The strong Arnold conjecture on symplectic fixed points

  • Hông Vân Lê (Czech Academy of Sciences, Prague, Czech Republic)
A3 01 (Sophus-Lie room)


The strong Arnold conjecture states that every Hamiltonian symplectomorphism on a closed symplectic manifold $M$ has as many fixed points as the number of critical points of a smooth function on $M$. In my talk I shall survey progress in the strong Arnold conjecture including recent results obtained by Kaoru Ono and myself in 2015 concerning the strong Arnold conjecture on compact nonsimply connected manifolds.

Katharina Matschke

MPI for Mathematics in the Sciences Contact via Mail