Cauchy spinors on 3-manifolds

Abstract

Let Z be a spin 4-manifold carrying a parallel spinor and M Z a hypersurface. The second fundamental form of the embedding induces a flat metric connection on TM. Such flat connections satisfy a non-elliptic, non-linear equation in terms of a symmetric 2-tensor on M. When M is compact and has positive scalar curvature, the linearized equation has finite dimensional kernel. Four families of solutions are known on the round 3-sphere S3. We study the linearized equation in the vicinity of these solutions and we construct as a byproduct an incomplete hyperk\"ahler metric on S3× R closely related to the Euclidean Taub-NUT metric on R4. On S3 there do not exist other solutions which either are constant in a left (or right) invariant frame, have three distinct constant eigenvalues, or are invariant in the direction of a left (or right)-invariant eigenvector. We deduce from this last result an extension of Liebmann's sphere rigidity theorem.

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