On Transition Functions of Topological Toric Manifolds
arXiv:1110.4527
Abstract
We show that any topological toric manifold can be covered by finitely many open charts so that all the transition functions between these charts are Laurent monomials of $z_j$'s and $\bar{z}_j$'s. In addition, we will describe toric manifolds and some special class of topological toric manifolds in terms of transition functions of charts up to (weakly) equivariant diffeomorphism.
16 pages, 1 figure. Some grammar problems are fixed