English

Symplectic maps of complex domains into complex space forms

Symplectic Geometry 2009-11-13 v1 Differential Geometry

Abstract

Let M\complexnM\subset{\complex}^n be a complex domain of \complexn{\complex}^n endowed with a rotation invariant \K form ωΦ=i2ˉΦ\omega_{\Phi}= \frac{i}{2} \partial\bar\partial\Phi. In this paper we describe sufficient conditions on the \K potential Φ\Phi for (M,ωΦ)(M, \omega_{\Phi}) to admit a symplectic embedding (explicitely described in terms of Φ\Phi) into a complex space form of the same dimension of MM. In particular we also provide conditions on Φ\Phi for (M,ωΦ)(M, \omega_{\Phi}) to admit global symplectic coordinates. As an application of our results we prove that each of the Ricci flat (but not flat) \K forms on \complex2{\complex}^2 constructed by LeBrun (Taub-NUT metric) admits explicitely computable global symplectic coordinates.

Keywords

Cite

@article{arxiv.0803.3532,
  title  = {Symplectic maps of complex domains into complex space forms},
  author = {Andrea Loi and Fabio Zuddas},
  journal= {arXiv preprint arXiv:0803.3532},
  year   = {2009}
}

Comments

to appear in Journal of Geometry and Physics

R2 v1 2026-06-21T10:24:14.500Z