“…4 demonstrates that solutions starting from different initial values converge to the equilibrium point E * = (11.3623, 6.3158, 0.4162) of (3) for different fractional orders, m = 0.65, 0.75, 0.85 , and also for the integer order, m = 1 , depicting the global stability of the interior equilibrium point for fractional order as well as integer order. Example 5: Here we consider the exact parameter set and initial value as in Alidousti and Ghahfarokhi [20] and reproduce their bifurcation diagrams ( Figs. 5a and 5b) with respect to the same growth rate parameter of prey (here it is a 0 ) in the same range [1.6, 2.1] for the orders m = 1 and m = 0.97 .…”