@article{ijp20251311,
author={{Houeto, J. G. and Tokpohozin, B. N. and Miwadinou, C. H. and Koukpemedji, A. A. and Monwanou, A. V.},
title={Chaotic and Coexistence Attractors of Classical Complex Exotic Oscillator with Position-Dependent Mass},
journal={International Journal of Physics},
volume={13},
number={1},
pages={1--10},
year={2025},
url={https://pubs.sciepub.com/ijp/13/1/1},
issn={2333-4576},
abstract={This work analyzes the chaotic dynamics and the coexistence of attractors of the complex exotic oscillator. From the Hamiltonian of the basic system, the oscillator is obtained. The complete dynamics of the exotic oscillator is studied and the coexistence of attractors analyzed using fourth order Runge-Kutta algorithm. It is obtained for appropriate conditions the coexistence of chaotic and regular attractors. The study showed that for domains of values of the pair of parameters (a,b) of the exotic oscillator and given initial conditions, the dynamics of the system can be regular, or chaotic or can have very large amplitudes. The basins of attraction and the drawn phase portraits confirmed the PT symmetry and the breaking of this symmetry of the oscillator.},
doi={10.12691/ijp-13-1-1}
publisher={Science and Education Publishing}
}