About the Calabi problem: a finite dimensional approach

Abstract

Let us consider a projective manifold and a volume form. We define the gradient flow associated to the problem of -balanced metrics in the quantum formalism, the -balacing flow. At the limit of the quantization, we prove that the -balacing flow converges towards a natural flow in K\"ahler geometry, the -K\"ahler flow. We study the existence of the $-K\"ahler flow and proves its long time existence and convergence towards the solution to the Calabi problem of prescribing the volume form in a given K\"ahler class. We derive some natural geometric consequences of our study.