On the Yau-Tian-Donaldson conjecture for generalized K\"ahler-Ricci soliton equations

Abstract

Let (X, D) be a log variety with an effective holomorphic torus action, and be a closed positive (1,1)-current. For any smooth positive function g defined on the moment polytope of the torus action, we study the Monge-Amp\`ere equations that correspond to generalized and twisted K\"ahler-Ricci g-solitons. We prove a version of Yau-Tian-Donaldson (YTD) conjecture for these general equations, showing that the existence of solutions is always equivalent to an equivariantly uniform -twisted g-Ding-stability. When is a current associated to a torus invariant linear system, we further show that equivariant special test configurations suffice for testing the stability. Our results allow arbitrary klt singularities and generalize most of previous results on (uniform) YTD conjecture for (twisted) K\"ahler-Ricci/Mabuchi solitons or K\"ahler-Einstein metrics.