Weighted K-stability of Q-Fano spherical varieties

Abstract

Let G be a connected, complex reductive Lie group and X a Q-Fano G-spherical variety. In this paper we compute the weighed non-Archimedean functionals of a G-equivariant normal test configurations of X via combinatory data. Also we define a modified Futaki invariant with respect to the weight g, and give an expression in terms of intersection numbers. Finally we show the equivalence of different notations of stability and gives a stability criterion on Q-Fano spherical varieties, which is also a criterion of existence of K\"ahler-Ricci g-solitons.