Analysis of non-linear reaction-diffusion processes with Michaelis-Menten kinetics by a new Homotopy perturbation method

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"Analysis of non-linear reaction-diffusion processes with Michaelis-Menten kinetics by a new Homotopy perturbation method"
written by Devaraj Shanthi, Vembu Ananthaswamy, Lakshmanan Rajendran,
published by Natural Science, Vol.5 No.9, 2013

has been cited by the following article(s):

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[2]	Approximated Solutions of Michaelis-Menten Diffusion Reaction Equation by Combination of Methods
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[3]	Solution of Two-Point Nonlinear Boundary Problems Using Taylor Series Approximation and the Ying Buzu Shu Algorithm
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[6]	Application of new approach to homotopy perturbation method in solving a system of nonlinear self-igniting reaction diffusion equations.
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[10]	Enhanced and non-monotonic effective kinetics of solute pulses under Michaelis–Menten reactions
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[13]	Semi-analytical Solution for Surface Coverage Model in an Electrochemical Arsenic Sensor Using a New Approach to Homotopy Perturbation Method
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[14]	Semi-analytical solution for amperometric enzyme electrode modelling with substrate cyclic conversion using a new approach to Homotopy perturbation method
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[15]	The New Homotopy Perturbation Method (NHPM) for Nonlinear Parabolic Equation in Chemical Sciences
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[16]	Mathematical Modeling and Simulation of Nonlinear Process in Enzyme Kinetics
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[17]	Mathematical and numerical modeling of blood flow and solute transport in microvascular districts
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[18]	Analytical Solutions of Nonlinear Equation in Immobilized Enzyme In A Spherical Porous Matrix: New Homotopy Perturbation Approach
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[19]	Occurrence of dead core in catalytic particles containing immobilized enzymes: analysis for the Michaelis–Menten kinetics and assessment of numerical methods
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[20]	Analytical Expression of Nonlinear Partial Differential Equations in Mediated Electrochemical Induction of Chemical Reaction
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[21]	Simple Analytical Expression of Steady State Substrate Concentration in the Biosensor Response
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[22]	Approximate Analytical Expressions of Non-linear Boundary Value Problem in an Amperometric Biosensor Using the New Homotopy Perturbation Method
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[23]	Non-Bayesian and Bayesian Estimation for Generalized Rayleigh Distribution
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[24]	Simple analytical expressions of the non-linear reaction diffusion process in an immobilized biocatalyst particle using the New Homotopy perturbation method
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[25]	Simple analytical expressions of the non-linear reaction diffusion process in an immobilized biocatalyst particle using the New Homotopy perturbation …
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[1]	Mathematical model for oxygen diffusion in the retina Materials Today: Proceedings, 2022 DOI:10.1016/j.matpr.2022.02.576

[2]	Mathematical analysis of prey predator system with immigrant prey using a new approach to Homotopy perturbation method Materials Today: Proceedings, 2021 DOI:10.1016/j.matpr.2020.06.354

[3]	Mathematical analysis of prey predator system with immigrant prey using a new approach to Homotopy perturbation method Materials Today: Proceedings, 2021 DOI:10.1016/j.matpr.2020.06.354

[4]	Solution of mediated bioelectrocatalysis process related to the Michaelis‐Menten equation by sinc method International Journal of Numerical Modelling: Electronic Networks, Devices and Fields, 2020 DOI:10.1002/jnm.2716

[5]	Solution of mediated bioelectrocatalysis process related to the Michaelis‐Menten equation by sinc method International Journal of Numerical Modelling: Electronic Networks, Devices and Fields, 2020 DOI:10.1002/jnm.2716

[6]	Mathematical Analysis of Reversible Inhibitor Biosensor Systems in Dynamic Mode Singapore Journal of Scientific Research, 2020 DOI:10.3923/sjsres.2020.229.265

[7]	Advanced Chemical Kinetics 2018 DOI:10.5772/intechopen.70914

[8]	Occurrence of dead core in catalytic particles containing immobilized enzymes: analysis for the Michaelis–Menten kinetics and assessment of numerical methods Bioprocess and Biosystems Engineering, 2016 DOI:10.1007/s00449-016-1647-0

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