English

Action-angle and complex coordinates on toric manifolds

Symplectic Geometry 2021-03-17 v1

Abstract

In this article, we provide an exposition about symplectic toric manifolds, which are symplectic manifolds (M2n,ω)(M^{2n}, \omega) equipped with an effective Hamiltonian Tn(S1)n\mathbb{T}^n\cong (S^1)^n-action. We summarize the construction of MM as a symplectic quotient of Cd\mathbb{C}^d, the Tn\mathbb{T}^n-actions on MM and their moment maps, and Guillemin's K\"ahler potential on MM. 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 KMK_M, which is one of our main running examples, along with the complex projective space Pn\mathbb{P}^n and its canonical bundle KPnK_{\mathbb{P}^n}. One main topic explored in this article is how to write the moment map in terms of the complex homogeneous coordinates zCdz\in \mathbb{C}^d, 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 KMK_M provides a prototypical class of examples of a Calabi-Yau toric manifold YY which serves as the total space of a symplectic fibration W:YCW: Y \to \mathbb{C} with a singular fiber above 00, known as a Landau-Ginzburg model in mirror symmetry. Here we write WW 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].

Keywords

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

R2 v1 2026-06-24T00:12:23.298Z