Euler Wavelet Method as a Numerical Approach for the Solution of Nonlinear Systems of Fractional Differential Equations

In this paper, a numerical approach for solving systems of nonlinear fractional differential equations (FDEs) is presented Using the Euler wavelets technique and associated operational matrices integration, we try to solve those FDEs. The method’s major objective transform FDE into system algebraic that straightforward with matrix techniques. are constructed using polynomials, which have fewer terms than most other polynomials used construct types wavelets, therefore, provides sparse matrices. Thanks sparsity matrices, proposed requires less computation takes time evaluate. described here also applicable variable orders. To illustrate strength performance method, four examples provided.