Nearly G2-manifolds and G2-Laplacian co-flows

Abstract

Nearly G2-structures define positive Einstein metrics in 7 dimensions and are critical points, up to scale, for a geometric flow of co-closed G2-structures with good analytic properties called the modified G2-Laplacian co-flow. We introduce a suitable normalization of this flow so that nearly G2-structures are stable under rescaling. However, we show that many nearly G2-structures are unstable for this flow: specifically, all those naturally arising from 3-Sasakian geometry. In particular, we demonstrate that the standard nearly G2-structure on the round 7-sphere is an unstable critical point with high index.