Solving Boundary Value Problems for Second Order Singularly Perturbed Delay Differential Equations by Ε-Approximate Fixed-Point Method

Bartoszewski, Z.; Baranowska, Anna

doi:10.3846/13926292.2015.1048759

Cited by 5 publications

(3 citation statements)

References 8 publications

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“…A basic feature of regular perturbation problems is that the exact solution for small but nonzero ε smoothly approaches the unperturbed solution as ε ⟶ 0. A singular perturbation problem is defined as the one whose solution for ε � 0 is fundamentally different in character from the "neighbouring" solutions obtained in the limit ε ⟶ 0 [53,[55][56][57][58][59][60][61][62][63][64].…”

Section: Solving Complex Sp Nonlinear Problems: Recent Advances On Spmentioning

confidence: 99%

The Numerical Solution of Singularly Perturbed Nonlinear Partial Differential Equations in Three Space Variables: The Adaptive Explicit Inverse Preconditioning Approach

Lipitakis

2019

Modelling and Simulation in Engineering

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Critical comments on the complexity of computational systems and the basic singularly perturbed (SP) concepts are given. A class of several complex SP nonlinear elliptic equations arising in various branches of science, technology, and engineering is presented. A classification of complex SP nonlinear PDEs with characteristic boundary value problems is described. A modified explicit preconditioned conjugate gradient method based on explicit inverse preconditioners is presented. The numerical solution of a characteristic 3D SP nonlinear parabolic model is analytically given and numerical results for several model problems are presented demonstrating both applicability and efficiency of the new computational methods.

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Section: Solving Complex Sp Nonlinear Problems: Recent Advances On Spmentioning

confidence: 99%

The Numerical Solution of Singularly Perturbed Nonlinear Partial Differential Equations in Three Space Variables: The Adaptive Explicit Inverse Preconditioning Approach

Lipitakis

2019

Modelling and Simulation in Engineering

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“…Shishkin mesh utilized a hybrid initial value technique to approximate the numerical solution of SPDDE for boundary value problems with a noncontinuous convection factor and a source term [48]. To approximate the numerical solution and its absolute error for the boundary value problem for the linear and nonlinear singular perturbed DDE, we utilize the fxed point method [49].…”

Section: Introductionmentioning

confidence: 99%

Integrated Stochastic Investigation of Singularly Perturbed Delay Differential Equations for the Neuronal Variability Model

Ahmad,

Hussain,

Ilyas

et al. 2023

International Journal of Intelligent Systems

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The proposed research utilizes a computational approach to attain a numerical solution for the singularly perturbed delay differential equation (SPDDE) problem arising in the neuronal variability model through artificial neural networks (ANNs) with different solvers. The log-sigmoid function is used to construct the fitness function. The implementation of ANN on SPDDE problems is formulated for different solvers and trained with different weights. The optimization solvers such as the genetic algorithm (GA), sequential quadratic programming (SQP), and pattern search (PS) are hybridized with the active set technique (AST) and the interior-point technique (IPT) and is used to check the accuracy and rapid convergence of the numerical results of the SPDDE model. The numerical outcomes demonstrate that the system is easy to handle and efficient to solve with boundary conditions. Moreover, we used the mean residual error for one hundred runs for each solver to validate the accuracy of the proposed scheme.

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“…The existence and originality of the solutions of a SPNDDE with shift were studied by Lange and Miura [10]. The authors in [11] presented a fixed-point strategy to solve a second order SPDDE. The authors in [12] assemble two methodical spectral Legendre's derivative methods to solve numerically the Lane-Emden, Bratu's, and singularly perturbed type equations.…”

Section: Introductionmentioning

confidence: 99%

A Numerical Approach for Singularly Perturbed Nonlinear Delay Differential Equations Using a Trigonometric Spline

Lalu

Phaneendra

2022

Computational and Mathematical Methods

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In this paper, a computational procedure for solving singularly perturbed nonlinear delay differentiation equations (SPNDDEs) is proposed. Initially, the SPNDDE is reduced into a series of singularly perturbed linear delay differential equations (SPLDDEs) using the quasilinearization technique. A trigonometric spline approach is suggested to solve the sequence of SPLDDEs. Convergence of the method is addressed. The efficiency and applicability of the proposed method are demonstrated by the numerical examples.

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Solving Boundary Value Problems for Second Order Singularly Perturbed Delay Differential Equations by Ε-Approximate Fixed-Point Method

Cited by 5 publications

References 8 publications

The Numerical Solution of Singularly Perturbed Nonlinear Partial Differential Equations in Three Space Variables: The Adaptive Explicit Inverse Preconditioning Approach

The Numerical Solution of Singularly Perturbed Nonlinear Partial Differential Equations in Three Space Variables: The Adaptive Explicit Inverse Preconditioning Approach

Integrated Stochastic Investigation of Singularly Perturbed Delay Differential Equations for the Neuronal Variability Model

A Numerical Approach for Singularly Perturbed Nonlinear Delay Differential Equations Using a Trigonometric Spline

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