Holonomy rigidity for Ricci-flat metrics
Abstract
On a closed connected oriented manifold M we study the space M\|(M) of all Riemannian metrics which admit a non-zero parallel spinor on the universal covering. Such metrics are Ricci-flat, and all known Ricci-flat metrics are of this form. We show the following: The space M\|(M) is a smooth submanifold of the space of all metrics, and its premoduli space is a smooth finite-dimensional manifold. The holonomy group is locally constant on M\|(M). If M is spin, then the dimension of the space of parallel spinors is a locally constant function on M\|(M).
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