Fractional-View Analysis of Jaulent-Miodek Equation via Novel Analytical Techniques

In this article, we analyze the analytical result of fractional-order Jaulent-Miodek equations with the help of two novel methods, namely, rho-Laplace decomposition method and rho-Laplace variational iteration method. The achieved results are shown in a series form, which is rapidly converging. The approximate simulations were performed in absolute error to ensure that the suggested methods are accurate and reliable. The achieved results are graphically presented to confirm the validity and accuracy of the techniques. The study results reveal that the rho-Laplace decomposition method is computationally very effective and accurate compared to rho-Laplace variational iteration method to analyze the nonlinear system of fractional-order Jaulent-Miodek equations.