A C^0 counterexample to the Arnold conjecture
Symplectic Geometry
2018-08-30 v1 Dynamical Systems
Abstract
The Arnold conjecture states that a Hamiltonian diffeomorphism of a closed and connected symplectic manifold must have at least as many fixed points as the minimal number of critical points of a smooth function on the manifold. It is well known that the Arnold conjecture holds for Hamiltonian homeomorphisms of closed symplectic surfaces. The goal of this paper is to provide a counterexample to the Arnold conjecture for Hamiltonian homeomorphisms in dimensions four and higher. More precisely, we prove that every closed and connected symplectic manifold of dimension at least four admits a Hamiltonian homeomorphism with a single fixed point.
Keywords
Cite
@article{arxiv.1609.09192,
title = {A C^0 counterexample to the Arnold conjecture},
author = {Lev Buhovsky and Vincent Humilière and Sobhan Seyfaddini},
journal= {arXiv preprint arXiv:1609.09192},
year = {2018}
}
Comments
58 pages, 7 figures