Application of new quintic polynomial B-spline approximation for numerical investigation of Kuramoto–Sivashinsky equation

Iqbal, Muhammad Kashif; Abbas, Muhammad; Nazir, Tahir; Ali, Nouman

doi:10.1186/s13662-020-03007-y

Cited by 15 publications

(4 citation statements)

References 41 publications

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“…The principle of stability is connected to computation technique errors that do not rise as the method progresses [43]. In this section, we will utilize the Fourier series scheme to assess the stability of the suggested methodology [44,45]. In order to perform Fourier stability analysis, a temporary freeze is applied to the non-linear terms.…”

Section: Stability Analysismentioning

confidence: 99%

An Efficient Cubic B-Spline Technique for Solving the Time Fractional Coupled Viscous Burgers Equation

Ghafoor,

Abbas,

Akram

et al. 2024

Fractal Fract

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The second order Burger’s equation model is used to study the turbulent fluids, suspensions, shock waves, and the propagation of shallow water waves. In the present research, we investigate a numerical solution to the time fractional coupled-Burgers equation (TFCBE) using Crank–Nicolson and the cubic B-spline (CBS) approaches. The time derivative is addressed using Caputo’s formula, while the CBS technique with the help of a θ-weighted scheme is utilized to discretize the first- and second-order spatial derivatives. The quasi-linearization technique is used to linearize the non-linear terms. The suggested scheme demonstrates unconditionally stable. Some numerical tests are utilized to evaluate the accuracy and feasibility of the current technique.

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Section: Stability Analysismentioning

confidence: 99%

An Efficient Cubic B-Spline Technique for Solving the Time Fractional Coupled Viscous Burgers Equation

Ghafoor,

Abbas,

Akram

et al. 2024

Fractal Fract

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“…This section is concerned with the stability analysis [39] of the proposed numerical procedure for the pseudoparabolic problem (1). For the sake of simplicity, we consider the force-free form of the problem as…”

Section: Stability Analysismentioning

confidence: 99%

Recovering a source term in the higher-order pseudo-parabolic equation via cubic spline functions

Huntul¹

2022

Phys. Scr.

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In this paper, we considered an inverse problem of recovering the space-dependent source coefficient in the third-order pseudo-parabolic equation from final over-determination condition. This inverse problem appears extensively in the modelling of various phenomena in physics such as the motion of non-Newtonian fluids, thermodynamic processes, filtration in a porous medium, etc. The unique solvability theorem for this inverse problem is supplied. However, since the governing equation is yet ill-posed (very slight errors in the final input may cause relatively significant errors in the output source term), we need to regularize the solution. Therefore, to get a stable solution, a regularized cost function is to be minimized for retrieval of the unknown force term. The third-order pseudo-parabolic problem is discretized using the Cubic B-spline (CB-spline) collocation technique and reshaped as non-linear least-squares optimization of the Tikhonov regularization function. Numerically, this is effectively solved using the lsqnonlin routine from the MATLAB toolbox. Both perturbed data and analytical solutions are inverted. Numerical outcomes are reported and discussed. The computational efficiency of the method is investigated by small values of CPU time. In addition, the von Neumann stability analysis for the proposed numerical approach has also been discussed.

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“…In the mathematical modeling of systems with dynamic behavior in various fields of the real-world and in the qualitative and numerical analysis of these systems, differential equations with initial or boundary conditions and the existence and uniqueness of solutions and numerical approach techniques to solutions for these equations appear as important mathematical tools (see, e.g. [1], [2], [3], [4], [5], [6], [7], [8], [9], [10], [11]). (Ordinary) differential inclusions, which are generalized forms of ordinary differential equations and started to be studied after the advances in right-side discontinuous differential equations and solution methods for the problems related to these equations in the 1960s, have a similarly important role in applied mathematics since using directly in modeling and especially in the necessary and sufficient results of optimal control problems of discontinuous systems (see, e.g.…”

Section: Introductionmentioning

confidence: 99%

Some Applications Related to Differential Inclusions Based on the Use of a Weighted Space

İLTER

2023

Fundamental Journal of Mathematics and Applications

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In this paper, we present an existence theorem for the problem of discontinuous dynamical system related to ordinary differential inclusion, based on the use of the concepts related to weighted spaces introduced by Gorka and Rybka, without using any fixed point theorem. The solution concept in this theorem is considered to belong to the weighted space. For comparison with the classical case and as an application of the theorem, we give an example problem that has such a solution but no continuously differentiable solution.

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Application of new quintic polynomial B-spline approximation for numerical investigation of Kuramoto–Sivashinsky equation

Cited by 15 publications

References 41 publications

An Efficient Cubic B-Spline Technique for Solving the Time Fractional Coupled Viscous Burgers Equation

An Efficient Cubic B-Spline Technique for Solving the Time Fractional Coupled Viscous Burgers Equation

Recovering a source term in the higher-order pseudo-parabolic equation via cubic spline functions

Some Applications Related to Differential Inclusions Based on the Use of a Weighted Space

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