The Novel Integral Homotopy Expansive Method

This work proposes the Integral Homotopy Expansive Method (IHEM) in order to find both analytical approximate and exact solutions for linear and nonlinear differential equations. The proposal consists of providing a versatile method able to provide analytical expressions that adequately describe the scientific phenomena considered. In this analysis, it is observed that the proposed solutions are compact and easy to evaluate, which is ideal for practical applications. The method expresses a differential equation as an integral equation and expresses the integrand of the equation in terms of a homotopy. As a matter of fact, IHEM will take advantage of the homotopy flexibility in order to introduce adjusting parameters and convenient functions with the purpose of acquiring better results. In a sequence, another advantage of IHEM is the chance to distribute one or more of the initial conditions in the different iterations of the proposed method. This scheme is employed in order to introduce some additional adjusting parameters with the purpose of acquiring accurate analytical approximate solutions.

[1]  Arturo Sarmiento-Reyes,et al.  Laplace transform–homotopy perturbation method with arbitrary initial approximation and residual error cancelation , 2017 .

[2]  U. Filobello-Niño,et al.  A Novel Distribution and Optimization Procedure of Boundary Conditions to Enhance the Classical Perturbation Method Applied to Solve Some Relevant Heat Problems , 2020, Discrete Dynamics in Nature and Society.

[3]  M. N. Anandaram Emden’s Polytropes: Gas Globes In Hydrostatic Equilibrium , 2013 .

[4]  Hossein Aminikhah Analytical Approximation to the Solution of Nonlinear Blasius’ Viscous Flow Equation by LTNHPM , 2012 .

[5]  Ji-Huan He HOMOTOPY PERTURBATION METHOD FOR SOLVING BOUNDARY VALUE PROBLEMS , 2006 .

[6]  U. Filobello-Niño,et al.  The novel Leal-polynomials for the multi-expansive approximation of nonlinear differential equations , 2020, Heliyon.

[7]  Yasir Khan,et al.  USING PERTURBATION METHODS AND LAPLACE-PAD´ E APPROXIMATION TO SOLVE NONLINEAR PROBLEMS , 2013 .

[8]  Arturo Sarmiento-Reyes,et al.  Modified Taylor solution of equation of oxygen diffusion in a spherical cell with Michaelis-Menten uptake kinetics , 2015 .

[9]  N. Tolou,et al.  Assessment of modified variational iteration method in BVPs of high–order differential equations , 2008 .

[10]  Ji-Huan He,et al.  Recent development of the homotopy perturbation method , 2008 .

[11]  Davood Domiri Ganji,et al.  Application of He’s homotopy perturbation method to nonlinear shock damper dynamics , 2010 .

[12]  L. Assas,et al.  Approximate solutions for the generalized KdV–Burgers' equation by He's variational iteration method , 2007 .

[13]  S. Jafari,et al.  Analytical solution of convective heat transfer of a quiescent fluid over a nonlinearly stretching surface using Homotopy Analysis Method , 2018, Results in Physics.

[14]  Antonio Marin-Hernandez,et al.  On a Practical Methodology for Solving BVP Problems by Using a Modified Version of Picard Method , 2016 .

[15]  Yasir Khan,et al.  A handy approximation for a mediated bioelectrocatalysis process, related to Michaelis-Menten equation , 2014, SpringerPlus.

[16]  M. El-shahed Application of He's Homotopy Perturbation Method to Volterra's Integro-differential Equation , 2005 .

[17]  Mohammad Mehdi Rashidi,et al.  Laplace transform homotopy perturbation method for the approximation of variational problems , 2016, SpringerPlus.

[18]  Ji-Huan He,et al.  Variational iteration method: New development and applications , 2007, Comput. Math. Appl..

[19]  Ji-Huan He A coupling method of a homotopy technique and a perturbation technique for non-linear problems , 2000 .

[20]  Mohammad Mehdi Rashidi,et al.  Analytic approximate solutions for steady flow over a rotating disk in porous medium with heat transfer by homotopy analysis method , 2012 .

[21]  David J. Evans,et al.  The tanh function method for solving some important non-linear partial differential equations , 2005, Int. J. Comput. Math..

[22]  S. Karimi Vanani,et al.  A Low-cost Numerical Algorithm for the Solution of Nonlinear Delay Boundary Integral Equations , 2011 .

[23]  Arturo Sarmiento-Reyes,et al.  The study of heat transfer phenomena using PM for approximate solution with Dirichlet and mixed boundary conditions , 2013 .

[24]  S. Chowdhury,et al.  A Comparison between the Modified Homotopy Perturbation Method and Adomian Decomposition Method for Solving Nonlinear Heat Transfer Equations , 2011 .

