English

Embedded surfaces for symplectic circle actions

Symplectic Geometry 2016-01-05 v2

Abstract

The purpose of this article is to characterize symplectic and Hamiltonian circle actions on symplectic manifolds in terms of symplectic embeddings of Riemann surfaces. More precisely, we will show that (1) if (M,ω)(M,\omega) admits a Hamiltonian S1S^1-action, then there exists an S1S^1-invariant symplectic 22-sphere SS in (M,ω)(M,\omega) such that c1(M),[S]>0\langle c_1(M), [S] \rangle > 0, and (2) if the action is non-Hamiltonian, then there exists an S1S^1-invariant symplectic 22-torus TT in (M,ω)(M,\omega) such that c1(M),[T]=0\langle c_1(M), [T] \rangle = 0. As applications, we will give a very simple proof of the following well-known theorem which was proved by Atiyah-Bott \cite{AB}, Lupton-Oprea \cite{LO}, and Ono \cite{O2} : suppose that (M,ω)(M,\omega) is a smooth closed symplectic manifold satisfying c1(TM)=λ[ω]c_1(TM)=\lambda \cdot [\omega] for some λR\lambda \in \R and let GG be a compact connected Lie group acting effectively on MM preserving ω\omega. Then (1) if λ<0\lambda < 0, then GG must be trivial, (2) if λ=0\lambda=0, then the GG-action is non-Hamiltonian, and (3) if λ>0\lambda > 0, then the GG-action is Hamiltonian.

Keywords

Cite

@article{arxiv.1207.4977,
  title  = {Embedded surfaces for symplectic circle actions},
  author = {Yunhyung Cho and Min Kyu Kim and Dong Youp Suh},
  journal= {arXiv preprint arXiv:1207.4977},
  year   = {2016}
}

Comments

16 pages

R2 v1 2026-06-21T21:39:07.690Z