Uniform K-stability of polarized spherical varieties

[j -invariant] Let k be an algebraically closed field of characteristic different from 2

The criterion of these types of singularities for spherical varieties, is an easy consequence of the criterion of Cartier divisors of spherical varieties (Proposition 2.12) and

Si l'on envoie une lumière monochromatique, le réseau réfléchit plusieurs taches ; la direction de réflexion des taches dépend de la distance entre les traits et de la

operators defined on Cc~(G/K) through the spherical Fourier transform, co-ineides with the class of pseudo-differential operators on the manifold G/K, and, if so,

This analysis, combined with the Plancherel theorem for spherical functions on G/K and standard Tauberian theorems then yields the desired result.. I n his address

One can at this point formulate and prove m a n y theorems analogous to those of classical central limit theory, e.g., the theorems of Lindeberg-Feller on

But, since η preserves X, we can use the symmetry generator −η to generate a test configuration with the same central fibre X, and the Futaki invariant now is F (X, ζ, −η) = −F

Tian [Tia9] proved that there is a K¨ ahler-Einstein metric if and only if the K-energy is proper on the space of all K¨ ahler metrics in c 1 (X).. So the problem is how to test