The G2 geometry of 3-Sasaki structures

Abstract

We initiate a systematic study of the deformation theory of the second Einstein metric g1/5 respectively the proper nearly G2 structure 1/5 of a 3-Sasaki manifold (M7,g). We show that infinitesimal Einstein deformations for g1/5 coincide with infinitesimal G2 deformations for 1/5. 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 G2 deformations which are unobstructed to second order.

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