Stability of Calabi flow near an extremal metric

Abstract

We prove that on a K\"ahler manifold admitting an extremal metric ω and for any K\"ahler potential 0 close to ω, the Calabi flow starting at 0 exists for all time and the modified Calabi flow starting at 0 will always be close to ω. Furthermore, when the initial data is invariant under the maximal compact subgroup of the identity component of the reduced automorphism group, the modified Calabi flow converges to an extremal metric near ω exponentially fast.