Soliton-type metrics associated with weighted CSCK metrics on Fano manifolds

Abstract

We study weighted constant scalar curvature K\"ahler metrics, introduced by Lahdili as (v,w)-CSCK metrics, on Fano manifolds and their relationship with soliton-type metrics. In this paper, we introduce a weight function g(v,w) associated with a pair of weight functions (v,w). Assuming that v and g(v,w) are positive and log-concave on the moment polytope, we prove that the existence of a (v,w)-CSCK metric in the first Chern class is equivalent to the existence of a g(v,w)-soliton. We also explain that a g(v,w)-soliton arises naturally from Sasaki geometry. More precisely, let (v,w) be the weight functions defining a weighted CSCK metric in 2π c1(X) which gives rise to a -transverse extremal metric on an S1-bundle N in the canonical bundle of a Fano manifold X, where is a possibly irregular Reeb field on N. We prove that the associated g(v,w)-soliton on X gives rise to a -transverse Mabuchi soliton on N.