Stiffness in numerical initial-value problems
From MaRDI portal
Publication:1923471
DOI10.1016/0377-0427(96)00009-XzbMath0857.65074MaRDI QIDQ1923471
Publication date: 16 March 1997
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Nonlinear ordinary differential equations and systems (34A34) Numerical methods for initial value problems involving ordinary differential equations (65L05) Multiple scale methods for ordinary differential equations (34E13)
Related Items
Exponential fitting BDF algorithms and their properties ⋮ Spatiotemporal pattern formations in stiff reaction-diffusion systems by new time marching methods ⋮ Summation-by-parts in time ⋮ New time-marching methods for compressible Navier-Stokes equations with applications to aeroacoustics problems ⋮ Arbitrary high-order unconditionally stable methods for reaction-diffusion equations with inhomogeneous boundary condition via deferred correction ⋮ Spectral element simulations of interactive particles in a fluid ⋮ Exponential fitted Gauss, Radau and Lobatto methods of low order ⋮ Exponential fitting BDF-Runge-Kutta algorithms ⋮ Insufficiency of chemical network model integration using a high-order Taylor series method ⋮ Error propagation in Runge-Kutta methods ⋮ Stiffness 1952--2012: sixty years in search of a definition ⋮ Arbitrary high order A-stable and B-convergent numerical methods for ODEs via deferred correction
Uses Software
Cites Work
- Parallel methods for initial value problems
- On resolvent conditions and stability estimates
- Numerical ranges and stability estimates
- Numerical treatment of the parameter identification problem for delay- differential systems arising in immune response modelling
- Error growth analysis via stability regions for discretizations of initial value problems
- The effect of the stopping of the Newton iteration in implicit linear multistep methods
- Numerical methods of boundary layer type for stiff systems of differential equations
- Solving Ordinary Differential Equations I
- VODE: A Variable-Coefficient ODE Solver
- The error committed by stopping the Newton iteration in the numerical solution of stiff initial value problems
- Runge–Kutta Methods for Dissipative and Gradient Dynamical Systems
- The automatic integration of ordinary differential equations
- A stopping criterion for the Newton-Raphson method in implicit multistep integration algorithms for nonlinear systems of ordinary differential equations
- Local Extrapolation in the Solution of Ordinary Differential Equations
- Integration of Stiff Equations
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
