A Meshfree Approach Based on Moving Kriging Interpolation for Numerical Solution of Coupled Reaction-Diffusion Problems

Hidayat, Mas Irfan P.

doi:10.1142/s0219876223500020

Cited by 3 publications

(2 citation statements)

References 74 publications

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“…et.al (2017) [19].Finite Difference Implicit Schemes like ADI to Coupled Two-Dimension Reaction Diffusion System has been work by Hasnain et al (2018) [20].Mojtaba Barzegari et al(2022) research on reaction-diffusion models with shifting boundaries results in a system where both diffusion and reaction develop the system's state and geometry over time [21]. Recently Mas Irfan P. Hidayat et al(2023) introducing a novel meshfree method based on moving Kriging interpolation for efficient and accurate numerical solutions to reaction-diffusion problems [22]. Lyras et al(2022) introduces a finite volume method that employs a level set approach coupled with the volume of fluid method, enabling the simulation of two-phase flows with sharp fluid interfaces [23].…”

Section: B Backgroundmentioning

confidence: 99%

Dynamical Behavior of Nonlinear Coupled Reaction-Diffusion Model: A Numerical Study Utilizing ADI and Staggered Grid Finite Volume Method in Matlab

Saqib,

Akhtar,

Hasnain

et al. 2024

IEEE Access

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In this research, we present two Numerical algorithms for studying the dynamics of spatially extended coupled nonlinear reaction-diffusion model. The difference in this work is to model a system of reacting and diffusing chemicals, and how to predict the dynamics of ecologically relevant behavior, including chaos. The goal can be achieved by applying a proposed staggered grid finite volume method for solving the Reaction model, rigorously validating the numerical method and grid generation techniques against established results. Additionally, we integrate an Alternating Direction Implicit formulation to compare the efficiency and accuracy of the model's results. Dynamical system analysis, including linear stability analysis, is applied to comprehend the fundamental qualitative features of the inhibitor-activator system inherent in the coupled reaction-diffusion equations. Results, presented in tables and graphical representations, show that the schemes' high accuracy at fourth-order precision in space and second-order in time, with conditional stability. Numerical results showed that the proposed finite volume approach was exceptionally proficient and accurate for tackling the two-dimensional nonlinear coupled reactiondiffusion model. Overall, the dialog highlights the significance of the proposed staggered grid finite approach and calculations for fathoming coupled reaction-diffusion equations are widely studied in biological and chemical systems of nonlinear differential equations.

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Section: B Backgroundmentioning

confidence: 99%

Dynamical Behavior of Nonlinear Coupled Reaction-Diffusion Model: A Numerical Study Utilizing ADI and Staggered Grid Finite Volume Method in Matlab

Saqib,

Akhtar,

Hasnain

et al. 2024

IEEE Access

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“…The Runge-Kutta approach offers advantages in terms of computational speed and its ability to handle initial value problems. Various numerical techniques are used to solve the boundary values problem numerically using different numerical methods (Hidayat, 2021;Hidayat, 2023). It efficiently addresses the issue of finding the missing initial value through a shooting strategy, which is particularly important in real-world applications.…”

Section: Numerical Proceduresmentioning

confidence: 99%

Coaxially swirled porous disks flow simultaneously induced by mixed convection with morphological effect of metallic/metallic oxide nanoparticles

et al. 2023

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This study focuses on the numerical modeling of coaxially swirling porous disk flow subject to the combined effects of mixed convection and chemical reactions. We conducted numerical investigations to analyze the morphologies of aluminum oxide (Al2O3) and copper (Cu) nanoparticles under the influence of magnetohydrodynamics. For the flow of hybrid nanofluids, we developed a model that considers the aggregate nanoparticle volume fraction based on single-phase simulation, along with the energy and mass transfer equations. The high-order, nonlinear, ordinary differential equations are obtained from the governing system of nonlinear partial differential equations via similarity transformation. The resulting system of ordinary differential equations is solved numerically by the Runge–Kutta technique and the shooting method. This is one of the most widely used numerical algorithms for solving differential equations in various fields, including physics, engineering, and computer science. This study investigated the impact of various nanoparticle shape factors (spherical, platelet and laminar) subject to relevant physical quantities and their corresponding distributions. Our findings indicate that aluminum oxide and copper (Al2O3-Cu/H2O) hybrid nanofluids exhibit significant improvements in heat transfer compared to other shape factors, particularly in laminar flow. Additionally, the injection/suction factor influences the contraction/expansion phenomenon, leading to noteworthy results concerning skin friction and the Nusselt number in the field of engineering. Moreover, the chemical reaction parameter demonstrates a remarkable influence on Sherwood’s number. The insights gained from this work hold potential benefits for the field of lubricant technology, as they contribute valuable knowledge regarding the behavior of hybrid nanofluids and their associated characteristics.

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Non-polynomial spline method for computational study of reaction diffusion system

Haq,

Haq

2024

Phys. Scr.

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This work addresses an efficient and new numerical technique utilizing non-polynomial splines to solvesystem of reaction diffusion equations (RDS). These system of equations arise in pattern formation of somespecial biological and chemical reactions. Different types of RDS are in the form of spirals, hexagons, stripes,and dissipative solitons. Chemical concentrations can travel as waves in reaction-diffusion systems, wherewave like behaviour can be seen. The purpose of this research is to develop a stable, highly accurate andconvergent scheme for the solution of aforementioned model. The method proposed in this paper utilizesforward difference for time discretization whereas for spatial discretization cubic non-polynomial spline isused to get approximate solution of the system under consideration. Furthermore, stability of the scheme isdiscussed via Von-Neumann criteria. Different orders of convergence is achieved for the scheme during atheoretical convergence test. Suggested method is tested for performance on various well known models suchas, Brusselator, Schnakenberg, isothermal as well as linear models. Accuracy and efficiency of the scheme ischecked in terms of relative error (ER) and L∞ norms for different time and space step sizes. The newlyobtained results are analyzed and compared with those available in literature.

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A Meshfree Approach Based on Moving Kriging Interpolation for Numerical Solution of Coupled Reaction-Diffusion Problems

Cited by 3 publications

References 74 publications

Dynamical Behavior of Nonlinear Coupled Reaction-Diffusion Model: A Numerical Study Utilizing ADI and Staggered Grid Finite Volume Method in Matlab

Dynamical Behavior of Nonlinear Coupled Reaction-Diffusion Model: A Numerical Study Utilizing ADI and Staggered Grid Finite Volume Method in Matlab

Coaxially swirled porous disks flow simultaneously induced by mixed convection with morphological effect of metallic/metallic oxide nanoparticles

Non-polynomial spline method for computational study of reaction diffusion system

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