Nonlinear Dynamics of a Piecewise Modified ABC Fractional-Order Leukemia Model with Symmetric Numerical Simulations

In this study, we introduce a nonlinear leukemia dynamical system for piecewise modified ABC fractional-order derivative and analyze it the theoretical as well computational works examine crossover effect of model. For behavior operators, presume division period study [0,t2] in two subclasses I1=[0,t1], I2=[t1,t2], t1,t2∈R with t1<t2. I1, classical is considered growth while I2 fractional differential operator. As result, initiated sense systems. The novel constructed model then studied solution existence stability results. symmetry dynamics all three classes can be graphically observed presented six plots.