TITLE:
The Study on the Phase Structure of the Paul Trap System
AUTHORS:
Jaouad Kharbach, Mohamed Benkhali, Mohamed Benmalek, Ahmed Sali, Abdellah Rezzouk, Mohammed Ouazzani-Jamil
KEYWORDS:
Hamiltonian System, Integrability, Bifurcation, Liouville Tori, Periodic Solutions, Poincaré Section, Chaos
JOURNAL NAME:
Applied Mathematics,
Vol.8 No.4,
April
28,
2017
ABSTRACT: In this article, the classic dynamic of Paul trap problem is investigated. We give a complete description of the topological structure of Hamiltonian flows on the real phase space. Using the surgery’s theory of Fomenko Liouville tori, all generic bifurcations of the common level sets of the first integrals were described theoretically. We give also an explicit periodic solution for singular values of the first integrals. Numerical investigations are carried out for all generic bifurcations and we observe order-chaos transition when the critical value of a control parameter is varied.