Robust numerical method for singularly perturbed differential equations with large delay
DOI10.1515/DEMA-2021-0020zbMath1483.65123OpenAlexW4214730381WikidataQ115236528 ScholiaQ115236528MaRDI QIDQ2119868
Gemechis File Duressa, Habtamu Garoma Debela, Murad Ibrahim Abdulla
Publication date: 30 March 2022
Published in: Demonstratio Mathematica (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1515/dema-2021-0020
Stability and convergence of numerical methods for ordinary differential equations (65L20) Finite difference and finite volume methods for ordinary differential equations (65L12) Singular perturbations of functional-differential equations (34K26) Numerical solution of singularly perturbed problems involving ordinary differential equations (65L11)
Cites Work
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- An initial value technique for singularly perturbed convection-diffusion problems with a negative shift
- Asymptotic and numerical analysis of singular perturbation problems: A survey
- Singular perturbation methods for ordinary differential equations
- Asymptotic analysis and solution of a finite-horizon \(H_{\infty}\) control problem for singularly-perturbed linear systems with small state delay
- A delay-differential equation model of HIV infection of \(\text{CD}4^+\) T-cells
- A fitted numerical scheme for second order singularly perturbed delay differential equations via cubic spline in compression
- Accelerated fitted operator finite difference method for singularly perturbed delay differential equations with non-local boundary condition
- A hybrid method for singularly perturbed delay boundary value problems exhibiting a right boundary layer
- A NUMERICAL SCHEME FOR SINGULARLY PERTURBED DELAY DIFFERENTIAL EQUATIONS OF CONVECTION-DIFFUSION TYPE ON AN ADAPTIVE GRID
- A second order stabilized central difference method for singularly perturbed differential equations with a large negative shift
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