K\"ahler metrics with constant weighted scalar curvature and weighted K-stability

Abstract

We introduce a notion of a K\"ahler metric with constant weighted scalar curvature on a compact K\"ahler manifold X, depending on a fixed real torus T in the reduced group of automorphisms of X, and two smooth (weight) functions v>0 and w, defined on the momentum image (with respect to a given K\"ahler class α on X) of X in the dual Lie algebra of T. A number of natural problems in K\"ahler geometry, such as the existence of extremal K\"ahler metrics and conformally K\"ahler, Einstein--Maxwell metrics, or prescribing the scalar curvature on a compact toric manifold reduce to the search of K\"ahler metrics with constant weighted scalar curvature in a given K\"ahler class α, for special choices of the weight functions v and w. We show that a number of known results obstructing the existence of constant scalar curvature K\"ahler (cscK) metrics can be extended to the weighted setting. In particular, we introduce a functional Mv, w on the space of T-invariant K\"ahler metrics in α, extending the Mabuchi energy in the cscK case, and show (following the arguments of Li and Sano--Tipler in the cscK and extremal cases) that if α is Hodge, then constant weighted scalar curvature metrics in α are minima of Mv,w. Motivated by the recent work of Dervan--Ross and Dyrefelt in the cscK and extremal cases, we define a (v,w)-weighted Futaki invariant of a T-compatible smooth K\"ahler test configuration associated to (X, α, T), and show that the boundedness from below of the (v,w)-weighted Mabuchi functional Mv, w implies a suitable notion of a (v,w)-weighted K-semistability.