Action-angle and complex coordinates on toric manifolds
Abstract
In this article, we provide an exposition about symplectic toric manifolds, which are symplectic manifolds equipped with an effective Hamiltonian -action. We summarize the construction of as a symplectic quotient of , the -actions on and their moment maps, and Guillemin's K\"ahler potential on . While the theories presented in this paper are for compact toric manifolds, they do carry over for some noncompact examples as well, such as the canonical line bundle , which is one of our main running examples, along with the complex projective space and its canonical bundle . One main topic explored in this article is how to write the moment map in terms of the complex homogeneous coordinates , or equivalently, the relationship between the action-angle coordinates and the complex toric coordinates. We end with a brief review of homological mirror symmetry for toric geometries, where the main connection with the rest of the paper is that provides a prototypical class of examples of a Calabi-Yau toric manifold which serves as the total space of a symplectic fibration with a singular fiber above , known as a Landau-Ginzburg model in mirror symmetry. Here we write in terms of the action-angle coordinates, which will prove to be useful in understanding the geometry of the fibration in our forthcoming work [ACLL].
Cite
@article{arxiv.2103.08714,
title = {Action-angle and complex coordinates on toric manifolds},
author = {Haniya Azam and Catherine Cannizzo and Heather Lee},
journal= {arXiv preprint arXiv:2103.08714},
year = {2021}
}
Comments
39 pages, 2 figures, to be published in the Proceedings of the 2019 Research Collaboration Conference for Women in Symplectic and Contact Geometry and Topology (WiSCon) Workshop