Numerical Solution of Fourth Order Linear Ordinary Differential Equations by Cubic Spline Collocation Tau Method

Taiwo, O. A.; Ogunlaran, Oladotun Matthew

doi:10.3844/jmssp.2008.264.268

Cited by 4 publications

(4 citation statements)

References 8 publications

(6 reference statements)

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“…This becomes a problem of non-linear 4 th order differenial equation which has been solved by Cubic Spline Collocation Tau Method [36]. The solution uses Newton's linearizaion scheme for Taylor series expansion given by equation A6.…”

Section: A Immediately After Woundingmentioning

confidence: 99%

See 1 more Smart Citation

Real-Time Monitoring of Wound Healing on Nano-Patterned Substrates: Non-Invasive Impedance Spectroscopy Technique

Mondal

Bose

Chaudhuri

2016

IEEE Trans. Nanotechnology

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Section: A Immediately After Woundingmentioning

confidence: 99%

“…The substituion to be carried for this purpose [36] is given by equations A7-A10. The algorithm of the entire program is as follows: i. Initialize the unknowns r c ,R b , h, Z cell , K / and α. ii.…”

Section: A Immediately After Woundingmentioning

confidence: 99%

Real-Time Monitoring of Wound Healing on Nano-Patterned Substrates: Non-Invasive Impedance Spectroscopy Technique

Mondal

Bose

Chaudhuri

2016

IEEE Trans. Nanotechnology

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“…The work revealed that the accuracy of the results obtained by cubic B-spline were better than those obtained through finite difference method. [6] applied cubic spline collocation Tau method on linear 4th order differential equation. The method could not handle 4th order nonlinear ordinary differential equation directly.…”

Section: Introductionmentioning

confidence: 99%

Cubic B-Spline Collocation and Adomian Decomposition Methods on 4th Order Multi-point Boundary Value Problems

Agom

Ogunfiditimi

Eno

et al. 2018

JAMCS

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In this paper, Cubic B-Spline collocation method (CBSCM) and Adomian Decomposition Method (ADM) are applied to obtain numerical solutions to fourth-order linear and nonlinear differential equations. The CBSCM was based on finite element method involving collocation method with cubic B-spline as a basis function. While ADM was based on multistage decomposition method. We discovered in the illustrative examples considered, that result by ADM were compatible with the closed form solutions well over twenty, in some cases over thirty, decimal places and with extremely minimal absolute errors. Results by CBSCM gave correct solutions to atmost six decimal places with sizeable absolute errors. These has further revealed the importance and superiority of ADM over CBSCM in providing semi-analytic solution to this class of differential equations.

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“…There are several methods that can be used to solve the two point boundary value problems numerically. It had been proposed by Attili and Syam (2008); Ha (2001); Jafri et al (2009) and Taiwo and Ogunlaran (2008). Ha (2001) had solved the two-point boundary value problem using fourth order Runge-Kutta method via shooting technique.…”

Section: Introductionmentioning

confidence: 99%

Solving Directly Two Point Non Linear Boundary Value Problems Using Direct Adams Moulton Method

Majid¹

2011

Journal of Mathematics and Statistics

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Problem statement: In this study, a direct method of Adams Moulton type was developed for solving non linear two point Boundary Value Problems (BVPs) directly. Most of the existence researches involving BVPs will reduced the problem to a system of first order Ordinary Differential Equations (ODEs). This approach is very well established but it obviously will enlarge the systems of first order equations. However, the direct method in this research will solved the second order BVPs directly without reducing it to first order ODEs. Approach: Lagrange interpolation polynomial was applied in the derivation of the proposed method. The method was implemented using constant step size via shooting technique in order to determine the approximated solutions. The shooting technique will employ the Newtons method for checking the convergent of the guessing values for the next iteration. Results: Numerical results confirmed that the direct method gave better accuracy and converged faster compared to the existing method. Conclusion: The proposed direct method is suitable for solving two point non linear boundary value problems

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Numerical Solution of Fourth Order Linear Ordinary Differential Equations by Cubic Spline Collocation Tau Method

Cited by 4 publications

References 8 publications

Real-Time Monitoring of Wound Healing on Nano-Patterned Substrates: Non-Invasive Impedance Spectroscopy Technique

Real-Time Monitoring of Wound Healing on Nano-Patterned Substrates: Non-Invasive Impedance Spectroscopy Technique

Cubic B-Spline Collocation and Adomian Decomposition Methods on 4th Order Multi-point Boundary Value Problems

Solving Directly Two Point Non Linear Boundary Value Problems Using Direct Adams Moulton Method

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