A variational characterization of calibrated submanifolds

Abstract

Let M be a fixed compact oriented embedded submanifold of a manifold M. Consider the volume V (g) = ∫M vol(M, g) as a functional of the ambient metric g on M, where g = g|M. We show that g is a critical point of V with respect to a special class of variations of g, obtained by varying a calibration μ on M in a particular way, if and only if M is calibrated by μ. We do not assume that the calibration is closed. We prove this for almost complex, associative, coassociative, and Cayley calibrations, generalizing earlier work of Arezzo-Sun in the almost K\"ahler case. The Cayley case turns out to be particularly interesting, as it behaves quite differently from the others. We also apply these results to obtain a variational characterization of Smith maps.