Generalized least square homotopy perturbations for system of fractional partial differential equations
作者: Reena Koundal , Rakesh Kumar
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摘要: In this paper, generalized aspects of least square homotopy perturbations are explored to treat the system non-linear fractional partial differential equations and method is called as (GLSHP). The concept Wronskian introduced detect linear independence functions depending on more than one variable through Caputo calculus. General theorem related also proved. It found that solutions converge rapidly GLSHP in comparison classical perturbations. Results generalization validated by taking examples from nonlinear wave equations.
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