Geometry and periods of G2-moduli spaces

Abstract

This paper is concerned with the geometry of the moduli space M of torsion-free G2-structures on a compact G2-manifold M, equipped with the volume-normalised L2-metric G. When b1(M) = 0, this metric is known to be of Hessian type and to admit a global potential. Here we give a new description of the geometry of M, based on the observation that there is a natural way to immerse the moduli space into a homogeneous space D diffeomorphic to GL(n+1)/ (\ 1\ × O(n)), where n = b3(M) - 1. We point out that the formal properties of this immersion : M → D are very similar to those of the period map defined on the moduli spaces of Calabi--Yau threefolds. With a view to understand the curvatures of G, we also derive a new formula for the fourth derivative of the potential and relate it to the second fundamental form of (M) ⊂ D.

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