Massey products.

Findings

$H^k_{\varphi} \cong H^k_{\mathrm{dR}}$ for $k \neq 3,4$

$H^k_{\varphi}$ is infinite-dimensional for $k=3,4$

Compact torsion-free $\mathrm{G}_2$-manifolds are 'almost formal'

Abstract

We study a cohomology theory $H^{\bullet}_{\varphi}$, called the $\mathcal L_B$-cohomology, on compact torsion-free $\mathrm{G}_2$-manifolds. We show that $H^k_{\varphi} \cong H^k_{\mathrm{dR}}$ for $k \neq 3, 4$, but that $H^k_{\varphi}$ is infinite-dimensional for $k = 3,4$. Nevertheless there is a canonical injection $H^k_{\mathrm{dR}} \to H^k_{\varphi}$. The $\mathcal L_B$-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 $\mathrm{d}$ and the derivation $\mathcal L_B$, and uses both Hodge theory and the special properties of $\mathrm{G}_2$-structures in an essential way. As an application of our results, we prove that compact torsion-free $\mathrm{G}_2$-manifolds are 'almost formal' in the sense that most of the Massey triple products necessarily must vanish.