Generating functions in symplectic and contact geometry

Abstract

A translated point of a contactomorphism φ on a contact manifold with contact form α is a point p where α is preserved under φ and whose image under φ lies in the same Reeb trajectory. They were introduced as a contact analogon for fixed points of Hamiltonian diffeomorphisms by Sheila Sandon and can be understood as a special case of leafwise fixed points. She established a contact version of the non-degenerate Arnol'd conjecture on spheres using a generating function approach. It turns out that Sandon's proof only works under the assumption that there exists a generating function whose sublevel set at zero has nontrivial homology. This master's thesis proves the result under this additional assumption and fills minor gaps in other parts of Sandon's argument.