An L(alpha)-stable fourth order Rosenbrock method with error estimator
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Publication:1161254
DOI10.1016/0771-050X(82)90003-1zbMath0478.65046OpenAlexW1994912749MaRDI QIDQ1161254
J. D. Day, D. N. Prabhakar Murthy
Publication date: 1982
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0771-050x(82)90003-1
Stability and convergence of numerical methods for ordinary differential equations (65L20) Numerical methods for initial value problems involving ordinary differential equations (65L05)
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A minimum configuration fourth-order nonautonomous explicit Rosenbrock method for nonstiff differential equations, On minimum configuration Rosenbrock methods, Some minimum configurationL-stable rosenbrock methods with error estimators, A comparison of some ODE solvers which require Jacobian evaluations, Run time estimation of the spectral radius of Jacobians
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Cites Work
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- On minimum configuration Rosenbrock methods
- Generalized Runge-Kutta methods of order four with stepsize control for stiff ordinary differential equations
- On the internal S-stability of Rosenbrock methods
- Comments on : T.D. Bui, On an L-stable method for stiff differential equations
- Order conditions for Rosenbrock type methods
- S-stability properties for generalized Runge-Kutta methods
- On an L-stable method for stiff differential equations
- Some general implicit processes for the numerical solution of differential equations
- Generalized Runge-Kutta Processes for Stiff Initial-value Problems†
- Semi-Implicit Runge-Kutta Procedures with Error Estimates for the Numerical Integration of Stiff Systems of Ordinary Differential Equations
- Restricted Padé Approximations to the Exponential Function
- Some minimum configurationL-stable rosenbrock methods with error estimators
- Error estimates for Runge-Kutta type solutions to systems of ordinary differential equations
- Implicit integration processes with error estimate for the numerical solution of differential equations
- The automatic integration of ordinary differential equations
- Generalized Runge-Kutta Processes for Stable Systems with Large Lipschitz Constants
- Coefficients for the study of Runge-Kutta integration processes
