Homotopy analysis method in nonlinear differential equations. ”Homotopy Analysis Method in Nonlinear Differential Equations” presents the latest developments and applications of the analytic approximation method for highly nonlinear problems, namely the homotopy analysis method (HAM). Unlike perturbation methods, the HAM has nothing to do with small/large physical parameters. In addition, it provides great freedom to choose the equation-type of linear sub-problems and the base functions of a solution. Above all, it provides a convenient way to guarantee the convergence of a solution. This book consists of three parts. Part I provides its basic ideas and theoretical development. Part II presents the HAM-based Mathematica package BVPh 1.0 for nonlinear boundary-value problems and its applications. Part III shows the validity of the HAM for nonlinear PDEs, such as the American put option and resonance criterion of nonlinear travelling waves. New solutions to a number of nonlinear problems are presented, illustrating the originality of the HAM. Mathematica codes are freely available online to make it easy for readers to understand and use the HAM. This book is suitable for researchers and postgraduates in applied mathematics, physics, nonlinear mechanics, finance and engineering.
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References in zbMATH (referenced in 204 articles , 1 standard article )
Showing results 201 to 204 of 204.
- Alomari, A. K.; Noorani, M. S. M.; Nazar, R.: Comparison between the homotopy analysis method and homotopy perturbation method to solve coupled Schrödinger-KdV equation (2009)
- Jafari, H.; Seifi, S.: Solving a system of nonlinear fractional partial differential equations using homotopy analysis method (2009)
- Xu, Hang; Liao, Shi-Jun; You, Xiang-Cheng: Analysis of nonlinear fractional partial differential equations with the homotopy analysis method (2009)
- Abdulaziz, O.; Hashim, I.; Saif, A.: Series solutions of time-fractional PDEs by homotopy analysis method (2008)