Uniqueness of equivariant compactifications of Cn by a Fano manifold of Picard number 1

Abstract

Let X be an n-dimensional Fano manifold of Picard number 1. We study how many different ways X can compactify the complex vector group Cn equivariantly. Hassett and Tschinkel showed that when X = Pn with n ≥ 2, there are many distinct ways that X can be realized as equivariant compactifications of Cn. Our result says that projective space is an exception: among Fano manifolds of Picard number 1 with smooth VMRT, projective space is the only one compactifying Cn equivariantly in more than one ways. This answers questions raised by Hassett-Tschinkel and Arzhantsev-Sharoyko.