학술논문
2D generating surfaces and dividing surfaces in Hamiltonian systems with three degrees of freedom.
Document Type
Journal
Author
Katsanikas, Matthaios (GR-AA-AAM) AMS Author Profile; Wiggins, Stephen (4-BRST-SM) AMS Author Profile
Source
Subject
65 Numerical analysis -- 65P Numerical problems in dynamical systems
65P10Hamiltonian systems including symplectic integrators
65P10
Language
English
Abstract
Summary: ``In our previous work, we developed two methods for generalizing the construction of a periodic orbit dividing surface for a Hamiltonian system with three or more degrees of freedom. Starting with a periodic orbit, we extend it to form a torus or cylinder, which then becomes a higher-dimensional object within the energy surface (see [Katsanikas \& Wiggins, 2021a, 2021b, 2023a, 2023b] [MR4299198; MR4317993; MR4603465; MR4610419]). In this paper, we present two methods to construct dividing surfaces not from periodic orbits but by using 2D surfaces (2D geometrical objects) in a Hamiltonian system with three degrees of freedom. To illustrate the algorithm for this construction, we provide benchmark examples of three-degree-of-freedom Hamiltonian systems. Specifically, we employ the uncoupled and coupled cases of the quadratic normal form of a Hamiltonian system with three degrees of freedom.''