English

Generating hyperbolic singularities in completely integrable systems

Mathematical Physics 2018-02-01 v1 Dynamical Systems math.MP Symplectic Geometry

Abstract

Let (M,Ω)(M,\Omega) be a connected symplectic 4-manifold and let F=(J,H):MR2F=(J,H) : M \to \mathbb{R}^2 be a completely integrable system on MM with only non-degenerate singularities and for which J:MRJ : M \to \mathbb{R} is a proper map. Assume that FF does not have singularities with hyperbolic blocks and that p1,...,pnp_1,...,p_n are the focus-focus singularities of FF. For each subset S={i1,...,ij}S=\{i_1,...,i_j\} we will show how to modify FF locally around any pi,iSp_i, i \in S, in order to create a new integrable system F~=(J,H~):MR2\tilde{F}=(J, \tilde{H}) : M \to \mathbb{R}^2 such that its classical spectrum F~(M)\tilde{F}(M) contains jj smooth curves of singular values corresponding to non-degenerate transversally hyperbolic singularities of F~\tilde{F}. Moreover the focus-focus singularities of F~\tilde{F} are precisely pip_i, i{1,...,n}Si \in \{1,...,n\} \setminus S, and each of these pip_i is non-degenerate. The proof is based on Eliasson's linearization theorem for non-degenerate singularities, and properties of the Hamiltonian Hopf bifurcation.

Keywords

Cite

@article{arxiv.1503.01534,
  title  = {Generating hyperbolic singularities in completely integrable systems},
  author = {Holger R. Dullin and Álvaro Pelayo},
  journal= {arXiv preprint arXiv:1503.01534},
  year   = {2018}
}

Comments

24 pages, 9 figures

R2 v1 2026-06-22T08:44:52.342Z