On moment map and bigness of tangent bundles of G-varieties

Abstract

Let G be a connected algebraic group and let X be a smooth projective G-variety. In this paper, we prove a sufficient criterion to determine the bigness of the tangent bundle TX using the moment map XG:T*X→ g*. As an application, the bigness of the tangent bundles of certain quasi-homogeneous varieties are verified, including symmetric varieties, horospherical varieties and equivariant compactifications of commutative linear algebraic groups. Finally, we study in details the Fano manifolds X with Picard number 1 which is an equivariant compactification of a vector group Gan. In particular, we will determine the pseudoeffective cone of P(T*X) and show that the image of the projectivised moment map along the boundary divisor D of X is projectively equivalent to the dual variety of the VMRT of X.