The Calabi-Yau equation for T2-bundles over T2: the non-Lagrangian case
Abstract
In the spirit of [10,2], we study the Calabi-Yau equation on T2-bundles over T2 endowed with an invariant non-Lagrangian almost-K\"ahler structure showing that for T2-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 M4 of an orientable T2-bundle over T2 endowed with an invariant almost-K\"ahler structure the Calabi-Yau problem has a solution for every normalized T2-invariant volume form.
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