Four dimensional almost complex torus manifolds
Abstract
In dimension 4, we extend the correspondence between compact nonsingular toric varieties and regular fans to a correspondence between almost complex torus manifolds and families of multi-fans in a geometric way, where an (almost) complex torus manifold is a 2n-dimensional compact connected (almost) complex manifold equipped with an effective action of a real n-dimensional torus Tn that has fixed points. Let M be a 4-dimensional almost complex torus manifold. To M, we associate two equivalent combinatorial objects, a family of multi-fans and a graph , which encode the data on the fixed point set. We find a necessary and sufficient condition for each of and . Moreover, we provide a minimal model and operations for each of and . We introduce operations on a multi-fan and a graph that correspond to blow up and down of a manifold, and show that we can blow up and down M to a minimal manifold M' whose weights at the fixed points are unit vectors in Z2, to a family of minimal multi-fans that has unit vectors only, and to a minimal graph whose edges all have unit vectors as labels. As an application, if M is complex, is a fan and determines M, encodes the equivariant cohomology of M, and M' is CP1 × CP1. This implies that any two 4-dimensional complex torus manifolds are obtained from each other by equivariant blow up and down.
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