An improved Störmer-Verlet method based on exact discretization for nonlinear oscillators
作者:
Highlights:
• A modified Störmer-Verlet method with a parameter ω is proposed.
• The modified method is symplectic, symmetric, convergent with order two and explicit for separable Hamiltonian system.
• The modified method solves exactly some linear equation associated to a nonlinear oscillator equation.
• Choosing ω in modified method by approximate frequency of nonlinear oscillator is much more accurate than the classical Störmer-Verlet method.
• Results are verified by numerical experiments on the cubic Duffing and simple pendulum equation.
摘要
•A modified Störmer-Verlet method with a parameter ω is proposed.•The modified method is symplectic, symmetric, convergent with order two and explicit for separable Hamiltonian system.•The modified method solves exactly some linear equation associated to a nonlinear oscillator equation.•Choosing ω in modified method by approximate frequency of nonlinear oscillator is much more accurate than the classical Störmer-Verlet method.•Results are verified by numerical experiments on the cubic Duffing and simple pendulum equation.
论文关键词:Geometric numerical integration,Symplecticity,Exact discretization,Duffing equation,Frequency
论文评审过程:Received 15 July 2019, Revised 13 April 2020, Accepted 14 June 2020, Available online 2 July 2020, Version of Record 2 July 2020.
论文官网地址:https://doi.org/10.1016/j.amc.2020.125476
