On the Yau‐Tian‐Donaldson Conjecture for Generalized Kähler‐Ricci Soliton Equations
On the Yau‐Tian‐Donaldson Conjecture for Generalized Kähler‐Ricci Soliton Equations
Abstract Let (X,D) be a polarized log variety with an effective holomorphic torus action, and Θ be a closed positive torus invariant (1,1) ‐current. For any smooth positive function g defined on the moment polytope of the torus action, we study the Monge‐Ampère equations that correspond to generalized and twisted …