Convergence of the calabi flow on toric varieties and related Kaehler manifolds

Abstract

Let X be a toric variety and u be a normalized symplectic potential of the corresponding polytope P. Suppose that the Riemannian curvature is bounded by 1 and ∫∂ P u ~ d σ < C1, then there exists a constant C2 depending only on C1 and P such that P u < C2. As an application, we show that if (X,P) is analytic uniform K-stable, then the modified Calabi flow converges to an extremal metric exponentially fast by assuming that the Riemannian curvature is uniformly bounded along the Calabi flow. Also we provide a proof of a conjecture of Donaldson. Finally, assuming that the curvature is bounded along the Calabi flow, our method would provide a proof of a conjecture due to Apostolov, Calderbank, Gauduchon and Tonnesen-Friedman.