The Calabi-Yau equation for T²-bundles over mathbb{T}²: the non-Lagrangian case

In the spirit of [10,2], we study the Calabi-Yau equation on $T^2$-bundles over $\mathbb{T}^2$ endowed with an invariant non-Lagrangian almost-K\"ahler structure showing that for $T^2$-invariant initial data it reduces to a Monge-Amp\`ere equation having a unique solution. In this way we prove that for every total space $M^4$ of an orientable $T^2$-bundle over $\mathbb{T}^2$ endowed with an invariant almost-K\"ahler structure the Calabi-Yau problem has a solution for every normalized $T^2$-invariant volume form.