Invariant scalar-flat K\"ahler metrics on line bundles over generalized flag varieties

Abstract

Let G be a simply-connected semisimple compact Lie group, X a compact K\"ahler manifold homogeneous under G, and L a negative G-equivariant holomorphic line bundle over X. We prove that all G-invariant K\"ahler metrics on the total space of L arise from the Calabi ansatz. Using this, we then show that there exists a unique G-invariant scalar-flat K\"ahler metric in each K\"ahler class of L.