Positivity on simple G-varieties

Abstract

Let X be a normal projective variety equipped with an action of a semisimple algebraic group G, and assume that X contains a unique closed orbit. Let B be a Borel subgroup of G and let E be a B-equivariant vector bundle on X. In this article, we prove that E is ample (respectively, nef) if and only if its restriction to the finite set of B-stable curves in X is ample (respectively, nef). Moreover, we compute the nef cone of the blow-up of a nonsingular simple G-projective variety X at a unique B-fixed point x-, referred to as the sink of X. As an application, when X is nonsingular, we calculate the Seshadri constants of any ample line bundle (not necessarily G-equivariant) at x-. In addition, we compute the Seshadri constants of B-equivariant vector bundles at x-.