A Spinorial Hopf Differential for Associative Submanifolds

Abstract

Given a CMC surface in R3, its traceless second fundamental form can be viewed as a holomorphic section called the Hopf differential. By analogy, we show that for an associative submanifold of a 7-manifold M7 with G2-structure, its traceless second fundamental form can be viewed as a twisted spinor. Moreover, if M is R7, T7, or S7 with the standard G2-structure, then this twisted spinor is harmonic. Consequently, every non-totally-geodesic associative 3-fold in R7, T7, and S7 admits non-vanishing harmonic twisted spinors. Analogous results hold for special Lagrangians in R6 and T6, coassociative 4-folds in R7 and T7, and Cayley 4-folds in R8 and T8.