[25]  Jose Luis Garcia-Gervacio,et al.  PSEM Approximations for Both Branches of Lambert W Function with Applications , 2019, Discrete Dynamics in Nature and Society.

[26]  H. Vázquez-Leal Exploring the Novel Continuum-Cancellation Leal-Method for the Approximate Solution of Nonlinear Differential Equations , 2020 .

[27]  Wen-Xiu Ma,et al.  Lump solutions to nonlinear partial differential equations via Hirota bilinear forms , 2016, 1607.06983.

[28]  Wenxiu Ma N-soliton solutions and the Hirota conditions in (2+1)-dimensions , 2020 .

[29]  Jafar Biazar,et al.  On the order of convergence of Adomian method , 2002, Appl. Math. Comput..

[30]  Mohamadreza Abadyan,et al.  Efficiency of Modified Adomian Decomposition for Simulating the Instability of Nano-electromechanical Switches: Comparison with the Conventional Decomposition Method , 2012 .

[31]  Arturo Sarmiento-Reyes,et al.  Power Series Extender Method for the Solution of Nonlinear Differential Equations , 2015 .

[32]  Hossein Aminikhah,et al.  A novel effective approach for solving nonlinear heat transfer equations , 2012 .

[33]  Lan Xu,et al.  Determination of the Limit Cycle by He’s Parameter-Expansion for Oscillators in a u3 / (1 + u2) Potential , 2007 .

[34]  G. Adomian A review of the decomposition method in applied mathematics , 1988 .

[35]  Mehdi Omidvar,et al.  Variational Iteration Method and Homotopy-Perturbation Method for Solving Burgers Equation in Fluid Dynamics , 2008 .

[36]  Agustín Leobardo Herrera-May,et al.  A handy, accurate, invertible and integrable expression for Dawson’s function , 2019, Acta Universitaria.

[37]  T. Xu,et al.  Entropy optimized radiative heat transportation in axisymmetric flow of Williamson nanofluid with activation energy , 2020 .

[38]  Luis Hernandez-Martinez,et al.  New handy and accurate approximation for the Gaussian integrals with applications to science and engineering , 2019 .

[39]  Ji-Huan He SOME ASYMPTOTIC METHODS FOR STRONGLY NONLINEAR EQUATIONS , 2006 .

[40]  Augusto Beléndez,et al.  Higher order analytical approximate solutions to the nonlinear pendulum by He's homotopy method , 2008 .

[41]  Davood Domiri Ganji,et al.  Explicit Solution of Nonlinear ZK-BBM Wave Equation Using Exp-Function Method , 2008 .

[42]  H. K. Mishra,et al.  Homotopy perturbation method with Laplace Transform (LT-HPM) for solving Lane–Emden type differential equations (LETDEs) , 2016, SpringerPlus.

[43]  Zulkifly Abbas,et al.  APPLICATION OF HOMOTOPY ANALYSIS METHOD TO FREDHOLM AND VOLTERRA INTEGRAL EQUATIONS , 2010 .

[44]  Alejandro Díaz-Sánchez,et al.  Rational Biparameter Homotopy Perturbation Method and Laplace-Padé Coupled Version , 2012, J. Appl. Math..

[45]  Davood Domiri Ganji,et al.  An Application of Homotopy Perturbation Method for Non-linear Blasius Equation to Boundary Layer Flow Over a Flat Plate , 2009 .

[46]  Yasir Khan,et al.  A handy exact solution for flow due to a stretching boundary with partial slip , 2013 .

[47]  Mair Khan,et al.  Effects of Arrhenius activation energy in development of covalent bonding in axisymmetric flow of radiative-Cross nanofluid , 2020 .

[48]  Mair Khan,et al.  Numerical simulation for variable thermal properties and heat source/sink in flow of Cross nanofluid over a moving cylinder , 2020 .

[49]  U. Filobello-Niño,et al.  The study of heat transfer phenomena by using modified homotopy perturbation method coupled by Laplace transform , 2020 .

[50]  Fei Xu A Generalized Soliton Solution of the Konopelchenko-Dubrovsky Equation using He’s Exp-Function Method , 2007 .

[51]  Liao Shijun,et al.  Homotopy analysis method: A new analytic method for nonlinear problems , 1998 .

[52]  Mohamadreza Abadyan,et al.  Evaluating the Ability of Modified Adomian Decomposition Method to Simulate the Instability of Freestanding Carbon Nanotube: Comparison with Conventional Decomposition Method , 2011 .

[53]  S. F. Hernandez-Machuca,et al.  HPM Method Applied to Solve the Model of Calcium Stimulated, Calcium Release Mechanism , 2014 .