Title:On the convergence of flow map parameterization methods in Hamiltonian systems

Abstract:In this work, we obtain an a-posteriori theorem for the existence of partly hyperbolic invariant tori in analytic Hamiltonian systems: autonomous, periodic, and quasi-periodic. The method of proof is based on the convergence of a KAM iterative scheme to solve the invariance equations of tori and their invariant bundles under the framework of the parameterization method. Staring from approximate parameterizations, analytic in a complex strip of the real torus, we derive conditions for existence of analytic parameterizations of tori and bundles in a smaller strip. The proof relies on the careful treatment of the analyticity loss with each iterative step and on the control of geometric properties of symplectic flavour.