A numerical solution of Burgers’ equation by pseudospectral method and Darvishi’s preconditioning

Darvishi, M. T.; Javidi, Mohammad

doi:10.1016/j.amc.2005.04.079

Cited by 29 publications

(13 citation statements)

References 12 publications

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“…Error in

L_{2}

and

L_{\infty}

are computed and presented in Tables and . Table is used for the comparison of errors with that of pseudospectral method . In , Darvishi et al have taken Eq.…”

Section: Resultsmentioning

confidence: 99%

“…Table is used for the comparison of errors with that of pseudospectral method . In , Darvishi et al have taken Eq. (25) without any division by

M

for the evaluation

L_{2}

error, and hence in the present scheme for Table .…”

Section: Resultsmentioning

confidence: 99%

“…Error in L 2 and L ∞ are computed and presented in Tables V and VI. Table V is used for the comparison of errors with that of pseudospectral method [61]. In [61], Darvishi PDQ [40] PDQ-TS [58] PDQ [40] PDQ-TS [58] PDQ [40] PDQ-TS [42].…”

Section: Step 3: Substitutionmentioning

confidence: 99%

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A differential quadrature based numerical method for highly accurate solutions of Burgers' equation

Aswin

Awasthi

Rashidi

2017

Numerical Methods Partial

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In this article, we introduce a new, simple, and accurate computational technique for one‐dimensional Burgers' equation. The idea behind this method is the use of polynomial based differential quadrature (PDQ) for the discretization of both time and space derivatives. The quasilinearization process is used for the elimination of nonlinearity. The resultant scheme has simulated for five classic examples of Burgers' equation. The simulation outcomes are validated through comparison with exact and secondary data in the literature for small and large values of kinematic viscosity. The article has deduced that the proposed scheme gives very accurate results even with less number of grid points. The scheme is found to be very simple to implement. Hence, it applies to any domain requires quick implementation and computation.© 2017 Wiley Periodicals, Inc. Numer Methods Partial Differential Eq 33: 2023–2042, 2017

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“…Error in

L_{2}

and

L_{\infty}

are computed and presented in Tables and . Table is used for the comparison of errors with that of pseudospectral method . In , Darvishi et al have taken Eq.…”

Section: Resultsmentioning

confidence: 99%

“…Table is used for the comparison of errors with that of pseudospectral method . In , Darvishi et al have taken Eq. (25) without any division by

M

for the evaluation

L_{2}

error, and hence in the present scheme for Table .…”

Section: Resultsmentioning

confidence: 99%

See 1 more Smart Citation

A differential quadrature based numerical method for highly accurate solutions of Burgers' equation

Aswin

Awasthi

Rashidi

2017

Numerical Methods Partial

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show abstract

“…They also solved the problem by time discretization of Adomain's decomposition method in [93]. Darvishi and Javidi [94] studied a numerical solution of Burgers equation by pseudospectral method and Darvishi's preconditioning. Bratsos [95] solved modified Burgers equation by a finite difference scheme based on fourth order rational approximants to the matrix exponential term in a two time level recurrence relation.…”

Section: Survey Of Different Techniquesmentioning

confidence: 98%

Contemporary review of techniques for the solution of nonlinear Burgers equation

Dhawan

Kapoor

Kumar

et al. 2012

Journal of Computational Science

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“…Different numerical technique have been used for solving Burgers equation.Finite difference methods have been given by Biringen et al [4] and Kutluay et al [25]and recently,by Inan et al [21].Finite elements methods have been given by Caldwell et al [9]and Varglu et al [42] and Ozis et al [35].Spectral methods have been developed by Bar-yoseph et al [5]and Mansell et al [32].Pseudo-spectral method has been used by Darvishi et al [12] and distributed approximation function approach has studied by Zang et al [47] and Wei et al [44].Boundary elements methods is given by Bahadir et al [6].A wavelet collocation method has used by Garba [17],furthermore quasi wavelet based numerical method has been suggested by Wan et al [45].Fast adaptive diffusion wavelet method have been survived by Goyal et al [18].Least square quadratic B-spline finite elements has been given by Kutluay et al [26].Various B-spline have been proposed by Dag et al [13,41].B-spline and multi-quadratic quasi-interpolation have been described by Zhu et al and Chen et al [48,10]. The present work attempts to use cubic non-polynomial spline [36,19,33].One of the important ability of this approximation is the tension parameters involving definition of non-polynomial cubic spline which can be chosen in such a way that the local truncation error of the proposed method can be optimal.Hence,it has been demonstrate that tension spline give better result.This paper is organized as follows:In section 2,derivation and formulation of the cubic non-polynomial tension spline along with consistency relation of second derivatives discussed in details.In section 3,the derivation of two level scheme based on non-polynomial tension spline has been described.In section 4,convergence analysis of the present method has been discussed in detail and we have shown under appropriate condition the method converges.At the end,we illustrate the accuracy and efficiency of the proposed method by testing this approach on two test problems.comparison of the numerical result are given.…”

Section: Introductionmentioning

confidence: 99%

Numerical solution of Burgers equation with nonlinear damping using non-polynomial tension spline

Shekarabi¹

2016

HJMS

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Numerical solution of Burgers equation with nonlinear damping term has been investigated.We developed new approach based on nonpolynomial cubic tension spline approximation.The proposed approach depends on the parameters involving in tension spline.By choosing suitable values of such parameters the optimal local truncation error of the scheme can be obtained.Convergence analysis of presented method has been discussed in details and we have shown under appropriate condition the method convergence.The method tested on two problems,numerical results have been compared with the exact solution to justify the usefulness and accurate nature of proposed method.

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A numerical solution of Burgers’ equation by pseudospectral method and Darvishi’s preconditioning

Cited by 29 publications

References 12 publications

A differential quadrature based numerical method for highly accurate solutions of Burgers' equation

A differential quadrature based numerical method for highly accurate solutions of Burgers' equation

Contemporary review of techniques for the solution of nonlinear Burgers equation

Numerical solution of Burgers equation with nonlinear damping using non-polynomial tension spline

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