Comparative Study on Numerical Methods for Singularly Perturbed Advanced-Delay Differential Equations

P. Hammachukiattikul; E. Sekar; A. Tamilselvan; R. Vadivel; N. Gunasekaran; Praveen Agarwal

doi:10.1155/2021/6636607

Comparative Study on Numerical Methods for Singularly Perturbed Advanced-Delay Differential Equations

P. Hammachukiattikul
, E. Sekar
, A. Tamilselvan
, R. Vadivel
, N. Gunasekaran
, Praveen Agarwal

Phuket Rajabhat University
SASTRA
Bharathidasan University
Shibaura Institute of Technology
International College of Engineering

Research output: Contribution to journal › Article › peer-review

20 Scopus citations

Abstract

In this paper, we consider a class of singularly perturbed advanced-delay differential equations of convection-diffusion type. We use finite and hybrid difference schemes to solve the problem on piecewise Shishkin mesh. We have established almost first- and second-order convergence with respect to finite difference and hybrid difference methods. An error estimate is derived with the discrete norm. In the end, numerical examples are given to show the advantages of the proposed results (Mathematics Subject Classification: 65L11, 65L12, and 65L20).

Original language	English
Article number	6636607
Journal	Journal of Mathematics
Volume	2021
DOIs	https://doi.org/10.1155/2021/6636607
State	Published - 2021
Externally published	Yes

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title = "Comparative Study on Numerical Methods for Singularly Perturbed Advanced-Delay Differential Equations",

abstract = "In this paper, we consider a class of singularly perturbed advanced-delay differential equations of convection-diffusion type. We use finite and hybrid difference schemes to solve the problem on piecewise Shishkin mesh. We have established almost first- and second-order convergence with respect to finite difference and hybrid difference methods. An error estimate is derived with the discrete norm. In the end, numerical examples are given to show the advantages of the proposed results (Mathematics Subject Classification: 65L11, 65L12, and 65L20).",

author = "P. Hammachukiattikul and E. Sekar and A. Tamilselvan and R. Vadivel and N. Gunasekaran and Praveen Agarwal",

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AU - Hammachukiattikul, P.

AU - Sekar, E.

AU - Tamilselvan, A.

AU - Vadivel, R.

AU - Gunasekaran, N.

AU - Agarwal, Praveen

PY - 2021

Y1 - 2021

N2 - In this paper, we consider a class of singularly perturbed advanced-delay differential equations of convection-diffusion type. We use finite and hybrid difference schemes to solve the problem on piecewise Shishkin mesh. We have established almost first- and second-order convergence with respect to finite difference and hybrid difference methods. An error estimate is derived with the discrete norm. In the end, numerical examples are given to show the advantages of the proposed results (Mathematics Subject Classification: 65L11, 65L12, and 65L20).

AB - In this paper, we consider a class of singularly perturbed advanced-delay differential equations of convection-diffusion type. We use finite and hybrid difference schemes to solve the problem on piecewise Shishkin mesh. We have established almost first- and second-order convergence with respect to finite difference and hybrid difference methods. An error estimate is derived with the discrete norm. In the end, numerical examples are given to show the advantages of the proposed results (Mathematics Subject Classification: 65L11, 65L12, and 65L20).

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DO - 10.1155/2021/6636607

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SN - 2314-4629

VL - 2021

JO - Journal of Mathematics

JF - Journal of Mathematics

M1 - 6636607

ER -

Comparative Study on Numerical Methods for Singularly Perturbed Advanced-Delay Differential Equations

Abstract

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