Deformations of Fano manifolds with weighted solitons

Abstract

We consider weighted solitons on Fano manifolds which include Kaehler-Ricci solitons, Mabuchi solitons and base metrics which induce Calabi-Yau cone metrics outside the zero sections of the canonical line bundles (Sasaki-Einstein metrics on the associated U(1)-bundles). In this paper, we give a condition for a weighted soliton on a Fano manifold M0 to extend to weighted solitons on small deformations Mt of the Fano manifold M0. More precisely, we show that all the members Mt of the Kuranishi family of a Fano manifold M0 with a weighted soliton have weighted solitons if and only if the dimensions of T-equivariant automorphism groups of Mt are equal to that of M0, and also if and only if the T-equivariant automorphism groups of Mt are all isomorphic to that of M0, where the weight functions are defined on the moment polytope of the Hamiltonian T-action. This generalizes a result of Cao-Sun-Yau-Zhang for Kaehler-Einstein metrics.