The Weitzenb\"ock formula for the Fueter-Dirac operator

Abstract

We find Weitzenb\"ock formula for the Fueter-Dirac operator which controls the infinitesimal deformations of an associative submanifold in a 7--manifold with a G2--structure. We establish a vanishing theorem to conclude rigidity under some positivity assumptions on curvature, which are particularly mild in the nearly parallel case. As applications, we give a different proof of rigidity for one of Lotay's associatives in the round 7-sphere from those given by Kawai. We also provide simpler proofs of previous results by Gayet for the Bryant-Salamon metric. Finally, we obtain an original example of a rigid associative in a compact manifold with locally conformal calibrated G2-structure obtained by Fernandez-Fino-Raffero.