Canonical blow-ups of Grassmann manifolds

Abstract

We introduce certain canonical blow-ups Ts,p,n, as well as their distinct submanifolds Ms,p,n, of Grassmann manifolds G(p,n) by partitioning the Pl\"ucker coordinates with respect to a parameter s. Various geometric aspects of Ts,p,n and Ms,p,n are studied, for instance, the smoothness, the holomorphic symmetries, the (semi-)positivity of the anti-canonical bundles, the existence of K\"ahler-Einstein metrics, the functoriality, etc. In particular, we introduce the notion of homeward compactification, of which Ts,p,n are examples, as a generalization of the wonderful compactification. Lastly, a generalization of Ts,p,n according to vector-valued parameters s is given, and open questions are raised.