Volume forms on balanced manifolds and the Calabi-Yau equation

We introduce the space of mixed-volume forms endowed with an $L^2$ metric on a balanced manifold. A geodesic equation can be derived in this space that has an interesting structure and extends the equation of Donaldson \cite{Donaldson10} and Chen-He \cite{CH11} in the space of volume forms on a Riemannian manifold. This nonlinear PDE is studied in detail and the existence of weak solution is shown for the Dirichlet problem, under a positivity assumption. Later we study the Calabi-Yau equation for balanced metrics and introduce a geometric criteria for prescribing volume forms that is closely related to the positivity assumption above. We call this assumption the sub-Astheno-K\"ahler condition. By deriving $C^0$ a priori estimates, we show that the existence of solutions can be established on all sub-Astheno-K\"ahler manifolds.
Comment: Corrected minor errors, and added more details in the introduction