Leafwise fixed points for C0-small Hamiltonian flows

Abstract

Consider a closed coisotropic submanifold N of a symplectic manifold (M,ω) and a Hamiltonian diffeomorphism φ on M. The main result of this article states that φ has at least the cup-length of N many leafwise fixed points w.r.t. N, provided that it is the time-1-map of a global Hamiltonian flow whose restriction to N stays C0-close to the inclusion N M. If (φ,N) is suitably nondegenerate then the number of these points is bounded below by the sum of the Betti-numbers of N. The nondegeneracy condition is generically satisfied. This appears to be the first leafwise fixed point result in which neither φ|N is assumed to be C1-close to the inclusion N M, nor N to be of contact type or regular (i.e., "fibering"). It is optimal in the sense that the C0-condition on φ cannot be replaced by the assumption that φ is Hofer-small.