Parallel calibrations and minimal submanifolds

Abstract

Given a parallel calibration φ ∈ p(M) on a Riemannian manifold M, I prove that the φ--critical submanifolds with nonzero critical value are minimal submanifolds. I also show that the φ--critical submanifolds are precisely the integral manifolds of a C∞(M)--linear subspace ⊂ p(M). In particular, the calibrated submanifolds are necessarily integral submanifolds of the system. (Examples of parallel calibrations include the special Lagrangian calibration on Calabi-Yau manifolds, (co)associative calibrations on G2--manifolds, and the Cayley calibration on (7)--manifolds.)