Nonlinear analysis of a nonlinear modified KdV equation under Atangana Baleanu Caputo derivative

The focus of the current manuscript is to provide a theoretical and computational analysis of the new nonlinear time-fractional (2+1)-dimensional modified KdV equation involving the Atangana-Baleanu Caputo (ABC) derivative. A systematic and convergent technique known as the Laplace Adomian decomposition method (LADM) is applied to extract a semi-analytical solution for the considered equation. The notion of fixed point theory is used for the derivation of the results related to the existence of at least one and unique solution of the mKdV equation involving under ABC-derivative. The theorems of fixed point theory are also used to derive results regarding to the convergence and Picard's X-stability of the proposed computational method. A proper investigation is conducted through graphical representation of the achieved solution to determine that the ABC operator produces better dynamics of the obtained analytic soliton solution. Finally, 2D and 3D graphs are used to compare the exact solution and approximate solution. Also, a comparison between the exact solution, solution under Caputo-Fabrizio, and solution under the ABC operator of the proposed equation is provided through graphs, which reflect that ABC-operator produces better dynamics of the proposed equation than the Caputo-Fabrizio one.

Automated summary

The focus of this manuscript is to analyze the new nonlinear time-fractional (2+1)-dimensional modified KdV equation involving the Atangana-Baleanu Caputo (ABC) derivative. The Laplace Adomian decomposition method (LADM) is applied to extract a semi-analytical solution, and the fixed point theory is used to derive results regarding the existence and uniqueness of solutions. Graphical representations confirm that the ABC operator produces better dynamics, and a comparison between different operators shows that the ABC operator outperforms the Caputo-Fabrizio operator.