Computational uncertainty principle in ordinary differential equations. II. Theoretical analysis
From MaRDI portal
Publication:866223
DOI10.1007/BF02916726zbMath1232.65115OpenAlexW2911477534MaRDI QIDQ866223
Qingcun Zeng, Jifan Chou, Jian-ping Li
Publication date: 20 February 2007
Published in: Science in China. Series E (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf02916726
Theoretical approximation of solutions to ordinary differential equations (34A45) Error bounds for numerical methods for ordinary differential equations (65L70)
Related Items (8)
On the risks of using double precision in numerical simulations of spatio-temporal chaos ⋮ Clean numerical simulation: a new strategy to obtain reliable solutions of chaotic dynamic systems ⋮ Can We Obtain a Reliable Convergent Chaotic Solution in any Given Finite Interval of Time? ⋮ A posteriori error analysis of round-off errors in the numerical solution of ordinary differential equations ⋮ Computational uncertainty and the application of a high-performance multiple precision scheme to obtaining the correct reference solution of Lorenz equations ⋮ A new algorithm for seasonal precipitation forecast based on global atmospheric hydrological water budget ⋮ On Reliable Computation of Lifetime in Transient Chaos ⋮ Physical limit of prediction for chaotic motion of three-body problem
Cites Work
- Computational uncertainty principle in nonlinear ordinary differential equations. I. Numerical results
- 33 years of numerical instability. I
- Solving Ordinary Differential Equations I
- Convergence and stability in the numerical integration of ordinary differential equations
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
This page was built for publication: Computational uncertainty principle in ordinary differential equations. II. Theoretical analysis
