Canonical metrics on holomorphic Courant algebroids

Abstract

The solution of the Calabi Conjecture by Yau implies that every K\"ahler Calabi-Yau manifold X admits a metric with holonomy contained in SU(n), and that these metrics are parametrized by the positive cone in H1,1(X,R). In this work we give evidence of an extension of Yau's theorem to non-K\"ahler manifolds, where X is replaced by a compact complex manifold with vanishing first Chern class endowed with a holomorphic Courant algebroid Q of Bott-Chern type. The equations that define our notion of best metric correspond to a mild generalization of the Hull-Strominger system, whereas the role of H1,1(X,R) is played by an affine space of 'Aeppli classes' naturally associated to Q via Bott-Chern secondary characteristic classes.