The $G_2$ geometry of $3$-Sasaki structures

TL;DR

This paper explores the deformation theory of specific $G_2$ structures on 3-Sasaki manifolds, linking Einstein and $G_2$ deformations through eigenfunctions of the basic Laplacian, and identifies unobstructed deformations.

Contribution

It establishes a correspondence between Einstein and $G_2$ deformations on 3-Sasaki manifolds and characterizes unobstructed infinitesimal $G_2$ deformations.

Findings

Infinitesimal Einstein deformations coincide with $G_2$ deformations.

Deformations are parametrized by eigenfunctions of the basic Laplacian.

Certain infinitesimal $G_2$ deformations are unobstructed to second order.

Abstract

We initiate a systematic study of the deformation theory of the second Einstein metric $g_{1/\sqrt{5}}$ respectively the proper nearly $G_2$ structure $\varphi_{1/\sqrt{5}}$ of a $3$-Sasaki manifold $(M^7,g)$. We show that infinitesimal Einstein deformations for $g_{1/\sqrt{5}}$ coincide with infinitesimal $G_2$ deformations for $\varphi_{1/\sqrt{5}}$. The latter are showed to be parametrised by eigenfunctions of the basic Laplacian of $g$, with eigenvalue twice the Einstein constant of the base $4$-dimensional orbifold, via an explicit differential operator. In terms of this parametrisation we determine those infinitesimal $G_2$ deformations which are unobstructed to second order.