Classification of toric manifolds over an n-cube with one vertex cut

Abstract

We say that a complete nonsingular toric variety (called a toric manifold in this paper) is over P if its quotient by the compact torus is homeomorphic to P as a manifold with corners. Bott manifolds (or Bott towers) are toric manifolds over an n-cube In and blowing them up at a fixed point produces toric manifolds over vc(In) an n-cube with one vertex cut. They are all projective. On the other hand, Oda's 3-fold, the simplest non-projective toric manifold, is over vc(In). In this paper, we classify toric manifolds over vc(In) (n 3) as varieties and also as smooth manifolds. As a consequence, it turns out that (1) there are many non-projective toric manifolds over vc(In) but they are all diffeomorphic, and (2) toric manifolds over vc(In) in some class are determined by their cohomology rings as varieties among toric manifolds.