Higher-order Ricci estimates along immortal K\"ahler-Ricci flows

Abstract

We study higher-order curvature estimates along K\"ahler-Ricci flows on compact K\"ahler manifolds of intermediate Kodaira dimension. We prove that away from singular fibers, the Ricci curvature is uniformly bounded in C1, the Laplacian of the Ricci curvature in C0, and the scalar curvature in C2. We identify a geometric obstruction to higher-order curvature bounds, whose non-vanishing causes a specific third-order derivative of the Ricci curvature to blow up at rate et/2. Uniform Ck bounds for every k hold for the Ricci curvature in the isotrivial case, and for the full Riemann curvature in the torus-fibered case.

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